Download - September 2005 THE ORIGINS OF LIGHT Prof. John Watson EG 40GC Optical Engineering LECTURE NOTES
September 2005
THE ORIGINS OF LIGHTTHE ORIGINS OF LIGHT
Prof. John WatsonEG 40GC Optical Engineering
LECTURE NOTES
September 2005 Prof John Watson
The Character of LightThe Character of Light
• To understand the operation of the laser and other light sources need to appreciate the unique character of light emitted from gases and solids.
• All radiating bodies when viewed by the naked eye possess a characteristic colour. Sunlight is white, a piece of hot iron is orange-red, a sodium lamp is yellow.
• If the light from any of these sources is passed through a prism it spreads out in a series of component colours known as a spectrum. Sunlight appears as a continuous band of colours ranging from red through to
violet The piece of iron also shows a continuum but only from dull red to orange The sodium lamp displays a series of bright, sharp, narrow lines
• Whether the spectral distribution is continuous or is in discrete lines depends on the nature and temperature of the source.
• In this lecture we will discuss thermal light sources Those whose spectral output is related to their temperature
September 2005 Prof John Watson
Spectral EmissionSpectral Emission
September 2005 Prof John Watson
• Light originates from excitation and de-excitation of atoms between various energy states
• Atoms consist of nucleus surrounded by “orbiting” electrons in different states of excitation
September 2005 Prof John Watson
Absorption & Emission of Energy in Isolated AtomsAbsorption & Emission of Energy in Isolated Atoms
• Atoms can be excited into higher energy states Absorbed energy moves electron/s into
vacant shell/s Absorbed energy corresponds to
difference between shells W = |Wu-Wl| Absorbed energy
• Excited atom can spontaneously de-excite to a lower level Average lifetime of atom in excited
state is nanoseconds Electron/s randomly drop to vacant
level/s Corresponding emission of energy W = |Wu-Wl| Emitted energy
Absorption
W
Wu
Wl
Spontaneous Emission
W
Wu
Wl
September 2005 Prof John Watson
Absorption & Emission of EnergyAbsorption & Emission of Energy
• Absorbed in discrete amounts: a quantum of energy absorbed/emitted in many forms: e.g. heat, light, collisions if absorbed or emitted as light – photon
• Energy emitted (the energy of each photon) is Wph = W = |Wu – Wl|
Wph = h = hc/ Planck's constant h = 6.63x10-36 J s velocity of light c = 300x106 m/s
• An energy diagram shows the range of possible optical transitions
• Spectral emission is in discrete (almost monochromatic) lines Line spectrum
September 2005 Prof John Watson
September 2005 Prof John Watson
Worked Example - 1Worked Example - 1
• Calculate the wavelength of emission when an atom de-excites from an energy state at 12.09 eV to one at 10.2 eV above the ground state.
• Solution The emission energy is
W = Wu - Wl = 12.09 eV - 10.2 eV = 1.89 eV The photon energy is
Wph = W = 1.89 eV The wavelength of emission is thus
= hc/Wph
= 6.63x10-34 J s x 3x108 m/s / (1.89 eV x 1.6x10-19 J/eV) = 657.7x10-9 m = 657.7 nm
September 2005 Prof John Watson
Worked Example - 2Worked Example - 2
• How much energy does a hydrogen atom need to absorb to be raised from its lowest (ground) state to its first excited state? Also, what is the wavelength of the photon emitted when the atom drops back to its ground state?
• Solution: When the atom is in its ground state it possesses -13.6 eV of
energy, in the first excited state it possesses -3.4 eV of energy. The electron is less strongly bound.
The energy required to lift the atom into the higher level is just the difference in energy between the two.
Hence the absorption energy. W = Wu – Wl = 13.6 eV – 3.4 eV = 10.2 eV
September 2005 Prof John Watson
Worked Example – 2: ContdWorked Example – 2: Contd
• The energy emitted as a photon when the electron falls back to ground must also equal the difference between the two levels, Wph = W = 10.2 eV.
• Hence wavelength of the emitted photon is = hc/Wph
663x10-36 J s x 300x106 m s-1 = --------------------------------------- (10.2 eV x 160x10-21 J eV-1) = 121 x 10-9 m = 121 nm
September 2005 Prof John Watson
Atomic GasesAtomic Gases
• Energy structure described earlier describes a single atom
• When vast numbers of atoms collect or combine to form an atomic gas the atoms are so far away from each other The spectral behaviour of the gas is the same as that of a single
atom
• If gas is excited by addition of energy (e.g. thermal, collisions) The atoms will be spread amongst different states of excitation some in ground state, some in excited states
September 2005 Prof John Watson
Distribution of Atoms in Thermal EquilibriumDistribution of Atoms in Thermal Equilibrium
• At a given temperature, atoms distributed amongst all
available levels
• Ground state will always contain the bulk of the atoms other levels will contain
exponentially less
• Maxwell-Boltzmann distribution describes the population of
atoms in a given energy level at a given temp.
N2/N1 = exp(-W/kT)
Energy
Population of atoms
W1
W2
W3
W4
Wexp(- / kT)
September 2005 Prof John Watson
Spectral Line Sources - 1Spectral Line Sources - 1
• The processes we have just described form the basis of light emission from gases which are in thermal equilibrium with their surroundings.
• If a low pressure gas, such as hydrogen, is enclosed in an evacuated glass tube and excited by the passage of an electric current through it, the constituent atoms and molecules continually absorb energy
by collisions with electrons and also with each other. no sooner do the atoms gain energy than they lose it again by a
mixture of spontaneous emission of photons, heat and collisional de-excitation.
• In such a dynamic situation, the energy level populations are governed by the Boltzmann
relationship at the specific temperature of the gas.
September 2005 Prof John Watson
Spectral line sources - 2Spectral line sources - 2
• The light emitted from such a source covers a wide range of wavelengths, the photons have different amplitudes,
are emitted at different times and directions
have no constant phase relationship with each other.
• The emitted spectrum is composed of discrete well-defined wavelengths of varying intensities Such sources of light are known as gas discharge sources and are widely used as
reference sources in spectroscopy.
They are said to be incoherent in time and space.
Typical examples are sodium & mercury vapour street lamps
A TRAIN OF INCOHERENT PHOTONS
September 2005 Prof John Watson
Dense Gases & SolidsDense Gases & Solids
• When atoms are closer together, as in a dense gas like the sun or a solid such as a piece of hot
iron, the energy structures associated with individual atoms influence
one another. • This is the collective behaviour of many interacting atoms of
different species, rather than characteristic behaviour of individual atoms of a
particular element.• The isolated energy levels shift slightly in energy
overlap in relation to each other to accommodate all the available electrons.
Instead of individual, discrete energy levels as for isolated atom, bands of closely spaced energy levels develop. In between these bands are forbidden zones of energy, energy gapsenergy gaps,
which atoms cannot possess.
• The nature of light emission from such materials Depends on the formation and occupation of these bands
September 2005 Prof John Watson
Overlapping Energy levelsOverlapping Energy levels
September 2005 Prof John Watson
Energy Bands in SolidsEnergy Bands in Solids• 3-d array of vast numbers of atoms or ions
linked in crystalline structure Valence electrons are far from nucleus can be detached from the atom if enough
energy supplied free to move through crystal Properties depend on how tightly bound
electrons are in crystal
• As for a gas, at a given temperature, the lowest available energy levels are filled with electrons these are known as the valence bands. above the VB are a range of mainly empty
bands - the conduction bands.
• Occupation of these bands with electrons determines the electrical, thermal and optical properties of the material
September 2005 Prof John Watson
Absorption & Emission from SolidsAbsorption & Emission from Solids• In some materials e.g metals and other hot solids
The VB and CB actually overlap Electrons very loosely bound to host ions very easy to break free from ions free to "wander" around crystal large numbers of free electrons Emission and absorption of light occurs over very broad energy
ranges Spectral emission is in form of broadband continuum Characterised by “black-body” radiation
• Semiconductors Electrons have moderate binding energies Energy gap (between VB and CB) is of order of 1 eV at absolute zero, all electrons are tightly bound at high temps electrons can be excited from VB to CB
By thermal excitation, collisions or irradiation with light relatively easy for electrons to absorb energy - be excited to CB Also easy for electrons to de-excite to VB –emission of photons
September 2005 Prof John Watson
Absorption of Light in a SemiconductorAbsorption of Light in a Semiconductor
• Excitation of electrons in solids takes place between VB and CB
• If the energy is supplied in form of light, the minimum photon energy
required must equal the band gap energy WG
Wph = h ≥ WG
• The corresponding photon wavelength must be less than
G hc / WG
Light of a longer wavelength has insufficient energy to excite the electrons
This represents the long wavelength cut-off
September 2005 Prof John Watson
Emission of Light from SemiconductorsEmission of Light from Semiconductors
• Emission of a photon occurs when an electron in a conduction band relaxes to a valence band releases the corresponding amount of energy.
• Emitted energy Wph = h = hc/ ≥ WG
• Since photons will be emitted from a range of energies in the CB to a range of energies in the VB The photons will cover a widespread of wavelengths from
the cut-off down • Because the energy states within each band are
closely spaced emitted spectrum will resemble a continuum below this cut-off
September 2005 Prof John Watson
Black Body Radiation - 1Black Body Radiation - 1
• The radiation profile emitted from an ideal hot body can be described in terms of an ideal thermal radiator: the black bodythe black body. An ideal radiator is one that emits as much energy as it absorbs.
• The overall spectral distribution is given by the Planck black-body relationship which relates the radiant energy emitted by an ideal radiator to its temperature,
• Spectral Radiant Emittance Me() = (2hc2/5)/{exp(hc/kBT) - 1} [W nm-1 m-2] The above relationships describes the radiant flux emitted per unit
surface area per unit wavelength interval from a the surface of a source into a 2 solid angle.
The equation as it stands applies to unpolarised light, for linearly polarised light we should divide by 2.
• Spectral Radiation Density () = (82n3/c3)h/[exp(h/kBT)-1] [J Hz-1 m-3]
September 2005 Prof John Watson
Spectral-emittance of a BBSpectral-emittance of a BB
• Some important points:
• Total radiant emittance at a given T equals area under the curve
• Emitted flux increases as the temperature of the body increases, that is, as the body gets hotter it
emits more energy, and,
• Peak of the curve shifts to lower wavelengths, (higher frequencies) as the T increases. e.g. as a piece of steel is heated
up its colour changes from dull red through orange to white-hot
• A family of spectral radiant emittance curves for a BB as a function of emitted wavelength and temperature.
September 2005 Prof John Watson
Radiant EmittanceRadiant Emittance
• The total flux emitted from the source is obtained by integrating Me() over all wavelengths up to max
Me = eT4 is the Stefan constant = 56.7 nW m-2 K-4] e is a factor, called the emissivity of the surface, varies between zero for no radiant emission and unity for a
black body.
• This is the maximum radiant power which can be emitted from any source at a given temperature The radiant emittance from a line source at the same
temperature can never be greater than the ideal BB radiant emission.
September 2005 Prof John Watson
Black Body Radiation - 3Black Body Radiation - 3
•Finally, for each constant temperature curve, known as an isotherm,
• the peak wavelength is obtained by differentiating with respect to and equating to zero. • pkT = hc/4.97kB
•In developing the black-body relationship, • Planck had to assume that the energy distribution within the source, was not a continuous function of frequency as assumed up until then
• but existed in discrete quanta of energy known as photons. •On this basis, the energy is distributed amongst permitted modes of oscillation within the source volume.
•The existence of these modes is analogous to the permitted modes of vibration on a stretched string or the modes of oscillation within an optical cavity
September 2005 Prof John Watson
Black-body Radiation - 4Black-body Radiation - 4
• Exercise Estimate the radiant emittance of a black body at a temperature of
300 K. [460 W m-2]
• Exercise By making sensible assumptions about the surface area of a
human body and its radiant temperature, calculate the total flux emitted.
[ 500 - 1000 W]
• Exercise If you wanted to take thermal pictures of the human body in the
previous example, at what wavelength should the thermal camera have its peak sensitivity?
[10 µm]
September 2005 Prof John Watson
Thermal Sources - SummaryThermal Sources - Summary
• In summary, thermal light sources produce optical radiation as a result of a dynamic process of excitation and spontaneous de-excitation of valence electrons. Because excitation occurs to a number of different energy
levels the radiation is composed of a wide range of wavelengths, emitted at random times and in random directions:
the light is said to be incoherent.
• This behaviour is in stark contrast to that pertaining to a laser the light emitted is almost monochromatic, in phase and
unidirectional: this light is said to be coherent.