Download
1 / 66
660 likes | 788 Views
Lecture 4. 2006. Random walk - > each hop is independent of the previous hop. Random walk - > each hop is independent of the previous hop No ‘memory effect’. Random walk - > each hop is independent of the previous hop No ‘memory effect’. Squared displacement.
E N D
Lecture 4 2006
Random walk - > each hop is independent of the previous hop No ‘memory effect’
Random walk - > each hop is independent of the previous hop No ‘memory effect’ Squared displacement
Random walk - > each hop is independent of the previous hop No ‘memory effect’ Squared displacement Diagonal and off-diagonal terms
Random walk - > each hop is independent of the previous hop No ‘memory effect’ Squared displacement Diagonal and off-diagonal terms If motion is not random then the off-diagonal terms no longer sum to zero for a large number of hops.
Random walk - > each hop is independent of the previous hop No ‘memory effect’ Squared displacement Diagonal and off-diagonal terms If motion is not random then the off-diagonal terms no longer sum to zero for a large number of hops. They are correlated by a factor, f
Random walk - > each hop is independent of the previous hop No ‘memory effect’ Squared displacement Diagonal and off-diagonal terms If motion is not random then the off-diagonal terms no longer sum to zero for a large number of hops. They are correlated by a factor, f
Tracer diffusion is correlated (non-random) - why? Origin of the problem is distinguishable and indistinguishable particles
Tracer diffusion is correlated (non-random) - why? Origin of the problem is distinguishable and indistinguishable particles tracer atom has a higher probability of hopping back into a site it has just left because it is distinguishable.
Tracer diffusion is correlated (non-random) - why? Origin of the problem is distinguishable and indistinguishable particles tracer atom has a higher probability of hopping back into a site it has just left because it is distinguishable. We call this a ‘correlation’ or a ‘memory effect’
Tracer diffusion is correlated (non-random) - why? Origin of the problem is distinguishable and indistinguishable particles tracer atom has a higher probability of hopping back into a site it has just left because it is distinguishable. We call this a ‘correlation’ or a ‘memory effect’ Random walk of a tracer will be less than that of a self–diffusing atom by a factor, f.
f = 1 - 2/z Total displacement for n jumps (recall, d√n) for a tracer is less than for a true random walk because jumps are wasted back and forth on a site.
f = 1 - 2/z Total displacement for n jumps (recall, d√n) for a tracer is less than for a true random walk because jumps are wasted back and forth on a site. These hops do not contribute to the total displacement.
f = 1 - 2/z Total displacement for n jumps (recall, d√n) for a tracer is less than for a true random walk because jumps are wasted back and forth on a site. These hops do not contribute to the total displacement. Self–diffusion constant, Ds= DT / f
f = 1 - 2/z Total displacement for n jumps (recall, d√n) for a tracer is less than for a true random walk because jumps are wasted back and forth on a site. These hops do not contribute to the total displacement. Self–diffusion constant, Ds= DT / f Tracer diffusion
Diffusion in the Presence of a Potential Gradient Diffusion will occur when a potential gradient exists which biases atomic mobility in a particular direction. Force due to a potential (V) gradient
Diffusion in the Presence of a Potential Gradient Diffusion will occur when a potential gradient exists which biases atomic mobility in a particular direction. Force due to a potential (V) gradient F
Diffusion in the Presence of a Potential Gradient Diffusion will occur when a potential gradient exists which biases atomic mobility in a particular direction. Force due to a potential (V) gradient F Average particle velocity
Diffusion in the Presence of a Potential Gradient Diffusion will occur when a potential gradient exists which biases atomic mobility in a particular direction. Force due to a potential (V) gradient Diffusivity F where u is a particle mobility, Average particle velocity
Diffusion in the Presence of a Potential Gradient Diffusion will occur when a potential gradient exists which biases atomic mobility in a particular direction. Force due to a potential (V) gradient Diffusivity F where u is a particle mobility, Average particle velocity Boltzmann’s constant temperature
Diffusion in the Presence of a Potential Gradient Diffusion will occur when a potential gradient exists which biases atomic mobility in a particular direction. Force due to a potential (V) gradient Diffusivity F where u is a particle mobility, Average particle velocity Boltzmann’s constant temperature So
Diffusion in the Presence of a Potential Gradient Diffusion will occur when a potential gradient exists which biases atomic mobility in a particular direction. Force due to a potential (V) gradient Diffusivity F where u is a particle mobility, Average particle velocity Boltzmann’s constant temperature Why does force, F result in ‘velocity’ and not acceleration? So
Diffusion in the Presence of a Potential Gradient Diffusion will occur when a potential gradient exists which biases atomic mobility in a particular direction. Force due to a potential (V) gradient Diffusivity F where u is a particle mobility, Average particle velocity Boltzmann’s constant temperature Why does force, F result in ‘velocity’ and not acceleration? So Mobility is related to hopping from site to site. F causes bias in direction of hopping only.
Diffusion in the Presence of a Potential Gradient Diffusion will occur when a potential gradient exists which biases atomic mobility in a particular direction. Force due to a potential (V) gradient Diffusivity F where u is a particle mobility, Average particle velocity Boltzmann’s constant temperature Why does force, F result in ‘velocity’ and not acceleration? So Mobility is related to hopping from site to site. F causes bias in direction of hopping only.
Field x charge For diffusion of charged particles in an electric field <V> = velocity down potential (dv/dx)
Field x charge For diffusion of charged particles in an electric field <V> = velocity down potential (dv/dx)
Field x charge For diffusion of charged particles in an electric field <V> = velocity down potential (dv/dx) Flux units: m2s-1
Field x charge For diffusion of charged particles in an electric field <V> = velocity down potential (dv/dx) Flux units: m2s-1 Compare with Ohm’s law (i = sE)
Field x charge For diffusion of charged particles in an electric field <V> = velocity down potential (dv/dx) Flux units: m2s-1 Compare with Ohm’s law (i = sE)
Field x charge For diffusion of charged particles in an electric field <V> = velocity down potential (dv/dx) Flux units: m2s-1 Compare with Ohm’s law (i = sE) Nernst-Einstein equation:
Field x charge For diffusion of charged particles in an electric field <V> = velocity down potential (dv/dx) Flux units: m2s-1 Compare with Ohm’s law (i = sE) Nernst-Einstein equation: relates conductivity to intrinsic mobility of charged ion (Ds)
Combination of flux due to potential gradient and concentration gradient is now Fick’s 1st law Substituting for J in Fick’s 2nd law
Solution for a thin finite source + - Potential gradient
Solution for a thin finite source <v>t + - Potential gradient
Solution for a thin finite source <v>t 2 x √2Dt + - Potential gradient
Solution for a thin finite source <v>t 2 x √2Dt + - Potential gradient Displacement <v>t is governed by the electric field
Solution for a thin finite source <v>t 2 x √2Dt + - Potential gradient Displacement <v>t is governed by the electric field Dispersion or width is determined by the self-diffusion
Comparing conductivity to tracer diffusion Correlation factor
