���W� ���v�� �Ov�xk�� Q� Ret �y�oH�o QWk �m� QDmr� l� QLD Q�F��D

OQmrta �R�UR�� w xO�O ��U� Ret x� �m�vwQDmr� ��yQ�Ot uOR Ovw�B x��OQm xQ�W� �yQ�Ot u�� �UwD xOW �� QND ��yVN�

x� xm CU� �DN�vW ��Ya� swra syt ��yxN�W R� ���v�� swra� � �OR�OQ B�t u� � � �� DQt ��Ya Q�DN�U w � ��v� � lQO xwL v xar��tCqwLD �� �t�oty x� QwWm R��v w Vv�O R� xRwL u�� � QU OWQ x� xHwD�� �DN�vW swra w Ret �WywSB OL�w �� � p�U QO u�yH syt �tra�mWRB swra x�oWv�O �Q�mty w �O��v� ��yVv�O x�oWywSB C��tLR� xO�iDU� �� xawtHt u�� QO �OW T�U�D �v�Hv�� �UwD �DWy� O�yWw u�Uv� QO �Ret xDN�ov�Q� ��yp�Uv�DB �Q�oxR�Ov� Ovv�t �v� wv ��yl�vmD�� x�Qty ���v�� TL �� ��DQt ��Ya ��ypwrU R� l� Swrw� R�iwQDmr� C�F��ysU�v�mt �y�oW��tR� ��yuwt�t QO �m� R�iwm��U ��yV��tR� s�Hv�

�OQ�o �t Q�Qk VywSB w xar��t OQwt ���v�� l �QO�xQyJ Q� w�YD uO�O �� �Y�YDN� Qw� x� xm Ret R� ���ypwrU hWmxOw � Q �N� ��yp�U QO �tra syt C�Oy�Wt R� �m � O vwW�t p� aiOwHw �rw CU� u�tRty OQi �UL l �QO� �� ��Ya C�r�ai u�� �CU��CU� xO�UQvC��F� x� uwvm �Dl �QO� w Ret��ypwrUu��C�r�aiu����ra x���Q

�r�aD xtU��

�xQ�tW u�� QO

�Ov�xk�� Q� Ret �y�oH�o QWk �m� QDmr� l� QLD Q�F��D ����W� ���v��

IH�ES �� ���vW �x�oWywSB QO h�Qo �Q�H �x� Q�v Tv�Qivm u�rw� �

C����mQD w Qr� w� ���� Q �rrtr�u�� �x�O�LD� �xQ�� QO V�wr wrUq �� woDio �

�IMU�

�yVQ�Ro w �yQ�N �

� �

� �

u�UL QDmO ���� x�t�O� QwWm �Qw�vi w VywSB �xQ�wvWH u�tDiy QO�xrHt QO ��xr�kt A�J Q��N x �DN�vW swra �xOmWywSB T�Q �mDU�

u�wva � QJ�vMicrostimulation of inferotemporal cortex in�uences

face categorization

�LQW �Hv�� QO �OW xO� RoQ xQ�wvWH �xS� w VN QO QDQ QoWywSB u�wva x�O� �t �mDU� QDmO srk x Vv�Q�mty w u�W�� VywSB �w�wt �xQ� QO

�mDU� u�UL

uDN�t� syQO R� xm CU� �DU� R swra xQtR QO �DN�vW ��Ya� swra���DQ� Vv�O R� xRwL u�� QO �CU� xOt� OwHwx� hrDNt �tra ��yxN�WxHwD �UL C�m �QO� Ovv�t �DN�vW ��yC�r��k �� Ret ��ypwrU C�r�ai

�OvQ�o �t Q�Qk xar��t OQwt �Q�oO�� w xi�L �Q�os�tYD

xyO � �� u� �DN�vW ��yC�r ��k w Ret xQ� � QO �t V v�O pwL DQwy� x� QHvt w xDW�Po Q�F�D Qo�O �tra ��yxRwL R� �Q��U� Q� xDWPol� R�i sra � QU OWQ �CU� xOW O�OH ��y�Qw�vi w ��xDWQu��t swra�y�O�y xt�v O�rwD ��xDUy Vv�O ���iwmW R�Uxv�tR sDU�� uQk p��w� QO�m�D�rB w�S Q�DN�U Q��eD xH�Dv QO w C�aq�� QYa Qwy� p�D�H�O �Qw�viVv�O w ��Ya� swra xvwo Q�Hiv� OWQ �rw �OW u�yH �t�v w �O�YDk�OWQ R� QD� QU �D�Qt x� Q��L p�L QO u� xO�J�B ��yC�r��k w Ret R� �tsyt �tra pwLD u�� Q�F�D jta w xQDUo �CU� xDWPo uQk QO l� R�i sra

�OW Oy�wN Q�mW� xOv�� ��yxyO QO QW� �oOvR hrDNt O�a�� QO

xrtH R� ��Ya �R�UrOt �� �D��U�Lt ��Ya� swra �Q�opmW��yOv ��Qi u��� D �CU� xDWPo uQk QN�w� QO �tra CqwL D u � QDtytOvDUy Ret xO�J�B ��yC�r��k Q��U w CN�vW CN�U Q� R xm ��Ya��yxO�OB R� QDy� syi u�mt� ���� Q u�� R x� �yOv��Qi u�� �R�UrOt whrDNt uw�W QO Ret �D��U�Lt ��yC�r��k �Q�oQ�mx� u�vJty w �DN�vWw ��Ya� �UOvyt Ovv�t �v� wv swra V��O�B �OQw� �t sy�Qi �Q �oOvRu�� COLw ��yOQw�DUO xrtH R� u�W�t w Ret ���DQ� u�mt� x� ����DUOu�wD�t xRwL u�� QO CiQW�B syt ��yxvwtv R� �CU� �tra ��yxN�W u��

s�

QO �CU� OwOLt Q��U� xv�tR u�� QO OwHwt �� QHD w �tra Oy�wWs�Hv� �v��m x� RwQ QDmO w R�Qi� ��Q O�U QDmO w �v�Hv�� �UwD xm �WywSBO�OQo QWDvt�Nature� QJ�v xrHt ���� Cw� xQ�tW QO u� G��Dv w OWxDU��w xQyJ CN�vW Ovv�t xO�J�B ���v�� C�m �QO� xm CU� xOW xO�O u�Wvu�� QO �t �CU� Ret QWk ��Ya ��ypwrU R� �OwOLt O�OaD C�r�ai x�lQO Ret �m� QDmr� C�r�ai Q� �Q�PoQ�F�D �� u�wD�t xm s�O�O u�Wv VywSBxwqa �tra ��yxDi�� u�� �OQm pQDvm �Q u� x� xDU��w �Q�os�tYD w ���v���DU� R ��ysDU�U QO CN�vW ��ysU�v�mt OQwt QO �t Vv�O V��Ri� Q�Q� �Pr w OvwW �t �wULt uyP w Ret ���DQ� K��wD QO wrH x� �t�oR� �CW�Po Ovy�wN Q�F�D uyP xiUri w �DN�vW ��U�vWv�wQ OwHwt C�� QvRet ��yC�r��k �R�UR�� u�mt� C��yv QO �yxDi�� u�� T�U�Q� Qo�O �wU�DN�vW ��yC�r��k w �ysU�v�mt OQ� Q�m w �Ret C�a��� �Q�JO �O�Qi� QO

�OW Oy�wN sy�Qi �yC�� wQ w �yu�W�t QO u�Uv�u�� ���DQ� xQ�� QO �y�oW��tR� C�k�kLD ��y�oO�J�B w CqmWtOwHw sOa w Vv�O R� xRwL u�� uOw� ��xDWQu��t w �vyP ��yxO�OB w Ret�D��U�Lt w �DN�vW ��Ya� swra �� ��DQt �D�k�kLD w �WRwt� ��yxwQo��yOQw�DUO R� X�N C ��tL QwWm � D�k�kL D Rm �Qt w �yx�oW v�O QO

�O��tv�t �QwQ� �Q xOW QmP ��yxv�tR QO x�oWywSB

w �l �QO�� xm CU� u�� �DN�vW ��Ya� swra syt C���Qi R� �m�OwHw� Ret QO ��Ya ��ypwrU �m� QDmr� C�r�ai xH�Dv QO �CN�vW�C�F u�mt� uOt� sy�Qi w �Qw�vi CiQW�B �� Q�N� p�U x�HvB �� �O���tuOW Om xwL v OQwt QO �O� � R ��yxDi� � Ret �m � QDm r� ��yp�U v� D Bu�Wv �yvD Oy�wW u�� �t�tD �rw �CU� xOt� CUOx� Ret QO C�aq����Ya ��ypwrU �m� QDmr� ��yOv��Qi Q� �UL C�m� QLD Q�F�D �wv xOvyO��yC�r��k w Ret X�N ��yVN� C�r�ai u�� ��ra ���DQ� xmv�� w CU�

�CU� xO�UQv C��F� x� OW�� xDW�O OwHw �DN�vW�CN�vW� w �Ret ��yC�r�ai� u�� ���DQ� �UQQ� ��yx�Q R� �m��m� QDmr� u�� QH j� QRD j� Q� R� Ret �UL �vwQwv ��yQ�Ot l� QLD��DN�vW Q�DiQ w xOt� OwHwx� �l �QO�� xar��t w Ret X�N �L�wv QO� �� v � � lQLt OwHw uwO � xm� DQwY QO p� Ft ��Q � �CU� u� R� �W� v� �� v � � l �QO� Ret R� �WN � �aw vYt �m � Q Dm r� l � QL D � � �y v D w�� � DQ� �w v OwW �xO �O� X�N ��W l � R� �Q � wY D w OwW pY�L�OW Oy�wNXNWt wp�rLD ����v��CN�vW� w ��vwQwv ��yQ�OtC�r�ai�� �

� �

Q��U w CN�vW CN�U Q� R xm ��Ya ��yOv��Qi u���D� ��mDU� QDmO����� Q u� R x �yOv��Qi u�� �R�UrOt w OvDUy Ret �xO�J�B ��yC�r�k��yC�r�k �Q�oQ�mx u�vJty w �DN�vW ��yxO�OB R� QDy syi u�mt�

��OQw �t sy�Qi �Q �oOvR hrDNt uw�W QO Ret �D��U�Lt

��yxO�OB w Ret w ��Ya x�oDUO ��yC�r�ai u�wD�t xm OvyO�t u�Wv �DN�vW ��Ya� swra ��yxDi�� Q��U Q�vm QO Vv�Q�mty w �mDU� QDmO xr�kt G��Dv�OQm ���� Q �R�UrOt ���� Q CQwYx� �m� Swrw�� w �m� R�i ��yxO�OB Q��U Ovv�t �Q �DN�vW

�OW���t �D��U�Lt ��Ya� swra R� ��xQ�aDU� ��x��tv q�� Q� wYD

�a �� � Q�y�

s�

IH�ES �� ���vW�

CU� xOQmv �Q��eD R�v �yx�vH �Q��U� R� �rw CU� xO�O OwN x� Q��U�u�� Qta pw� p�U xO �CU� u� ���� Q QO�m �r�a C�i�m �yv� R� �m� xm�Q�H xUOvy nQR� XYNDt l�OvDwQo QOv�Umr� �QwyWt s�v �� wD�DUv�C����� Q QO �k�ta C�Q�F�D V��yOQw�DUO w �yx�oO�O xm CU� xOQwN xQoxUUwt x�rw� xQwO QO �QFwt Q��U� xQyJ R�v swD xvQ �CU� xDW�Po �H x�O�OaDU� xm OwW�t O�� �Um u�wva x� sy u�w�rwU T�vO R� �CU� xOw�uDN�o v�Q � w u�ty�t u�QoWywS B u� � �yxO �� pO�� D ��eQ D QO �Y�N���� Q s��O u�O�DU� u��t R� �CU� xDW�O �yv� QO ��qkv� w wv ��yxW�Ov����� QO swD xvQ �Ov�xOW ROr�i u�Wv xOvQ� Qiv Ciy uwvm �D IH�ES QOu�S ���� QO u m ur� �� � QO u�r�O Q�B ���� QO l�OvDwQo QOv�Umr������ QO nQwiq u�Qwr w ���� QO I� wUDvwm s�Um �t ���! QO uoQw�x� �O�Qi� wRH �re� sy �Q hwtwQo p���N�t w u�w�rwU T�vO Qo�O Qiv wOR� j�iD� �ULQ� �ki w OvDiQo�t ROr�i u�Wv �DU��� xm OvQw��t Q�tW

�Ov�xOW swQLt xR��H u��

u�ty�t u�QoWywSB w �tra QO�m

xDUHQ� OvtWv�O �mOv� xOa x� CU� OwOLt xOmWywSB u�� �tra QO�m�UQm u�O�DU� OvwW�t ��NDv� Qta s�tD ��Q� xm �t��O O�DU� � �va�COtR�QO u�ty�t ! "qai w u�v�ty�t ��Q� pW�t�� wr �UQm w u�Wvwt uw�ru�ty pwL IH�ES QO �WywSB C�r�ai k�w QO �Ov� CNRS w�a xmx��W QDW� � #�L r u �� R� xUUwt u �� w OQ�o�t pmW lJwm xDUy�D CU� u � QO �MPI� lvqB Tm �t ���� Q �wD�DUv� Ovv�t �� wD�DUv�xDUy u�� ���a� ��rmQ� QO �MSRI� ���� Q swra �WywSB �wD�DUv�xO�UQ ��y���kD T�U� Q� x�wN w OwN �YNW j�qa T�U� Q� x�wNxmv� p�L Ovvm CwaO u�ty�t u�wva x� �Q O�Qi� s�Om xm OvQ�o�t s�tYD�Q �yC�r�ai �rY� VN� �aw�wt ���yV��ty w �yxt�vQ� MSRI QOCwaO �yxt�vQ� u�� QO CmQW ��Q� �U�vt X�NW� w OvyO�t p�mWD��� OwOL QO "�atH p�U QO IH�ES u�ty�t u�QoWywSB O�OaD �OvwW�t�OwOat xOa �CU� v QDW� � Qi v !� R� X�N u�tR Qy QO w CU� Qi vxm OvQ�O Qw�L RmQt u�� QO �Qiv ! Q��L p�L QO� COt R�QO u�ty�tCOt w OvQ�o�t ��tra C�k�kLD �rt RmQt� CNRS R� �Q OwN jwkL�R�QO x� QDW�� �� p�U CU�� x�o w CU� XNWt�v IH�ES QO u�WDt�k��CU� x�t � �rwtat u�v�ty�t Ct�k� COt u�ov��t �rw �CU� xO�WmMSRI Ovv�t ��xUUwt x� C�Uv IH�ES xm Cio u�wD�t �rm Qw�x�QO�m ��q�� K�U x� �OL �D Qt� u�� xm OQ�O �QDOwOLt w QDxDU� ��Ltxm CU� C�ak�w u�� R� �W�v sy �OL �D w OwW�t �w� Qt u� �t��O�H v� x � u�ty�t QoWywS B u�wvax � svt Qw�x � �yp�U X�N ��xOa

�tra �r�a C�ar��t �wD�DUv�Institut des Hautes �Etudes Scienti�ques �IH�ES�

u � Q DQ � D at w u � Q DhQat R� CU� v � oQR � xUUwt xm v� � � xU v�Qi QO�tWJ xWwo xm CU� u�yH QO �Qv l� R�i w C����� Q ��yxOmWywSB��Q� �D�v�mt� xOmWywSB u�� �OQ�O sra M� Q�D w �U�vWCN�vW x� syh���w xvwoQy R� dQ�i xm OQw��t sy�Qi u�OvtWv�O �u� QDx�Nv R� ��xOaw OvR�OQB� j�kLD x� �ki w j�kLD x� �Q�O� ��yC�OwOLt w �WRwt���yxO�� �Ovvm CwaO �Hv� x� �Q�mty ��Q� ��vO QU�QU R� �Q �v�v�ty�t�Wvt QU xOW x�Qa w xOQwQB xOmWywSB u�� QO uQk s�v hQ� xm �traQF� �rrtr�u�� �tra xat�H Q� xm xOw� O�OH �t�y�it w ��qkv� �D�QmiD

�CW�Po Oy�wN w xDW�Po�Bois�Marie� �Q�t$�w � �Q� Dmy xO lQ� B QO xUUwt u �� pLt�� Qe �wvH QO k�w �Bures�sur�Yvette� Cw��$QwU$Qw� xk�vt QO�OQ�O Q�Qk IH�ES R� �m�ORv xrY�i x� R�v u�QoWywSB x�oDt�k� �CU� T� Q�B

u�o�Nv w xJN� Q�D

w �L�eon Motchane� u�Wwt uw�r Q�mD�� x� ���� p�U QO xUUwt u��CQ��Q XwYN x� u�tR u� ��DavY w �tra u�o�Nv j� wWD w C��tL ��T�U�D uDUv� QB QO �IAS� �r�a C�ar��t xUUwt �Ckw T��Q Qt��yvB �QO �Dq�YLD w xOt� ��vO x� nQw� RQDBuU QO xm Ow� �QoDavY u�Wwt �OWCavY x� xO�wv�N �r�t u�t�D ��Q� "�Oa� �t� Ow� xOQm l� R�i w C����� QseQ�ra �w �Ow � xO � Ro Ct�k� xU v�Qi QO ���! p�U R� w xOQw� �wQQ�yJ w x�HvB QO w OQm iL �Qv swra x� �Q V�xkqa CavY x� p�eDW�xm Ow� u�� u�Wwt x�rw� hOy �CiQo C����� Q QO �QDmO xHQO �or�U�� w �YwYN "qt�m �O�yv CQwYx� uDUv� QB xUUwt �� x��Wt �� wD�DUv�C����� Q xv�tR QO �O��v� VywSB ��Q� �wUv�Qi ��yCmQW �r�t C��tL�CiQov �B IH�ES QO RoQy xm� �v�Uv� swra �U�vWVwQ w �Qv l� R�ixkqa OQwt �w�wt ��NDv� QO pt�m �O�R� u�QoWywSB u� QO xm Ovm O�H���Hv� QO �tra ��yVywSB xm xUv�Qi QO u�Wwt x�oO�O �OvW�� xDW�O OwNOQwt QO R�v CavY py� w Owtv�t pwtat�v CW�O Q�Qk CrwO xQ��U Q� RxO �� � � uwJ xm O vOQw��t IH�ES x � � ��yQ�Wi C�k�kL D CyH u��a DR� R�v �yv� w CiQv Q�� Q� R w� CW�O C�i�vt VywSB �O�R� OQwt QO u�Wwt�OvDU�m ��xLqt p��k OL QO OwN �r�t ��yltm R� ���� xyO QN�w�CrwO xOyaQ� xOmWywSB u�� GQ�Nt xOta VN� RwQt� x� �D u�tR u� R�

�OQ�O Q�Qk xUv�Qi��y��Wv R�Qi w C�Q��eD OwN xr�U x�HvB x� l�ORv Qta QO xUUwt u��

�a �� �B��B �xQ�tW

s�

u�O��� � Q� hwtwQo p� ��N�t ����� p�U R� �t ��O O� DU� �wU v�Qiu�O���� Q� I� wUDvwm s�Um �t ����� R� �t��O O�DU� Q��D TwQ ��wUv�Qiu�O��� � Q� nQwiq u�Qwr ����� R� �t ��O O�DU� Q�� D TwQ ��wU v�QiO�DU� TwQ u�Om� R�i� hwU�Qmv �D�m�v ����� R� �t��O O�DU� �wUv�Qi

������ R� �t��O

C� Q�Ot w xHOw�

R� xm CU� xOw � wQw � !������ Q � dr� � ���� p�U QO IH�ES xHOw �d r� � w xU v�Qi C� k � kL D CQ�Rw �Q wQw � ������� OwOL QO dr �t u ��w � ��m � Qt�� �HQ�N �DrwO ��yO�y v w C�UUwt �Q wQw � ������ Q �Q�e ��yltm pLt R� wQw� ������ OwOL QO Ov�xOQm u�t�D ����B wQ�R� �DrwO Q�e ��yltm j� Q� R� wQw� ���� OwOL QO w pN�O R� �DrwO

�CU� xOW u�t�D �rN�O ��vt R� wQw� ������ OwOL QO w GQ�Nw �DavY w �tra O�yv OvJ u�oOv��tv R� �mQt IH�ES ��vt� C��yp�mWD R���B w Q�y� QO xUrH wO C��y u�� �CU� �k�kL XNW OvJ R�v�OR�OQB�t xHOw� �� wYD w �r�t w �tra ��yVQ�Ro �UQQ� x� w OyO�t

xD�tm x�YwD T�U� Q� w �vt� C��y xr�Uw x� xUUwt Q�Ot ��NDv�xrtH R� w CU� �tra sy w �Q�O� sy Q�Ot h���w �OQ�o�t CQwY �traQ� CQ�v w s��O u�O�DU� s�ONDU� u�ty�t u�QoWywSB R� CwaO pt�WQ��O xUUwt xQ�O� QO Q�Ot R� Oa� �OQi �OwW�t �vt� C��y ���� wYD xHOw�QO �w �OW�� xDW�O �tra xv�W�B CU�v sRq Q�Ot hqN Q� xm CU� pmu�QoWywSB R� CwaO p��k R� �tra Qwt� QO w CU�v w�a �tra xD�tm

�Ovm�tv CmQW �yV��ty �� u�ty�t

�tra ��yC�r�ai

w �t ��O u�O� DU� CUO x � x m �Q x r� kt �O� � R O�Oa D p�U Qy w D � DU v�Qy �Ovm�t QWDvt A�JV�B CQwY x� xOW xDWwv u�ty�t u�QoWywSBp�U QO Q� � xU � � wO w OwW�t Q�R oQ � w D � DU v� QO � ��yQ� v �tU x DiyQ�Dat �tra x� QWv xUUwt u�� �OOQo�t p�mWD ���yx�oQ�m w �yV��tyOrH wO QO p�U Qy �Q Publications Mathematiques de IH�ES

u�� R xU R� l� Qy x� u� Cq�kt xm Ovm�t QWDvt xLiY ��� OwOL�OW�� Ov�wD�t �v�tr� �� �U�rov� xUv�Qi

�OQ�O ����at w ���Rt �WywSB xUUwt l� R� O�Qi� svt Q�O�O �OvwQ�t��yO�OR�� Q�QtDU� OW�� xDW�O �O�� R C�r��k �QoWywSB Qo � �iQ� R�R� �Ovm�t O�H�� xUUwt QO �Q �Y�N CvU w CU� O�it �yp�U �� w�x� �tvt xOvvm O�OR�� Q�O�O ����kD xm CU� xO�Di� j�iD� x�o Qo�O hQ�

�CU� xOW w� �oO�HvQ Ea�� w xOW OQ p�rO u� �� u��w CU� xDUv�wD OyO�tv OwN ���a� x� �O�� R jwkL xmv� �� RmQt u��IH�ES u�O�DU� xty �Ovm iL w �PH �Q ��xDUHQ� u�OvtWv�O Ov�wD�tlOv� u�R�t x� Qot O����tv V��Ri� u�tR �� xm OvQ�o�t �v�Um� jwkLQO ��� � Q u�O�DU� �jwkL �QFm �OL pO�at jwkL u �� �sQw D u�Q�H ��Q �QDtm �D�Qt x� �m� Qt� xOLDt Cq��� QO x��Wt ��yjwkL R� xm CU� xUv�Qix�k� w OvW�� s�kt �Hv� QO �Q p�U R� x�t VW O��� xUUwt u�O�DU� �CU�s�Um �t w hwtwQo p� ��N�t uwJty � v� v�O��� � Q �O vO�R� "qt�m �Q p�UT B �O vQ�o � �Q Dq� � Q��U � jwkL Qo �O ��y�H QO Ov v�w D�t G � wUD vwm�OyO�t MU�B u�vJ VUQB u�� x� I� wUDvwm %Ovv�t�t IH�ES QO �QJR� uOw� h�at w� ��OQ�O OwHw u� QO �O�R� u� QDW�� xm CU� �rLt �Hv���u�Oki �DL w �U�QmwQw� u�Oki x�wNrO u�v�ty�t R� CwaO u�mt� T� QODw Ov�O�t xUUwt u�� ����Rt R� �Q jwkL V��Ri� �� ��kDQ� xQ�� QO xeOeO

��CU� umtt ���QW u� QDy� �yv�� ut xiQL QO� �O� wo�t

�tra �xD�tm

uwQO R� �yv� R� Qiv Ciy xm CU� w�a �� R� �mQt IH�ES �tra xD�tmuw�r �UQm O�DU� w �t��O O�DU� GvB xUUwt Q�Ot pt�W xm Ov�xUUwtR� hOy �Ov�xUUwt uwQ�� R� �v�OvtWv�O Qo�O Qiv VW w OvwW�t u�Wwtw sra ���vO x� xOQDUo x�oO�O iL xUUwt uwQ�� R� ����a� ��NDv�

�CU� �tra xOta ��yu�� QH �� �t�otyu�QoWywSB ��NDv� ��Q� �Q�t�UO w u�wS QO� Q�� wO p�U Qy �tra xD�tm�OyO�t xUrH p�mWD xUUwt �tra CU��U xQ�� QO EL� w u�ty�tT�U� Q � w CNRS COt R�QO u� v� ty �t lt m x � u� v� ty �t ��N D v�w OQ�o�t CQwY Qv OQwt EL��t QO ���kDt O�Qi� �tra �oDU��W���a� �OW�� Q�QkQ� ���� Q w l� R�i xDWQ wO u�� �rO�aD OwW�t �aUu�O��� � Q� uw�v�oQw � Q� Bu�S �R� O v�CQ� �a �tra xD�tm ��rN�O �rai�wU v�Qi u�O��� � Q� u m ur� ����! p�U R� wD�DU v� Q �Ot �wU v�Qiu�Om� R�i� QwtO w��D ��� � p�U R� wD�DUv� QO u�Wwt uw�r �UQm O�DU�

Ov�xDiQo ROr�i p�Ot xm IH�ES ���a�

nQwiq u�Qwr I�wUDvwm s�Um �t uoQw u�S u�m ur u�r�O Q�B l�OvDwQo QOv�Umr� swD xvQ

�a �� � Q�y�

s�

x�oWywSB QO h�Qo �Q�H �x� Q�v Tv�Qivm u�rw��Or�Q� OQ�J� Q

u�DU� QY u�DU� QY x�oWv�O utDwo u�w��

Recent research on graph energy�

u�DUQ�Ht Ov�Qwr VwwD � x�oWv�O V�wr wrUq

� Graph algebras�

� Development of combinatorics in Hungary�

�O�v�m QR� Qi ut��U x�oWv�O Qywt u�Hw�

� Separations in symmetric graphs�

� How large must the set of subset sums be�

Ovry nQ�r�D x�oWv�O RQty sr� w

Tripartite distance�regular graphs�

Qo�O u�v�QvNU

u�W�m x�oWv�O �iQW� u�t�

Szeged index of direct some of graphs�

u�v�r u�v�r x�oWv�O �rL�Ur� u�t�

Paths and claws in n�chromatic digraphs�

u�yiY� �DavY x�oWv�O �O�t� �Qtqe

T�shape trees are determined by their signless

Laplacian spectrum�

h� QW �DavY x�oWv�O w x�oWywSB �r�tH uULt

A generalization of Jaeger�s conjecture�

TQOtC�� QD x�oWv�O �wmxQ O�tL

Relations on some topological indices of a graph�

u�HvR x��B swra QO �r�tmD Cq�YLD RmQt �kQ� ��tvyQ Q�t�

On the splitting �eld of quasi�thin schemes�

Q��mQ�t� �DavY x�oWv�O w x�oWywSB �v��tQ xv�RQi

Cospectral mates of starlike trees�

x�oWywSB ���Qxi��� RwQy�

On the characteristic polynomial of starlike trees�

�Q�H x� Qv xQ�� QO ��O��v� ��yVv�O x�oWywSB� IPM Tv�Qivm u�rw�Q�RoQ� ����� CWy��OQ� �$�� ��� p� Qw� ��$�� ��yRwQ QO h�Qo�DavY x�oWv�O w x�oWywSB� �Q�m � O�aU Tv�Qivm u�oOvyO u�tR�U �OW��Qtqe w ��m � Qt� u�U v�mU � w x�oW v�O� �O r�Q � OQ�J � Q �h � QWu�OQ�t� C��Oy OtY s�v x� Tv�Qivm u�� �OvOw� �x�oWywSB� �y�WwQUNOQor�U u�tO�Diy C�U�vt x� wo �m�W �w�vr�� x�oWv�O QO �v�Q�� xDUHQ�xt� vQ � x�oWywS B C� ��� � Q xOmWywS B xm � v�tR R� �OW Q�RoQ � w� O rw Dxt�vQ� u�� syt u��t�L R� C��Oy xOQm R�e� C����mQD QO �Q OwN �D�k�kLD

�CU� xOw���yv �v�QvNU u�wva w waOt u�v�QvNU

h� QW �DavY x�oWv�O w x�oWywSB �Q�m � O�aU

Zero sum �ows in graphs�

�m� Qt� uU�Ot u�Uv�mU� w x�oWv�O �Or�Q� OQ�J� Q

� Matrix diagonals�

� Nullities of graphs�

OvrD�mU� nv�rQDU� x�oWv�O uUv�rw�Q QD�B

� A survey of star complements�

� Star complements for non�main eigenvalues�

�O�v�m �v�H� Q x�oWv�O OvrlQm w�DU�

� A Survey of results on Laplacian integral graphs�

� Amended distance bounds using eigenvalues of the

normalized Laplacian matrix�

x�UwQ hrw� wU C����� Q xUUwt �wv�Dv�DUvm �vr�

Some problems on Cayley graphs�

�� wvH xQm nvywB �Qw�vi w swra x�oWv�O urwm lH

On distance�regular graphs with smallest eigenvalue�n�

�O�v�m wrQD�w x�oWv�O p�UO�o T� Qm

� Quantum physics and algebraic graph theory�

� Type�II matrices and association schemes�

�a �� �B��B �xQ�tW

s�

u�QyD x�oWv�O �QwvOtLt ��DQt

Inclusion matrices and chains�

Q��mQ�t� �DavY x�oWv�O �O�Qt x�tU

F�choosability of graphs�

u�QyD x�oWv�O QP �iUw� uUL

Vertex and edge PI indices of product graphs�

C����mQ D OQ�W� B QO �tyt Vk v x�oWywS B �C���� � Q xOmWywS Bu�Q�� QO �xDUUo C����� Q EL��t Q��U w �yKQ� x� Qv h�Qo x� Qv��D�k�kLD ��yxDWQ u� QD�w�Lt R� �m� C����mQD xRwQt� �CU� xDW�O�w�mHvm �yOQw�DUO C�twrat �CU� �v�Q�� u�wH u�v�O���� Q u��t QOxm �O�� R ��ywoDio w u�W��y�v�QvNU R� u�v�wH u�� �WwmDNU w j��DW�CiQo�t CQwY �y�v�QvNU u�� TivD u�tR QO w Q�y�v hQY s�ovy�O��v� ��yVv�O x�oWywSB T��Q CwaO x� Qy�R�Oa� RwQ l� �Ow� OwyWt

�s�OQm CmQW �r�H OQoR�t l� QOu�QyD �Q�OQyW x�oWywSB CU�� Q �r�t �v���DWB �� Tv�Qivm u��C�k�kLD RmQt w x�oWywSB xm�W RmQt x�oWywSB �Q�O�$�r�t Cvw�at

�s� QmWDt u�v���DWB xty R� �O�OQo Q�RoQ� C�Q��Nt

u�Q�� CavY w sra x�oWv�O u���qa �Oyt

Normal Cayley hypergraph�

�Rr�t �QDwB x�oWv�O u�N�ra O�aU

Roots of the independence polynomial of paths and

cycles�

u�QyD x�oWv�O w x�oWywSB �v�kQeToQv

Spectral characterization of graphs with index at mostp

��p

��

h� QW �DavY x�oWv�O w x�oWywSB �v�� Qk s�y�Q��

List chromatic number and energy of graphs�

Q��mQ�t� �DavY x�oWv�O �v��m Vw� Q�O

Quadratic forms associated to graphs�

Q��mQ�t� �DavY x�oWv�O �OtLt xt��i

Some relations between choosablity and �list colorable

graphs�

u�DUQ�Ht QO C����mQD �xJN� Q�D �xQ�� QO V�wr wrUq �v�QvNU R� �D�mv

QO xS� w x� u�DUQ�Ht C����� Q xaUwD QO �t�a Q�F�D ���! QO C����� Q ��Q� �v�DUQ��O x� QWv l� T�U�D ut xO�ka x� ��CU� xDW�O C����mQD xv�tR

RQmU VwOQ� Vw��y u�QwD �Ov�h�Qo x� Qv QO �U�U� syU ��Q�O �Q��U� ��� QO x� QWv u�� xk��Ut u�oOvQ� u��t R� ���RQmU sv�N "�Oa�� u�qm

Q�m x� �yT� QD�t xar��t QO �Q �i�Qo x� Qv ��yVwQ xm Ow� �D�enes Konig� n�vwm VvO h�Qo x� Qv �Dmt Q�Pov��v� ����� QO h�Qo x� Qv xQ�� QO �Q ��Dm u�rw� w� �O�O CUO x� Tw�v� wQi x��k l� R� h�Qo x� Qv Q� �vD�t �D��F� w CiQo

�CWwv

VRwt� �Q Oa� pUv QO h�Qo x� Qv u�YYNDt QDW�� VwOQ� pB w �Tibor Gallai� �q�o Qw��D n�vwm u�OQo �W u��t QO ��OvOw� jO�Y w RwUrO Q��U� Qiv wO Qy �OvO�O

�a �� � Q�y�

s�

� C����mQD w Qr� w�

�OQw� CUOx� �Q dn ndn�� � ����n pwtQi w CiQ QDwrH sy u�� R�Ovt�H v��t �OL�w xH�D v x � QwDUO wO Qy xmv �� CU� xDio xm v� vJ

K� QY pwtQi x� �Hv�� R� ��O��tv�t �U�RHat�

dn n��� �� �

�� �

�� � � � ��

����nn

��

�CU� e�� R� Qr� w� �U� Qw�O�� xm O�UQx � Q r � w� xHw D �CU� �a � �� O�Oa� ��yR�Q i� xQ� � QO swO x r� U txO v� v A� r � i R� ��x t� v C i� � QO � � � !� p�U QO �yR�Q i� �w�w t

OQm pL xv�tR u�� QO �O�� R p��Ut w� �OW �rH�Philippe Nand�e��ki �Hv�� QO �CW�O x�Qa �yR�Qi� O�OaD u��aD xQ�� QO �Q��U� ��yxO�� wOOa l� ��yR�Qi� O�OaD xm OQm C��F w� �s�vm�t QmP �Q w� G��Dv R� �m��CU� OQi O�Oa� x� OOa u� ��yR�Qi� O�OaD �� Q��Q� R��tDt O�Oa� x� �a����Q� w �yR�Qi� VQ�tW u�� ��x���Q OwHw xr�Ut u�� QO pt�D ut� Qr� w�xn �� Q� xm OW xHwDt w O�O X�NWD �wLvx� �Q �Q�H ��y��xrtHwO

�U� QO

Q ��� x���� x����� x����� x�� � � �

xm�r�L QO CU� R ��tDt ��yO vwatH x � n ��yR�Qi� O�Oa D u�ty "�k�kO�U� QO xn �� Q�

R �

��� x���� x����� x����� x�� � � �

C��F� �Q R xm OQm C��F TBU �CU� OQi OvwatH n x� �yR�Qi� O�OaDxr�Ut R� �q�� R� Oa� xDiy OvJ �ki xOv�v xt�v MU�B QO �Q u� xm Qr� w�

�Owtv ��� �WQ�tW p��Ut QO �Q Orwt ��y��D R� xO�iDU� OQm KQ�t

���� p� Qw� �� Tv�Qivm �Daily News� xv�RwQ �Q�N x� QWv R� pkv �

Qr� w� CQ�yvw�r

u�O���� Q xO R� Qo � �CU� Qr� w� CQ�yvw�r OrwD OQor�U u�tOY�U p�Ut�lW�� Qr� w� OwW xOQ� s�v M� Q�D QU�QU QO u�v�O���� Q u� QDoQR� u�wva x�O�Oa� x� Qv R�r�v� xUOvy QO �O�� R ��yOQw�DUO w� �CU�yv� R� �m�x � Q r � w� OUQ�t v Q v x � �OQ�O Qo �O ��yxDWQ R� �Q� �U � w C� � � �mQ D�OW�� xOWv �rH u� x� V�xkqa w OW�� xOQwNQ� C����� Q QO ��xr�UtV�B p�U OYm� OwOL w� �Opera Omnia� Q�F� xawtHt R� OrH u�rw��CU� xOW A�J xLiY ����� QO u� R� OrH � uwvm �D w Ci�� Q�WDv��xty O�DU� u�wva �� OwN ��Dm QO �William Dunham� syv�O s��r� w

�OyO�t K��wD C����mQD QO Qr� w� ��yOQw�DUO R� OQwt wO xQ�� QO �t

�� ��oDiW�� x� swUwt CWo��H R� �Y�N �wv xQ�� QO xr�Ut u�rw�pL w KQ� Qr� w� �Q�m R� p�k xyO OvJ k�w QO xr�Ut u�� �CU� �R�UxDiW��u�� QO w� j�kLD w xOw� �q���� u�t�oW�B ��yQ�m R� Qr� w� "�Qy�� �Ow� xOWxOQ�t�v xr�Ut xm CU� u�� u� p�rO u� QDtyt �CU� �O� w p�Y� xv�tRw xOW KQ�t �OOaDt Cw�iDt ��yxv�tR QO xm CU� ��xr�Ut R� ��xvwtv�OvOw� xOQm pL �Q u� Qo�Om� Q�m R� �q�� uwO� �irDNt u�v�O���� Q u��Q��v��D��F x�kv I�y xm CU� �DWo��H ��oDiW�� �� �R�UxDiW�� R� Qwvt�Q dn �n� ���dn�� � dn��� �DWoR�� pwtQi CUNv Qr� w� �OQ�Ov"�Qy�� �rw �CU� hQL n ��y�oDiW� O�OaD dn u� QO xm OQw� CUO x�xO�UQ�tv VN� C���Q VQv x� �ha��t� �DWoR�� pwtQi u�� uwJ

�a �� �B��B �xQ�tW

s�

�IMU� ���� Q �rrtr�u�� �x�O�LD� �xQ�� QO V�wr wrUq �� woDio

p�L QO ��yQwWm x � ltm x �O�L D� ��yhOy u � QDtyt R� �m � ��yTv�Qivm �Q�RoQ� ��Q� �r�t COa�Ut j� Q� R� "qFt CU� xaUwD

��yQwWm xvwo u�� QO ��� �yx�oQ�m

QO ��� �yx�oQ�m �yTv�Qivm QO u�OvtWv�O CmQW ��Q� �r�t ltm ��CU� x�O�LD� ��yxt�vQ� Qo�O R� ��vO QU�QU

���� Q VRwt� p��Ut x� �oO�UQ ��Q� �vw�U�tm u�vJty x�O�LD� ��OQ�O �yx�oWv�O w TQ�Ot QO

QO xJv� p��k R� �DOtR�QO w �t��O C�aw�wt w �yxt�vQ� Q� xwqa �Qy QO xm �D�aw�wt xQ�� QO Ovm�t �aU x�O�LD� OW xDio q��x� w OQw� sy�Qi �D�aq�� CU� u�v�O���� Q xHwD OQwt X�N u�tRR� xQki wO Q��L p�L QO �Ovm ltm lQDWt ��yx�oO�O pwYL

�OvDUy �yv�� �y�w�wt u��

xty x� O�R� QwOktr��DL �� O�R� �UQDUO u�mt� u�wD�t xvwoJ �%OQm sy�Qi CvQDv�� j� Q� R� �Q xDWPo ���� Q C�Q�WDv�

Q�F�D �� Q�� �HvU sra ��yVwQ R� xO�iDU� s�v�wD�t �Dkw xJ �%s� Q�PB� u�tQ�m ���� RQ� QO �Q �O�vDU� u�R�t

�Ovm�t ��a� syt �xR��H xU ���� Q �rrtr�u�� �x�O�LD�

&ROr�i u�Wv �

&��vrv�wv hrwQ xR��H �

�C����� Q ��yOQ� Q�m ��Q� Tw�o V� QO� Qi pQ�m xR��H �

V�wr wrUq

x�O�LD� T��Q Q��L p�L QO xm C����mQD nQR� XYNDt V�wr wrUqx � Q v T v�Qivm u�rw� �rY� u� v�QvNU wRH �CU� ��� � Q �rrtr�u� �u�� �Daily News� xv�RwQ x� QWv Q�ovQ�N �Ow� x�oWywSB QO h�Qo �Q�H�yC�r�ai xQ�� QO �y�Dwm �woDio OwN ��� p� Qw� �� xQ�tW QO Tv�QivmQO �Q w� ��yMU�B xDUHQ� C�mv xm O�O s�Hv� V�wr �� IMU ��yhOy w

�O�v�wN�t �Hv��

�m� xm OQ�O �tyt ��yhOy w h���w ���� Q �rrtr�u�� x�O�LD� �! Qy u�v�O���� Q �rrtr�u�� xQovo �Q�RoQ� w �yOv�tR�U �yv� R�CU� u�v�O���� Q ��Q� �tyt O�O� wQ xQovm u�� �CU� Q�� l� p�U�ywQo w OwW�t ��a� u�oOvQ� x� ���� Q syt R��wH u� �� xm���y�v�QvNU O�Q�� x� Ov�xOW ��NDv� CkO x� xm u�YYNDt R�xDWPo p�U OvJ QO ��� � Q ��yOQw� DUO u � QDtyt K � QW D QO�Q�m u�v�QvNU ��NDv� xrtH R� xt�vQ� u�� �yOv�tR�U �OvR�OQB�t

�OvQ�oQO u� QO p�U ! �� u�O���� Q �yOY xm CU�

Tw�o V� QO� Qi pQ�m �xR��H ��vrv�wv hrwQ �xR��H ROr�i u�Wv

�Oy� p�U !� Q� R u�v�O���� Q x� xR��H wO u�� �OQ�O X�YDN� C�aq����� � Q ��yQ�m R� Q �Ok D ��Q � Tw�o V� QO� Qi pQ�m �xR��H �OwW�t�CU� xOW u��aD Ov�xDi�� C����� Q R� GQ�N QO �tyt OQ� Q�m xm ��xDUHQ�

�rrtr�u�� xQovm x�L�DDi� xUrH QO Q�� l� p�U Q�yJ Qy x�O�LD� R��wHxDUHQ� ��yOQw�DUO x� ROr�i u�Wv �OwW�t ��a� �ICM� u�v�O���� Qswra ���� Q ��yx�vH x� �v�rv�wv hrwQ �xR��H �OQ�o�t jraD ���� Q

�a �� � Q�y�

s�

� TOL u� QDtyt �x��k u� QDtyt �Tv�Qivm �x�W�L QO �

� �

�wQ� �Q �i�� ��aW �QFm �OL u� CQw�Ht T� QD�t xm CU�xm ��xOvvm st�Um �t �OW� xDW�O �T�Q n Q �yCvtvQwD xOQOwN �rw CU� xO�U Qy�� x �Q�DN�U ��Q�O xOW xOR TOLCtw�kt �rL x�Q Qy Q�Q QO xm CU� p�U � COt x TOL

�Ovm�t

�wv�Dv�DUv�m �vr�

�� yh�Q o �O v xOQ QO G �� D v R� �� a u t Q � v x �Q��U h�Qo �Q�H x� Q�v QO �OaDt�xrY�i�s�vt�xrY�i

�Ov�syt�QwO l� ��Q�O �y�vDt xwQo l� �wQ Ov�ty ��r�m h�Qo Qy ��

�CU� �vDr�ty

urwm lH

h�Qo Qy CU� �m �L xm CrwW �pO� R �p�Dwo �uwQt�m x��k �pDmwm h�Qol� �� OW� �� u� xS�w Q�Okt u� QDmJwm xm s�vt

�OQ�O T�Q �� QFm �OL �� CU� ��N h�Qo l� ��DQ�Bs�vt�xrY�i h�Qo �y�vDt �O�OaD �ZwQit k � � ��R� x ��hwQat wD�����v� TOL x xQ�Ro u��� OQ�O OwHw k xHQO �

��CU�

V�wr wrUq

x�OQwwO ur�m xr�Uwx �vt�y ��yh�Qo ��i�� �R�UXNWt ���Colin de Verdi�er�es�

u� QO xm A � �aij �nij��

O�vm ZQi ��

aij �

���

� j � � �� ijj� CQwYu�� Q�e QO�det�A� � O�

pn� �CQwY u�� QO

Qywt u�Hw�

u�w D �Q X�N x�� k l � EL�t u �� QO svm�t v u� to ��OQ�O OwHw �OOaDt syt G��Dv �rw �O�t�v x��k u� QDtytOOa pt�W �V�wr I�wOv�U x��k� �ut xkqa OQwt x��k

�CU� V�wr ��D�� w ��t�i OOa ���xWwN�� yh�Q o x t y x m CU� aO� u �� u t x kq a OQw t TO L ���rw �OvDUy�vDr�ty ��vFDU� �y�vDt O�OaD � ��OOaDt�T�Q

�OW� syt u�OvJ TOL u�� xm svm�tv u�to

uUv�rw�Q QD�B

�xS�w ��yQ�Okt ��Q �interlacing� uO�J�B sy x x��k �

�OQ�Ov OwHw � xHQO R� �Qwt h�Qo I�y ��

s�O�UQB xDUHQ� u�v�ty�t R�

�CU�J h�Qo �Q�H �x� Q�v QO x��k �u� QDtyt �tW Q�v x� �

�CU�J h�Qo �Q�H �x� Q�v QO TOL u� QDtyt �tW Q�v x� �

OvO�O MU�B �yv w

�Or�Q� OQ�J� Q

x �� k� Q � R x �� k ut x kqa OQwt ��yx �� k R� �m � �xty w OQ�Ov ZLt ��D����mQD C��F� xm CU� �lqwB�s�Qoh�Qo x� RHD �Ov���N Q�H R� ���yxO�� Q �vD�t u� ��yC��F�n� � sm CUO xm �pt�m �WN wO ��yh�Qo x Kn pt�m

�CU� sRq Q�m u�� ��Q h�QoOwHw � � � w k OQi K�LY OOa l� �F u�O�t Qy ��R� x ��QiY�v ��yx��QO � n x�DQt R� AT� QD�t Qy xm�Qw�x OQ�O�� QDmJwm A x�DQ xm C�YwYN u�� � �rY� Q�k �wQQ�ODyH h�Qo QO� OQi �w�vDt QwOl� pt�W OW� �n �w�Ut

�CU� �xDU�w

p�UO�o T� Qm

k xHQO w � Q�k x Qwt h�Qo l� �uDrov�U�uti�y x��k ��k � �� ���� �� Qo � ki OQ�O OwHw

�d� � u� Qtm xR�Ov� w d u� Q�k xm CU� �i�Qo Qwt h�Qo���CU�

O�OaD ki �n � � K�LY OOa Qy ��R� x �wD�� w �� v� ���OQ�O OwHw k xHQO R� s�vt�xrY�i �y�vDt h�Qo �y�vDt

RQty sr� w

��ivt�v ��yT� QD�t xQ� QO Tw�vwQi�uwQB x��k �pk�OL �yv� xS�w Q�Okt u� QDmJwm xm ���yh�Qo xty �OvxOQ

��CrwW w �pO� R �p�Dwo �uwQt�m xr�Uwx� OW���� Q Q�PBs�UkD ���yx�D�Qt xty ��R� x Q�t�O� ��yT� QD�t ��

��Q�t�O� xQ�ov�� OvQ�O OwHw

OvrlQm w�DU�

CNQO � T� QD�t x��k x u��Q�v �sDU�v �r �t�� sO� ut ���Q ��N Q�H R� ����� R ��yxO�� �u� C��F� QO �sOvtxkqau�� �OwQ�t Q�m x h�Qo x� Q�v QO ��x r�Ut xQ� QO ELw �CU� h�Qo �Q�H x� Q�v x ����� R pNOt u�vJty x��k

�Ov�Wm�t xDWQ u�� x �Q �O�OH u�QoWywSB �u��Q�vKQ�t TOL u � QDtyt xm sDUy u �� Q��D v� QO Rwvy ut ��TOL �CU� ut xkqa OQwt xm ���yTOL R� �m� �t� �OwWT�Q n � �m �wQ �Dvt vQw D Q� DN�U xQ� QO � r��O r�Q

a �� �B��B �xQ�tW

s�

�yVQ�Ro w �yQ�����N��� � Q�y��

u�DUrov� �Uv�wU Rrw x�oWv�O utm� OrwvQ

Proofs� programs and abstract complexity lectures��

x�UwQ hwrmDU� C����� Q xUUwt hW�trm� ��O wr

Provability algebras and Kripke models lectures�

u�DUrov� QDUJvt x�oWv�O T� QB ��� hH

� Binary inductive logic�

� In�nite models of inconsistent arithmetic�

xUv�Qi � uw�r x�oWv�O �RwB wvwQ�

Foundations of positive logic �� lectures��

u�HvR x��B swra QO �r�tmD Cq�YLD RmQt QytQwB �Lr�Y O�aU

Modal logic of Herbrand consistency in weak

arithmetics�

x�oWywSB w Q��mQ�t� �DavY x�oWv�O w x�oWywSB u��OytQwB OwaUt

Continuous logic with integral quanti�ers�

h� QW �DavY x�oWv�O u��v��tQ pwUQ

Double negation of intermediate value theorem�

x�oWywSB xO�R�ra O�Ht

Basic predicate logic� Craig�s interpolation and

Robinson�s consistency theorems�

�m� Qt� uDovW�w ���m� Qt� x�oWv�O C��va �ra

� A model theoretic characterization of I���Exp�

B���

� Set theory with a class of indiscernibles�

h� QW �DavY x�oWv�O wrtU�k xw�m

E�ectiveness in continuous logic�

�m� Qt� �� Qe �wvr�� x�oWv�O �QDvqm GQ��

The computable� the incomputable� and the

computably incomputable�

C����� Q �xOmWywSB

h�Qo �Q�H �x� Q�v Tv�Qivm u�rw� �

�CU� xOt� Q��N� xQ�tW u�� � w ! C�LiY QO Tv�Qivm u�� KQW

���� j�vt Tv�Qivm �

xOmWywS B �Uw D ���� x�tO�OQN �! � D �� M � Q� D R� T v�Q i v m u ��xJ Qy ���DQ� pw� xryw QO Tv�Qivm u�� �Q�RoQ� hOy �OWQ�RoQ� C����� Qj�vt QO �rrtr�u� � u�QoWywS B u � Q DxDUHQ � � � � v�Q �� u�kkLt QDW� �xDWQ u�� QO �D�k�kLD ��yxv�tR �� u�� wHWv�O ���vW� u�vJty w ���� Q�D�aw�wt pwL "�DOta Tv�Qivm u�� QO xOW KQ�t C�aw�wt u��Q��v� �Ow�

�OvDUy �D�k�kLD Q�m x� pweWt �yv� QO �v�Q�� u�kkLt xm OvOw��R� OvOw� CQ��a Tv�Qivm u�� u�oOvvmQ�RoQ�

�O��v� ��yWv�O x�oWywSB �v�H� Qq �� O�wH OtLt �

Q��mQ�t� �DavY x�oWv�O w x�oWywSB u��OytQwB OwaUt �

�m� Qt� uDovW�w ���m� Qt� x�oWv�O C��va �ra �

�m� Qt� �� Qe �wvr�� x�oWv�O �QDvqm GQ�� �

�TQOt C�� QD x�oWv�O w x�oWywSB �Q�vt ��DHt �

u�vJty w x�oWywSB CU�� Q QDiO �UwD Tv�Qivm u�� ��yxv� Ry"�OwOL Tv�Qivm u�� QO u�oOvvm CmQW �O�OQo u�t�D C����� Q xOmWywSBQU�QU R� u�� wHWv�O u�vJty w �yx�oWv�O �tra C��y ���a� R� Qiv ��

�OvOw� u�Q��sU�Qt �OWR�e� K�Y � Ca�U x�tO�OQN �� x�vWm� RwQ Tv�QivmC����� Q xOmWywSB xOv��tv u��OytQwB OwaUt ��� woOt� VwN �� x�L�DDi�xOmWywSB CwUmW�B �y�WwQUN ��Qtqe QDmO TBU w O�OQo R�e�j�vt OWQ u�vJty w x�oWywSB R� �QYDNt xJN� Q�D QmP x� C����� QR� �oOv��tv x� �QDvqm GQ�� R�v u���B QO �CN�OQB x�oWywSB QO ���� Q

�O�O Tv�Qivm xQ�� QO �D�L��wD u�oOvvmQ�RoQ�

��y�v�QvNU u�wva w u�v�QvNU

TQOt C�� QD x�oWv�O w x�oWywSB �Qk�� OtLt O�U

Model theory for measure structures�

��a �� � Q�y�

s�

�v�QvNU lD �

u�yiY� �DavY x�oWv�O �Ow�y� OwtLt

Strong zero�divisor graphs of rings and their

application to classi�cation up to isomorphisms of

small rings�

u�DUrov� OQwiUm � x�oWv�O C����� Q xUUwt u�WNQO O�WtH

� Logic and integration�

� De�nable sets� p�adic integrals� �nite �elds and mo�

tives�

u�Q�� QO xUv�Qi CQ�iU �ovyQi QDiO pt�ywO u�DU� Qm

The Erasmus�Mundus program for mobility of Iranian

students and academics�

x�oWywSB �v�yWyW O�OQyt

The Poincare� conjecture and the Ricci �ow�

�O�v�m Institute of Structronics u�Qwo Q�WOQ�

Mathematical tools used in static and dynamic

analysis of Resket�Lajim great towers How can we

save our historical monuments�

u�DUQ�Ht Ov�Qr VwD� x�oWv�O V�wr wrUq

Development of combinatorics in Hungary�

u�tr� lvqB Tm �t xUUwt QrwtUwy p�O

From Kummer to Milnor and Voevodsky�

l� R�i �xOmWywSB

�Q�v l� R�i �xQ�y� Tv�Qivm u�tyOQ�yJ �

CWy��OQ� ��$�� ��yRwQ QO �Qv l� R�i xQ�y� Tv�Qivm u�tyOQ�yJ�� w Ow� Qiv ��� u�oOvvm CmQW O�OaD �OW Q�RoQ� lQq d�� QO ���� x�t��Q� p�ai QoWywSB ! R� Tv�Qivm u�� QO �OW O�Q�� xQwO u�� QO �v�QvNUxO�t l� R�i �O��v� C�QP l� R�i ��yxN�W QO �twta �v�QvNU O�Q��w x�Dwm �QwQt �� �D OW CwaO �U�vWu�y�m w �twDv�wm C��U�Lt p�oJxm p�w�U u�� x� w Ovvm �iQat �Q OwN �D�k�kLD xN�W RwQ p��Ut j�kO�wQ C�k�kLD QDW�� w OvDUy Ovtxkqa ���y�w�wt xJ x� ��vO QO u�kkLtQDW�� ���vW� Qwvtx� CwaO u�� �OvyO� ��wH OwW�t s�Hv� �r��Ut xJCQwY l� R�i hrDNt ��yxN�W QO u� wv ��yVywSB �� u�oOvvm CmQW

u�DUrov� RO�r x�oWv�O QBwm �Q� �T�

Post�s programme an update �� lectures��

u�tr� u�rQ� COrw�t�y x�oWv�O I� wwr� Qw�o �Q �W�t

A categoricity theorem for universal covering spaces of

complex algebraic varieties�

�DWy� O�yW x�oWv�O w x�oWywSB ��Q�vt ��DQt

Intuitionistic bounded arithmetic and the polynomial

hierarchy�

Ovqvi �mv�Ury x�oWv�O uv�vw wmwH

� An introduction to dependence logic�

� Interpolation in model theoretic languages�

XwYNx� w Ow� �wN �yv� C�i�m w �YYND Q��U� �y�v�QvNUQ�H j�vt Tv�Qivm w x�oQ�m �� xU��kt QO Tv�Qivm u�� QO xOW KQ�t p��UtC����� Q xOmWywSB QO ���� x�tQyt �� �D �� M� Q�D R� xm ��UL wTB Tv�Qivm u�� Cq�kt xawtHt CU� Q�Qk �Ow� QDRmQtDt Ow� xOW Q�RoQ��T� �QDvqm GQ�� C��va �ra� x� Q� QLD C��y CQ�v CLD �Qw�O R�j�vt �YYND Q�Dat CqHt R� �m� QO �T� QB ��� hH w QB wm �Q�

�OUQ� A�J x� ���� QC����� Q xv�N CwaO x� u� waOt R� �O�OaD Tv�Qivm u�� u���B QOu�vJty w OvOQm QiU u�yiY� QyW x� �N� Q�D ��y�v� O�OR�� ��Q� u�yiY�C����� Q xv�N QO �twta ���y�v�QvNU uv�vw wmwH w C��va �ra QDmO

�OvOQm O�Q�� u�yiY�

�yv ��yOQ� Q�m w �yQorta Q�H �oDiy Q�v�tU �

�� � x�tCWy��OQ� � w x�tu�OQwQi �� ���u�HvR x��B swra QO �r�tmD Cq�YLD RmQt xO�R�v�yiY� �i�Yt

Topological K�theory of C��algebras�

�� � x�tCWy��OQ� �� w ��x�oWywSB j� RvU �tQm � s�y�Q�� O�U

Why operator algebras�

�� � x�tO�OQN �� w �� ���h� QW �DavY x�oWv�O �kO�YQ�t O�t�

Quantum random walks�

��a �� �B��B �xQ�tW

s�

�j��ax�Wv�tQm �R�Q x�oWv�O �v�kyO uULt

�QD�UwO u�tR���i QO ��N Vv�Qo u�O�t �m� R�i CtUkQO �r�tmD Cq�YLD RmQt w Civ CavY x�oWywSB �rwUQ QO�v O�U

u�HvR x��B swra��tO u���O�Qo p�ta� QF� QO Q�OQ�� ��yO��wrm CmQL

u�HvR x��B swra QO �r�tmD Cq�YLD RmQt �v�O���QU pqH�lQLDt ��yxQ�w�O �� l �w�m QO Q�t� R�m l�t�v�O QF�

�DWy� O�yW x�oWv�O ��qaO�U Ot�LO�U��v�BU� ��yxW�W �SQv� �xQ�vt ��xm�W �SwrwB wD

��v� C�k�kLD RmQt w h� QW �DavY x�oWv�O �v��q�U �Uyt��Hv ��yR�o R� ����L lD Tv�Uv�twrwvwU �UQQ�

u�HvR x��B swra QO �r�tmD Cq�YLD RmQt �v��aW �QOtLt��a�wt CqqDN� Q��Q� QO ��xv�O sDU�U �Q�O��B

x�oWywSB �Q��H M�W �OytOtLt����Hx��H�v R�i ���i �� �rOt QO xOQWi ���i sHL C��FD

x�oWywSB w Qwvs��B x�oWv�O u�QOwO �Qw�Y T��aQ�t��uwDBt�m �oOvm �QB UwD Cu�o �Ovw�B X�wN �UQQ�

CavY w sra x�oWv�O �L�LY ��r�D��D��Uv s�tD Cq��U QO �v�t� Q G�wt�u�vtU x�oWv�O OQivt �Qy�� �Q�U

�QCD QO �yxv�DU� w �wk �oOWCiH C��Fh� QW �DavY x�oWv�O QwBO��a �t�v

����kr� OQ� x�Dwm �U��vet u�O�t w u�i�Qo K�U �Q� Rx�oWywSB w u�HvR x�oWv�O OvwOqwi s�y�Q��

�C��F lU�O �� rY �xr�t l� u�UWm OQwNQ�x�oWywSB �tU�k �t�U

�OQ�O �Q�oR�U Q�N� ��yOYQ �� s�N� � xt�W pOt ���u�HvR x��B swra QO �r�tmD Cq�YLD RmQt �v�� Qk s� Qt�DNA x�Dwm ��yxkrL �xLiYR� GwQN Q� �OQov�Uty�v QF�

h� QW �DavY x�oWv�O QwB �t� Qm O�Lw��twDv�wm C�aq� w p�oJ �xO�t

h� QW �DavY x�oWv�O �JmQwm u�UL�O�ODt� QO LTB l � QDt p�Y D� T�U� Q � xDi� � Q�DN�U utO � Qi u�yH

�xDWPo �Qwv �wQNtl �Q� x�oWv�O �O� �wt u�Qt�m O�U

xDU��w QF �wt sQH �� �Oa� l� Qov�OwQW �xrO�at ��Q� O�ktCr�L ��yMU�B��DrO ���D P�H p�Uv�DB l� Qw�L QO u�mt x�

w u�Q�� pN�O u�QoWywSB �tra �Q�oCyH QO Qt� u�� CU� O�t� �CiQo�OwW k�w O�it xDiQW�B ��yQwWm �� xU��kt p��k VywSB K�U x� uO�UQQ�Qk u�Qw�O �UQQ� OQwt �OH Qw� x� xOW xDiQ�PB Cq�kt xmv�� x� Qv�Qw�OQo u�oOvU� wv �UwD xOW p�UQ� �CQwY u�ty x� �yxr�kt CU� xDiQovxHwDt �y v� �r��t uOw � �O � w uOw � CUQO �tra C�rwUt w xOWQO e�proceeding CQwY x� xawtHt u�� �CU� u�oOvU� wv �� xOvU� wv

�CU� �UQDUO p��k l� R�i xOmWywSB x�o�w��yu�Om� R�i R� uD OvJ CmQW �� �tra �OQoR�t u�vJty xQwO u�� QOw Ow � uqOQ� O�yQi xOya Q � u� C � Q �Ot xm OW Q�RoQ � u�Q �� CwUmW� B�ovwoJ Tv�Qivm xt�O� OQwt QO XwYN x� hrDNt C�aw�wt xQ�� QO

�OW Qv pO��D w EL� u� C�i�m w �QH�

��y�v�QvNU u�wva w u�v�QvNU

h� QW�DavY x�oWv�O w x�oWywSB �aiQ� u�Or� s�UL�xOv�� w xDWPo � C�QP OQ�Ov�DU� pOt

h� QW�DavY x�oWv�O srUt �tqU� RwQy���HQ�N VWm x� OQov�Uty�v �DNA MU�B

x�oWywSB �R��� QU�� O�UQO �vwDBr sa Zkv ��yxtWJ R� �W�v uwQDmr� �m� QDmr� ���kwO

�MSSM� OQ�Ov�DU� pOt �vQ�kDQ�� �xv�tm U���v� C�k�kLD RmQt w h� QW�DavY x�oWv�O �v�t�� xH�ON

�l� QwirwU O�U� hrDNt ��yC�re w � QO Tv�Uv�twrwvwU xU��ktu�QyD x�oWv�O l� R�iw�S xUUwt u�� Q�OQwNQ� xv�tQ

xO�OB �R�Ux��W �� x�Qty wH Q�PB�vsm �QD CqO�at �U� pmW �OOa pL��� QO s�Uv

x�oWywSB �Q�W� �rw��vwQO�y ��y�W�B�w R� ��a� QO sQ�yJ �wv lQ�wm C�Q�F��D

OyWt �UwOQi x�oWv�O u�O� w�H VQwm� w�a �� �SwrwB wD ��yuwD�r�U VvmtyQ�

Q��mQ�t� �DavY x�oWv�O ��vH �v�UL �OytO�U�R�i ���i ��kv �xYNWt ��yQ�Ut Q� �vD�t hwUqw xrO�at �R�Ux��W

u�vtU x�oWv�O w x�oWywSB u��tQN �kv �ra��y�oW��tR� ��yxO�O R� xO�iDU� �� �Dm� Q�e Q�DN�U �UQQ�

x�oWywSB w srat C�� QD x�oWv�O �wQUN s�QyW�SFRW pOt �s�a C��Uv QO �Q�ou�ov��t Ov��Qi KqY�

u�Q�� CavY w sra x�oWv�O �v��wN O�yQi��v� Qm Aw�D wv�v QO �vwQDmr� �OQ��QD X�wN

Q��mQ�t� �DavY x�oWv�O OwQO uw��DmxLiY R�UQ�mW� OQmrta w uty� ��yQDt�Q�B Q� �tO C�Q��eD QF� �R�Ux��W

��a �� � Q�y�

s�

�y�v�QvNU �r�k QO x�oQ�m VN� QO �OvDN�OQB Ow� xOW xDU�wN �yv� R� xmOwN Q�N� �WywS B ��yQ�m x ��Q� x � u�kkLt xDa�U s� v ��yQ�v�tU ww �yK�Y u�mtq��DL xUQOt ��y�v�QvNU xm Ow� xOW �aU �OvDN�OQBQO �y�v�QvNU K�U Qv R� �OvwW Q�RoQ� �yQy�R�Oa� x�oQ�m ��yQ�v�tU�Q �y�v�QvNU K�U xm Ow� xOW xDU�wN waOt u�UQOt R� xUQOt VN�s�vD �QDmOCU B pw� xQwO �� �QDmO xQwO QN� ��yp�U u�� wHWv�O ��Q�xUQOt QO RwQx � w xDiQW� B � r��t uOQm KQ�t �� vat x � u �� w Ovvmu�� QO ��U�vt CQyW ISS TQ�Ot E�L u�� R� w CU� u�tU� Q x� Qv

�CU� xOQm �O�B u�tU� Q x� Qv u�QoWywSB

���yCw�iD p�k p�U x��Wt V��ty �� sy �D�yH R� V��ty u�� �t�CmQW xOa p�UQ�B hqN Q� �HQ�N u�oOvvm CmQW ��mQD Qv R� �CW�Ol� I�y "��� QkD �CW�O �Q�O�vat Vy�m ����m� Qt� ��� �m� Qt� R� u�oOvvmw xOQmv CwaO pw�k s�Ow� xOQm CwaO �m� Qt� R� �t xm ���yu�QvNU R�C�Uv xOvvm CmQW �HQ�N u�� wHWv�O O�OaD Qo�O hQ� R� �OvOw� xOt��v�t CwaO �� xv xD�r� u�� wHWv�O u�� �CW�O �rw�k p��k V��Ri� p�UQ�B x�hQ� R� �OvOw� xOQm s�v C�F ISS���� QO CmQW ���kDt u�wva x� xmr�C�Uv ��xLqt p��k V��Ri� T�rov� R� �yu�QvNU w u� waOt O�OaD Qo�Oxv � Ry �r�t Q v R� �CW�O u� R� p�k ��yxQwO u�vJty w p�UQ� B x �xUUwt w Ow� xOmWywSB xOya x� p�k ��yp�U Ovv�ty V��ty u�� �rY�w�The Abdus Salam ICTP� sqUr�O�a �Qv l� R�i �rrtr�u��l� R�i xOmWv�O �U�vWv�y�m w u�O�t x� Qv C�QP �tra ��k u�vJty�OvOw� V��ty u�� �Q�RoQ� �r�t u��t�L R� sy h� QW �DavY x�oWv�Ow O�OaD w Q�DN�U QO C�Q��eD u�R�t CiQ u� QYDNt KQW xm Qw�u�typ�U Qy xOmWywSB u�tU� Q �rrtr�u�� TQ�Ot QO u�oOvvm CmQW ��mQDx� Qv u�QoWywSB u�� QO TQ�Ot u�� xm CU�vat u�O� u�� w xOW QDtm�OwQ �t Q�tW x� xOW xDN�vW TQ�Ot �RH �rrtr�u�� K�U QO u�tU� Q

�HQ�N w �rN�O u�oOvvmCmQW u�� QO XwYN x� �i�m Qv R�OvwQ u�� xm CU� O�t� w s��xOw� Ttr p��k w QtDUt �t� Ovm �OWQ Oy�W�DU�Q u�� QO �O��� xt�O� ISS ��yV��ty �QU xv��r�U �Q�RoQ� OWQ x� wQxOmWywS B u�tU � Q x � Q v �Oa � ��yV ��ty �Q�RoQ � ��Q � �R � Qxt� vQ �w l�U u�ty �� ��� p�U x�t u�OQwQi QN�w� QO ISS���� l� R�i

�CU� xOW R�e� j��U

xO mW ywS B x� o�w QO V �� t y u �� OQw t QO � r � t m D C�aq��http���physics�ipm�ac�ir�conferences�iss����

�CU� OwHwt

��y�v�QvNU u�wva w u�v�QvNU

x�oWywSB OQi�Q�Um � sU�k

OvHQ�� x�oWv�O �mr�t Ot�L��rO�aDQ�e �Q�t� l�t�v�OwtQD

u�HvR x��B swra QO �r�tmD Cq�YLD RmQt O�Sv �OtLt �Q�U��D�iQ� OvJ ��yltv Qw�L QO CNU ��yC�rwQDmr� �rB �oDW��v�

x�Wv�tQm �R�Q x�oWv�O �O�Qt QwBy�W�QD�UwO ���i QO C�QP jrN Q� �U��vet wQDmr� ��yu�O�t C�QF�

h� QW �DavY x�oWv�O �k�Qa �t�kt u�t�U��r�� �vW ��yxBD xr�Ut Q� lJwm T��kt w RQt C�QF�

u�HvR x��B swra QO �r�tmD Cq�YLD RmQt �DNO�� xO�Rqt xrq�R�Qt�rB RNA �xr�Uw x� �twRw�rmwv DNA �Q�OQ�xNUv ��Q� �rOt

h� QW �DavY x�oWv�O w x�oWywSB �QwYvt �Q��U�vWv�y�m �U�U� ��yp��wU

x�oWywSB w h� QW �DavY x�oWv�O OLwt jO�Y OtLtO�U�uOw� �Uwo �UQQ� ��Q� �vwtR� �u�y�m �� xv�tRV��D �wkwTv�mQi p�rLD

x�Wv�tQm �R�Q x�oWv�O �wUwt xRtL� MgB� ���v�UQQ�� �wQ �U��vet Q�e �Yr�N�v QF� �UQQ�

TQOt C�� QD x�oWv�O ���RQ�t OwtLt��yQDt�Q�Bltm x� O� QD�v�Qw� xrwrwv�v QO �v� Qm �Yr�N�v Vkv �xar��t

��r�oJ �a��D �x� Q�v �� xOW x�U�Lt �xDUy T��vet O�OWDu�QOvR�t x�oWv�O �UOkQY�v O�t�

QF� uDiQo Q�v QO �� u�ovU ��yuw� VvmsyQ� QO �vrwm p�Uv�DB �xar��t�x��B Cr�L QO �yxDUy pmW Q��eD

x�twQ� x�oWv�O �Q�v u�t��u� G��Dv w xQP wO R� V�� x� p� �w�Ut�v s�taD

x�oWywSB �Qiv QY�v�RwQ r��t w p�oJ xO�t l� R�i

ISS����Tv�Qivm �

�rrtr� u�� x�oQ�m w xUQOt u�tWW ���� p�U x�t u�OQwQi �� �D ��u�tDN�U QO V��ty u�� �Q�RoQ� pLt �OW Q�RoQ� ISS���� u�tU� Q�va � p�k p�U O�Qi� u�ty xOvvm Q�RoQ � xD�tm �Ow � x�oWywS B u�Qw� � v

R� u�DUQwr�U �w�� Ovy HRI xUUwt R� uU lwW� �����ir� ��DQD x���y�y�W�ra uULt w �Q��HM�W �Oyt OtLt �m� Qt� OQwivDU� x�oWv�OT��OvQ� x�oWv�O R� Tv�Qwr uw��r� �l� R�i xOmWywSB� x�oWywSB R�u�oOvvm CmQW O�OaD �Ovy QO�TIFR� �D�D xUUwt R� ��O�w �DvBU� w �m� Qt�QwWm R� GQ�N R� �t�v w pN�O R� �yv� R� �t�v "��� QkD xm Ow� Qiv �� OwOL�r�k ��yxQwO j��U w l�U u�ty x�ISS���� �tra Q�DN�U �OvOw�xUQOt VN� QO �Ow� xOW p�mWD x�oQ�m w xUQOt VN� wO R� �va� Ow��aw�wt �wQ xDa�U l� �v�QvNU GvB �D xU O�Q�� x� waOt u�QvNU OvJ

��a �� �B��B �xQ�tW

s�

x�oWywSB �v�yWyW O�OQyt

The Ricci �ow� towards the proof of the Poincare� con�

jecture�

x�oWywSB �Q��HM�W �Oyt OtLt

Non�Abelian magnetized blackholes and unstable at�

tractors�

u�Q�OvR�t x�oWv�O �kO�Y QiaH

Shape invariance for the bent brane with two scalar �eld�

x�oWywSB �kwOY �Ov

Strong QED�

x�oWywSB w h� QW �DavY x�oWv�O xvt�N p��eQ�i �Q

Double horizon limit and decoupling of the dynamics at

the horizon�

x�oWywSB w OyWt �UwOQi x�oWv�O xO�ROwtLt �UOk OtL�

R� correction to the entropy of non� extremal black

holes�branes�

OyWt �UwQi x�oWv�O �UwQo �QOtLt

Superstring scattering from O�planes�

u�DUrov� �Dv�rU Gr�m CrCv�o swQH

Classifying supergravity solutions and applications to

AdS�CFT �I�II�III��

u�yiY� �DavY x�oWv�O u�Qwr nvyQi

The holomorphic anomaly and quantum background in�

dependence in form theories�

x�oWywSB u�Q�O�Dmt �Qtqe

Field equations at horizon of a BTZ black�hole�

�D�D C�k�kLD RmQt ��O�w �DvBU�

Topics in blackholes and the AdS�CFT correspondence

�I�II�III��

IIB perturbative worldsheet corrections to dyons en�

tropy and the OSV conjecture�

u�DUrov� �Dv�rU Gr�m xrDU� �rm

� Introduction to BPS brane solutions in supergrav�

ity �I�II�III�IV��

� KK SUSY breaking and a natural mass hierarchy

in a type IIB Randall�Sundrum geometry�

G� Q�tm x�oWv�O nv�D O�w�O

The quantum dynamics of vortex strings �I�II��

h� QW �DavY x�oWv�O w x�oWywSB u����QD �OytMatrix model for DLCQ of type IIB string theory on

the AdS�

Ovy �D�D C�k�kLD RmQt Q�O V�v� w

Chiral symmetry� baryons and holographic QCD

�I�II�III��

u�DUrov� �Dv�rU Gr�m h�O pW�t

Black holes� qubits and the Fano plane�

Ovy Q�Ov�J V� Qy C�k�kLD O�w�O u�DU�HThe dyon partition function in N�� compacti�cations

�I�II�III��

l� Sr� KU Lenven hvO l� QOQi

� Flux compacti�cation and moduli �xing �I�II�III��

� Black hole deconstruction�

Ovry s�OQDUt� x�oWv�O Q�w��O u�H

From coarse grained microstates to gravity �I�II�III��

Ovy �D�D C�k�kLD RmQt w OQ�wQ�y x�oWv�O wH�Q C�QwU

Elliptic genus from classical supersymmetric solution�

u�yiY� �DavY x�oWv�O �aQ�R srUtNoncommutative �eld theory without IR�UV mixing�

u�yiY� �DavY x�oWv�O �y�vBu��rU s�UL

Form �eld theory on Calabi�Yau threefold�

��a �� � Q�y�

s�

VQiD x�oWv�O w x�oWywSB xwSB�t�mL u�ULOn the solar physics�

Q��mQ�t� �DavY x�oWv�O �ywmW �Q

� Plasma expansion into a vacuum�

� Study of kinetic e�ects in plasma expansion into

vacuum II��

x�oWywSB w Q��mQ�t� �DavY x�oWv�O �U��a u�ULStationary solutions of the electrostatic Vlasov equa�

tion�

�DN�vW swra �xOmWywSB

�yTv�Qivm �

���� x�tu�OQwQi ��$��COt x� u�OQwQi �� R� Neural Basis of Motor Control Tv�QivmQDmO Q�v�tU u�� u�QvNU �OW Q�RoQ� x�oWywSB C�atHD Qq�D QO RwQ �u�ty�t xDiy � COt x� �w �Ow� �O�v�m QO u�� wm x�oWv�O R� C�mU� u�iDU�

�Ow� �DN�vW swra xOmWywSB��y�v�QvNU u�wva

� Overview of motor system motor periphery� CNS

and behavioral�

� Primary motor cortex history ���� to �����

� Primary motor cortex and limb mechanics�

� Context�dependent neural processing and motor

learning�

� Optimal feedback control and neural basis of voli�

tional motor control �I�II��

���� u�OQwQi ��RwQ QOModular Architecture of the Motor System Tv�QivmQ�v�tU u�� u�QvNU �OW Q�RoQ� x�oWywSB C�atHD Qq�D QO u�OQwQi ��xDiy � COt x� �w �Ow� �m� Qt� ��D����s� x�oWv�O R� �RD�� w�r�t� QDmO

�Ow� �DN�vW swra xOmWywSB u�ty�t

���� x�tCWy��OQ� ��$��� COt x� x�tCWy��OQ� �� R� Cognitive Neuroscience Tv�Qivmum QDmO Q�v�tU u�� u�QvNU �OW Q�RoQ� x�oWywSB C�atHD Qq�D QO RwQ

u�tU� Q �x� Q�v Q�v�tU �

h� QW �DavY x�oWv�O w x�oWywSB �Q�m � �ra OtLtElectri�ed giant gravitons�

x�oWywSB OQi�Q�Um � sU�kWorld�sheet corrections to dyons in the type II string

theory entropy and the OSV conjecture�

x�oWywSB �Q��HM�W �OytOtLt

Lovelock gravity at the crossroads of Palatini and met�

ric formulations�

x�oWywSB w TQOt C�� QD x�oWv�O xO�RQiY pwD�

Dual spikes� new spiky string solutions�

x�oWywSB �iYt p�a�tU�Q�t�

Topological black holes�

p�oJ �xO�t l� R�i Q�v�tU �

u�yiY� �DavY x�oWv�O ���Q �Q

Theoretical study of single bubble sonoluminescence�

x�oWywSB �QoUa �Q

Electronic properties in graphene�

xUv�Qi p� wvwQo �HvUh�� l� R�i x�oW��tR� x�rwm u� QD�mBuckling in solution of spherical colloidal shells�

�DavY x�oWv�O w x�oWywSB �O�yDH� �QOLt w �Qovr xrr�O�ah� QW

Presentation on recent news in CMP�

u�HvR x��B swra QO �r�tmD Cq�YLD RmQt xO�R�r�w �Q�ra

Synchronization of Josephson Junctions in a single�

plaquette triangular array�

�tUqB Q�v�tU �

Q��mQ�t� �DavY x�oWv�O ��vH �v�UL �Oyt

Analysis � simulation of plasma � wall transition�

� a �� �B��B �xQ�tW

s�

�oDiy ��yQ�v�tU �

x�oWywSB QwBs�y�Q�� �Q

Mixture of experts for view�independent face recogni�

tion�

x�oWywSB w u�QyD x�oWv�O �vi xOmWv�O xO�Rv��v��rU O�tL

Multi�modality analysis for epilepsy�

x�oWywSB QwBs�rU hUw�

Neural engineering�

x�oWywSB QwB Q�t VwQwm

E�ect of stimulus presentation time on response prop�

erties of inferior temporal cortex of macaque monkeys�

x�oWywSB w u�QyD x�oWv�O �vi xOmWv�O ���Qa� Q�Hv l���

Knowledge evaluation for knowledge sharing�

x�oWywSB QYv u�y�W

The impact of backward masking on visual object cate�

gorization An ERP study�

x�oWywSB w u�QyD x�oWv�O �vi xOmWv�O �O�� OtL� �r�v O�Ht

On learning and abstraction in multimodal sensory

space�

QDw�Bt�m swra �xOmWywSB

�FSEN ����� Q�Ri�sQv �UOvyt �rrtr�u�� V��ty u�twO �

�� � D �� R� Q�R i�sQ v �UO v y t � v� � t � r r t r�u � � V �� ty u � twOsw ra xOmWywS B �Uw D � �� tyOQ o u �� �OW Q�R oQ � ���� u �OQwQ iwACM SIGSOFT �Q�mty �� w �O��v� ��yVv�O x�oWywSB QDw�Bt�mRmQt u�vJty w h� QW w u�QyD ��yx�oWv�O C��tL wIFIP WG ���

V��ty �OW Q�RoQ� swra CQ�Rw �rrtr�u�� �tra ��y�Q�mty C�ar��t�QwY ��yWwQ hrDNt ��yxv�tR QO xm �Q �v�� wHWv�O w u�kkLt jwixS� wx� C�aw�wt u�� �OQw� syOQo Ovvm �t xar��t Q�Ri�sQv �UOvyt QO��yl�vmD �� x�Qty �QwY ��yVwQ w xDiQW�B �OQ� Q�m ��yxt�vQ� pt�W

�CU� Q�Ri�sQv �UOvytQwWm � R� � D�k�kL D RmQt �� u�kkLt pt�W xOvvm Q�RoQ � xD�tmx� xr�kt � �wtHt QO �OvOQm ��NDv� �Q V��ty �vi ��y�w�wt u�yH� w x�Dwm xr�kt � �rwtat xr�kt �� "�D��yv xm OW p�UQ� Tv�Qivm xv�NQ��OR� pkDUt Qw�O � pk�OL �Q xr�kt Qy �OW ��NDv� QDUwB CQwYx� xr�kt

u�ty�t xDiy � COt x � �w �Ow � �m � Qt� OQ�wQ�y x�oW v�O R� �t� ��m � v�Ow� �DN�vW swra xOmWywSB

��y�v�QvNU u�wva

� Mid�level vision neglected yet still important�

� Normal and abnormal face processing in humans�

� Distinct signals for the control of pursuit eye move�

ments evidence from individual di�erences�

� Cognitive control of eye and hand movements�

���� x�tO�OQN �$�x� x�tO�OQN � R� Cognitive Neuroscience of Memory Tv�QivmQ�v�tU u�� u�QvNU �OW Q�RoQ� x�oWywSB C�atHD Qq�D QO RwQ � COtxDiy � COt x� �w �Ow� �m� Qt� lQw� w�v x�oWv�O R� �J�wO q�r QDmO

�Ow� �DN�vW swra xOmWywSB u�ty�t��y�v�QvNU u�wva

� Cognitive psychology of human memory�

� Neroscienti�c methods to studying memory�

� Animal physiology and lesion studies of memory�

� Human functional imaging approaches to under�

standing episodic memory�

���� x�tO�OQN � $��RwQ � COt x� x�tO�OQN �� R� Cognitive Neuroscience Tv�Qivmu�QUB uS�� QDmO Q�v�tU u�� u�QvNU �OW Q�RoQ� x�oWywSB C�atHD Qq�D QOxOmWywSB u�ty�t xDiy � COt x� �w �Ow� �m� Qt� lQw� w�v x�oWv�O R�

�Ow� �DN�vW swra��y�v�QvNU u�wva

� Spectral methods for neural informatics�

� Encoding of movements by local �eld potential ac�

tivity in posterior parietal cortex�

� Relative position codes and sensory�motor trans�

formations�

� Free choice activates a decision circuit between

frontal and parietal cortex�

��a �� � Q�y�

s�

� Gentzen calculus�

� Intuitionism�

� Disjunctive syllogism�

� Conditionals�

� Normativity of reasoning�

� Logic of probability calculus�

� Dummett�s veri�cationism�

�oDiy ��yQ�v�tU �

x�oWywSB u�oO�R s�y�Q���sU�r�wO w �vyP C�ra

TQOt C�� QD x�oWv�O �Q�m � �Q����Qo u�t��

x�oWywSB O� Q�wQt OwtLt��OQmQ�m ��yVkv Q� �vD�t �U�vW�vat

u� ���DQ� R�v w xr�kt QO xOW KQ�t ��yxO�� �vWwQ w �oR�D C�i�m #�Lr�� R� xOvvm CmQW �� OwOL O�OaD �OvOQm �UQQ� V��ty C�aw�wt ��

�OvDW�O CmQW V��ty u�� QO u�yH QwWm�R� OvOw� CQ��a xm CW�O �rY� u�QvNU ! jwi V��ty

�m� Qt� T�RoD uDU� x�oWv�O uw�Q� Rt�H��yQ�Ri�sQv �HvU Q��Da� w �����DUQO Vv�O �R�Uu�Um�

uB�S w�mwD x�Wov�O �D�Hwi wQ�y�U�t�����DUQO �� xW�QD �wQ sDU�U ��Q� Q�Ri�CNU w Q�Ri�sQv u�tRty �L�Q

�C�aq� pO��D w �D��U�Lt ��yCtUk ��Q� xv�o �OH

��yv�� R QO xiQ wO Cy��W ��r�D�� �� wr� x�oWv�O �HQw�HvU O� w�O�QDq�� D�Qt

u�DUrov� Rrw uwUv�wU x�oWv�O TUwt O�w�O QD�B��U�vW�vat �UOvyt pwY�

x� oQ� m wO IFIP ��� �Q� m xwQ o FSEN ���� V �� ty Q� v m QOx�oQ�m �OQm Q�RoQ� �rrtr�u�� xOW xDN�vW u�kkLt �UwD xRwQ l� �WRwt��UwD �U� wvxt�vQ� ��yu�� R QO �U�vW�vat OQ� Q�m w pwY� u�wva �� pw��RQ�sy��OvwQty �U�vW�vat u�wva �� swO x�oQ�m w TUwt O� wO QD�BwO u�� �OW Q�RoQ� �HQw�HvU O� w�O �UwD Twmat ��QkDU� w �Q�DiQEa�� OW xH�wt Q�otWJ p��kDU� �� w Q�RoQ� �r�a C�i�m �� xm x�oQ�m�tra xD�tm R� CU� sRq xr�Uw u �� x � �O �OQo FSEN ���� C � wk D�wN C�i�m �� FSEN ���� Tv�Qivm �Q�RoQ� QO xm �WqD w �Q�mty

�s�vm �v�OQOk OvDW�O

�r�rLD �xiUri �xOmWywSB

Tv�Qivm �

���� CWy��OQ� �� �D u�OQwQi ��

x� x�t u�OQwQi �� M� Q�D R� u�DUrov� nv�rQDU� x�oWv�O R� ur�t QD�B�� COt u�� QO �w �Ow� �r�rLD xiUri xOmWywSB u�ty�t RwQ �� COt

�OQm O�Q�� �v�QvNU�CU� Q� R KQW x� x�r�Q�Wt ��y�v�QvNU R� �NQ� u�wva

� The intertwined roots of analytic and continental

philosophy�

� The meaning of logical constants�

��a �� �B��B �xQ�tW