Simulated Tempering Mixes Slowly on the Meanfield Potts Model - PowerPoint PPT Presentation
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Simulated Tempering Mixes Slowly on the Meanfield Potts Model
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Examples when Tempering fails. Speeding up Tempering. Ising and Potts Model. G = Kn = ([n],E) ... Tempering fails when phase transition is discontinuous ... – PowerPoint PPT presentation
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Title: Simulated Tempering Mixes Slowly on the Meanfield Potts Model
1
Simulated Tempering Mixes Slowly on the
Mean-field Potts Model
- Nayantara Bhatnagar
- Dana Randall
- College of Computing
- Georgia Tech
2
Outline of Talk
- Ising and Potts models and sampling
- Glauber (local) dynamics Markov Chain
- Simulated Tempering
- Examples when Tempering fails
- Speeding up Tempering
3
Ising and Potts Model
Ising Model (2 colorings)
G Kn (n,E)
ß
3-state Potts Model (3 colorings)
G Kn (n,E)
Goal
Rapidly mixing MC to sample
from p at large ß.
4
Glauber (local) Dynamics MC
s1 s2 if d(s1, s2) ? 1
(i.e. color differs at most
at 1 vx)
sR
do nothing
sB
sR
Theorem CDFR, BCFKTVV Glauber dynamics for
the Ising and Potts on Kn mixes slowly for large
ß.
5
Glauber Dynamics Mixes Slowly
(large ß)
Conductance
Jerrum-Sinclair 88
S
Sc
F min FS S p(S) ? ½
Conductance
Let .
Theorem
? Mixing time ?
6
Tempering Marinari-Parisi 92
Define inverse temperatures 0 b0 lt b1 lt ... lt
bM and distributions p0, p1, ... ,pM on O.
p(bM)
Theorem Madras,Zheng 99 Tempering mixes
rapidly at all temperatures for the Ising model
on Kn.
p(b0)
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Tempering for Potts Model?
Theorem BR There exists b bcrit such that
tempering for Potts model on Kn at b mixes slowly.
Proof idea Bound conductance on O O M1.
ly
lx
O U O(r,s,t)
( , , )
r s tn
(0,0,n)
lx
Sufficient to bound conductance on ly M1.
8
Proof
?
?
FS
Ftemp
bM bcrit
S
Fglauber
pb crit( )
?
pb crit( )
O(e-cn)
b0
- Theorem BR There exists ß gt ßcrit at which
Tempering slows Glauber MC by exponential factor.
- NO temperature based interpolants will help.
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Speeding Up Tempering?
- Modify more than just temperature
- Define pM p0 so cut is not preserved.
eb(EREBEG)
eb(EREBEG)
?i(s)
pi (s)
f i (s)
Z
Z
eb(EREBEG)
? i (O(r,s,t))
Z
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Speeding up Tempering
eb(EREBEG)
?i (O(r,s,t))
Z
Thm 2 BR Tempering with ?i mixes rapidly for
the Potts model.
- Proof
- Decomposition Theorem
- Comparison Theorem
- Proof techniques generalize MZ to certain
asymmetric distributions for usual tempering.
11
Conclusions
- Tempering fails when phase transition is
discontinuous - Tempering with other interpolants could be
better. - Defining fi (s) in general ?
- other models (independent sets)
- other underlying graphs (Cartesian lattice)
