# RJMCMC ## Bayesian Model Choice ![](/files/-Lim_WA4hIjTk3YVEOoR) ![](/files/-Lim_WA6AijfATs8oYGU) ![](/files/-Lim_WA8UIatKto9ApE9) ## Green's algorithm ![](/files/-Lim_WAAiXdCluMv8vgt) ![](/files/-Lim_WACHMhz0esMXxki) ## Fixed Dimension Reassessment ![](/files/-Lim_WAEtxxDjPhynJ_V) ## RJMCMC for change points The log-likelihood function is $$ \begin{aligned} p(y\mid x) &= \sum\_{i=1}^n\log{x(y\_i)}-\int\_0^Lx(t)dt\\ &= \sum\_{j=1}^km\_j\log h\_j-\sum\_{j=0}^kh\_j(s\_{j+1}-s\_j) \end{aligned} $$ where $$m\_j=#{y\_i\in\[s\_j,s\_{j+1})}$$. ### H Move 1. choose one of $$h\_0,h\_1,\ldots,h\_k$$ at random, obtaining $$h\_j$$ 2. propose a change to $$h\_j'$$ such that $$\log(h\_j'/h\_j)\sim U\[-\frac 12, \frac 12]$$. 3. the acceptance probability is $$ \begin{aligned} \alpha(h\_j, h\_j') &=\frac{p(h\_j'\mid y)}{p(h\_j\mid y)}\times \frac{J(h\_j\mid h\_j')}{J(h\_j'\mid h\_j)}\\ &= \frac{p(y\mid h\_j')}{p(y\mid h\_j)}\times\frac{\pi(h\_j')}{\pi(h\_j)}\times\frac{J(h\_j\mid h\_j')}{J(h\_j'\mid h\_j)},. \end{aligned} $$ Note that $$ \log\frac{h\_j'}{h\_j}= u ,, $$ it follows that the CDF of $$h\_j'$$ is $$ F(x) = P(h\_j'\le x) = P(e^uh\le x) = P(u\le \log(x/h)) = \log(x/h) + 1/2 $$ and $$ f(x) = F'(x) = \frac{1}{x},, $$ so $$ J(h\_j'\mid h\_j) = \frac{1}{h\_j'},. $$ Then we have $$ \begin{aligned} \alpha(h\_j,h\_j') &= \frac{p(y\mid h\_j')}{p(y\mid h\_j)}\times \frac{(h\_j')^{\alpha}\exp(-\beta h\_j')}{h\_j^\alpha\exp(-\beta h\_j)}\\ &=\text{likelihood ratio}\times (h\_j'/h\_j)^\alpha\exp{-\beta(h\_j'-h\_j)} \end{aligned} $$ ### P Move 1. Draw one of $$s\_1,s\_2,\ldots,s\_k$$ at random, obtaining say $$s\_j$$. 2. Propose $$s\_j'\sim U\[s\_{j-1}, s\_{j+1}]$$ 3. The acceptance probability is $$ \begin{aligned} \alpha(s\_j,s\_j') &=\frac{p(y\mid s\_j')}{p(y\mid s\_j)}\times \frac{\pi(s\_j')}{\pi(s\_j)}\times \frac{J(s\_j\mid s\_j')}{J(s\_j'\mid s\_j)}\\ &=\text{likelihood ratio}\times \frac{(s\_{j+1}-s\_j')(s\_j'-s\_{j-1})}{(s\_{j+1}-s\_j)(s\_j-s\_{j-1})} \end{aligned} $$ since $$ \pi(s\_1,s\_2,\ldots,s\_k)=\frac{(2k+1)!}{L^{2k+1}}\prod\_{j=0}^{k+1}(s\_{j+1}-s\_j) $$ ### Birth Move Choose a position $$s^\*$$ uniformly distributed on $$\[0,L]$$, which must lie within an existing interval $$(s\_j,s\_{j+1})$$ w\.p 1. Propose new heights $$h\_j', h\_{j+1}'$$ for the step function on the subintervals $$(s\_j,s^*)$$ and $$(s^*,s\_{j+1})$$. Use a weighted geometric mean for this compromise, $$ (s^*-s\_j)\log(h\_j') + (s\_{j+1}-s^*)\log(h\_{j+1}')=(s\_{j+1}-s\_j)\log(h\_j) $$ and define the perturbation to be such that $$ \frac{h\_{j+1}'}{h\_j'}=\frac{1-u}{u} $$ with $$u$$ drawn uniformly from $$\[0,1]$$. The prior ratio, becomes $$ \frac{p(k+1)}{p(k)}\frac{2(k+1)(2k+3)}{L^2}\frac{(s^*-s\_j)*(s\_{j+1}-s^\*)}{s\_{j+1}-s\_j}\times \frac{\beta^\alpha}{\Gamma(\alpha)}\Big(\frac{h\_j'h\_{j+1}'}{h\_j}\Big)^{\alpha-1}\exp{-\beta(h\_j'+h\_{j+1}'-h)} $$ the proposal ration becomes $$ \frac{d\_{k+1}L}{b\_k(k+1)} $$ and the Jacobian is $$ \frac{(h\_j'+h\_{j+1}')^2}{h\_j} $$ ### Death Move If $$s\_{j+1}$$ is removed, the new height over the interval $$(s\_j',s\_{j+1}')=(s\_j,s\_{j+2})$$ is $$h\_j'$$, the weighted geometric mean satisfying $$ (s\_{j+1}-s\_j)\log(h\_j) + (s\_{j+2}-s\_{j+1})\log(h\_{j+1}) = (s\_{j+1}'-s\_j')\log(h\_j') $$ The acceptance probability for the corresponding death step has the same form with the appropriate change of labelling of the variables, and the ratio terms inverted. ## Results The histogram of number of change points is ![](/files/-LW1wFon-Nmly_3eMqaK) And we can get the density plot of position (or height) conditional on the number of change points $$k$$, for example, the following plot is for the position when $$k=1,2,3$$ ![](/files/-LW1wFotVURcxiBLO7Ry) ## References 1. [Green, P. J. (1995). Reversible jump Markov chain Monte Carlo computation and Bayesian model determination. Biometrika, 82(4), 711–732.](https://doi.org/10.1093/biomet/82.4.711) 2. [Sisson, S. A. (2005). Transdimensional Markov Chains: A Decade of Progress and Future Perspectives. Journal of the American Statistical Association, 100(471), 1077–1089.](https://doi.org/10.1198/016214505000000664) 3. [Peter Green's Fortran program AutoRJ](https://people.maths.bris.ac.uk/~mapjg/AutoRJ/) 4. [David Hastie's C program AutoMix](http://www.davidhastie.me.uk/software/automix/) 5. [Ai Jialin, Reversible Jump Markov Chain Monte Carlo Methods. MSc thesis, University of Leeds, Department of Statistics, 2011/12.](http://www1.maths.leeds.ac.uk/~voss/projects/2011-RJMCMC/) --- # Agent Instructions: Querying This Documentation If you need additional information that is not directly available in this page, you can query the documentation dynamically by asking a question. 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