Equivalent Markov processes under gauge group

We have studied Markov processes on denumerable state space and continuous time. We found that all these processes are connected via gauge transformations. We have used this result before as a method for resolution of equations, included the case where the sample space is time dependent in a previou...

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Bibliographic Details
Published inarXiv.org
Main Authors Caruso, M, Jarne, C
Format Paper Journal Article
LanguageEnglish
Published Ithaca Cornell University Library, arXiv.org 28.12.2016
Subjects
Conditional probability
Markov analysis
Markov processes
Physics - Statistical Mechanics
Time dependence
Transformations
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Summary:We have studied Markov processes on denumerable state space and continuous time. We found that all these processes are connected via gauge transformations. We have used this result before as a method for resolution of equations, included the case where the sample space is time dependent in a previous work \textit{Phys. Rev. E} \textbf{90}, 022125 (2014). We found a general solution through a dilation of the state space, although the prior probability distribution of the states defined in this new space takes smaller values with respect to the one in the initial problem. The gauge (local) group of dilations modifies the distribution on the dilated space to restore the original process. In this work we show how Markov process in general could be linked via gauge (local) transformations and we present some illustrative examples for this results.
ISSN:2331-8422
DOI:10.48550/arxiv.1701.00703