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The Markov property Discrete time: A time symmetric version: A more general version: Let A be a set of indices >k, B a set of indices <k. Then These are.

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Presentation on theme: "The Markov property Discrete time: A time symmetric version: A more general version: Let A be a set of indices >k, B a set of indices <k. Then These are."— Presentation transcript:

1 The Markov property Discrete time: A time symmetric version: A more general version: Let A be a set of indices >k, B a set of indices <k. Then These are all equivalent.

2 On a spatial grid Let  i be the neighbors of the location i. The Markov assumption is The p i are called local characteristics. They are homogeneous if p i = p. A potential assigns a number V A (z) to every subconfiguration z A of a configuration z.

3 Gibbs measure The energy U corresponding to a potential V is. The corresponding Gibbs measure is where is called the partition function.

4 Nearest neighbor potentials A set of points is a clique if all its members are neighbours. A potential is a nearest neighbor potential if V A (z)=0 whenever A is not a clique.

5 Markov random field Any nearest neighbour potential induces a Markov random field: where z’ agrees with z except possibly at i, so V C (z)=V C (z’) for any C not including i.

6 The Hammersley-Clifford theorem Assume P(z)>0 for all z. Then P is a MRF on a (finite) graph with respect to a neighbourhood system  iff P is a Gibbs measure corresponding to a nearest neighbour potential. Does a given nn potential correspond to a unique P?

7 The Ising model Model for ferromagnetic spin (values +1 or -1). Stationary nn pair potential V(i,j)=V(j,i); V(i,i)=V(0,0)=v 0 ; V(0,e N )=V(0,e E )=v 1. so where

8 Interpretation v 0 is related to the external magnetic field (if it is strong the field will tend to have the same sign as the external field) v 1 corresponds to inverse temperature (in Kelvins), so will be large for low temperatures.

9 Phase transition At very low temperature there is a tendency for spontaneous magnetization. For the Ising model, the boundary conditions can affect the distribution of x 0. In fact, there is a critical temperature (or value of v 1 ) such that for temperatures below this the boundary conditions are felt. Thus there can be different probabilities at the origin depending on the values on an arbitrary distant boundary!

10 Simulated Ising fields

11 Tomato disease Data on spotted wilt from the Waite Institute 1929. 16 plots in 4x4 Latin square, each 6 rows with 15 plants each. Occurrence of the viral disease 23 days after planting.

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