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4. The Grand Canonical Ensemble. Equilibrium between a System & a Particle-Energy Reservoir A System in the Grand Canonical Ensemble Physical Significance of Various Statistical Quantities Examples
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4. The Grand Canonical Ensemble Equilibrium between a System & a Particle-Energy Reservoir A System in the Grand Canonical Ensemble Physical Significance of Various Statistical Quantities Examples Density & Energy Fluctuations in the Grand Canonical Ensemble: Correspondence with Other Ensembles Thermodynamic Phase Diagrams Phase Equilibrium & the Clausius-Clapeyron Equation
4.1. Equilibrium between a System & a Particle-Energy Reservoir System A immersed in particle-energy reservoir A. A in microstate with Nr & Es with Using
A, A in eqm
4.2. A System in the Grand Canonical Ensemble Consider ensemble of N identical systems sharing particles & energy Let nr,s= # of systems with Nr & Es , then Let W {nr,s } = # of ways to realize a given set of distribution { nr,s} . Method of Most Probable Values : Let {nr,s* } = most probable set of distribution, i.e.,
Method of Mean Values : (X) means sum includes only terms that satisfy constraint on X. Saddle point method For a given the parameters & are determined from Classical mech (Gibb –corrected ):
4.3. Physical Significance of Various Statistical Quantities The q-potential is defined as dEs caused by dV.
Euler’s eq.
Fugacity Variable dependence : Grand partition function Note: Zis much easier to evaluate than Z, especially for quantum statistics and/or interacting systems.
Grand Potential Approach Let F be the thermodynamic potential related to Z. Grand potential Particle, heat reservoir Suggestion from canonical ensemble :
Grand Potential See Reichl, §2.F.5. Grand potential : Caution : Prob 4.2
Using we have
4.4. Examples Classical Ideal Gas : N ! = Correction for Indistinguishableness Freely moving particles
n = 3/2 : nonrelativistic gas. n = 3: relativistic gas. Find A & S as functions of (T,V,N) yourself.
Non-Interacting, Localized Particles Non-Interacting, Localized Particles (distinguishable particles : model for solid ) : Particles localized for or
Quantum 1-D oscillators: See §3.8 Classical limit : Consider a substance in vapor-solid phase equilibrium inside a closed vessel . i.e., Phase equilibrium
For ideal gas vapor : If For a monatomic gas : From §3.5 Einstein model : solid ~ 3-D oscillators of same
( e / kT added by hand to account for the difference between binding energies of the solid & gas phases. ) At phase equilibrium: Pure vapor : Tc = characteristic T Solid phase appears : or Since f / e / kT increases with T, this means Mathematica
4.5. Density & Energy Fluctuations in the Grand Canonical Ensemble: Correspondence with Other Ensembles with see §3.6 In general
Particle density : Particle volume : 1st law : Euler’ s equation : T= isothermal compressibility
Relative root mean square of n ~ 0 in the thermodynamic limit for finite T , = critical exponents d = dimension of system At phase transition : Experiment on liquid-vapor transition : root mean square of n critical opalescence Grand canonical canonical ensemble
Energy Fluctuations Caution : N = N( P,T )
§3.6:
4.6. Thermodynamic Phase Diagrams Phase diagram: Thermodynamic functions are analytic within a single phase, non-analytic on phase boundaries. Ar Tt = 83.8 K Pt = 68.9 kPa TC = 150.7 K PC = 4.86 MPa supercritical fluid Co-existence lines : S-L L-V S-V Liquid Solid Vapor A = Triple point C = Critical point
Ar Triple point Tt = 83.8 K Pt = 68.9 kPa Critical point TC = 150.7 K PC = 4.86 MPa supercritical fluid Co-existence lines : S-L L-V S-V
supercritical fluid Liquid Solid Vapor supercritical fluid Co-existence lines : S-L L-V S-V
4He (BE stat) : Critical point TC = 5.19 K PC = 227 kPa T = 2.18 K PS = 2.5MPa 4He 3He (FD stat) : Critical point TC = 3.35 K PC = 227 kPa PS = 30MPa Superfluid characteristics (BEC) : Viscosity = 0. Quantized flow. Propagating heat modes. Macroscopic quantum coherence. Superfluid below 10 mK due to BCS p-wave pairing.
4.7. Phase Equilibrium & the Clausius-Clapeyron Equation Gibbs free energy = ( P,T ) = chemical potential Consider vessel containing Nmolecules at constant T & P. Let there be 2 phases initially: vapor (A) & liquid (B). For a given T & P : See Reichl §2.F At equilibrium, G is a minimum for spontaneous changes
T, P fixed for spontaneous changes At coexistence so that NAcan assume any value between 0 & N. Actual NA assumed is determined by U ( via latent heat of vaporization ). Coexistence curve in P-T plane is given by where
Clausius-Clapeyron eq. ( for 1st order transitions ) Latent heat per particle. Prob. 4.11, 4.14-6. At triple point are related Slopes since Prob. 4.17.
