U. Ibrahim, A. Lotsi, K. Doku-Amponsah
Published 2017-11-14Version 1
For a $d-$regular random model, we assign to vertices $q-$state spins. From this model, we define the \emph{empirical co-operate measure}, which enumerates the number of co-operation between a given couple of spins, and \emph{ empirical spin measure}, which enumerates the number of sites having a given spin on the $d-$regular random graph model. For these empirical measures we obtain large deviation principle(LDP) in the weak topology.
Joint large deviation result for empirical measures of the near intermediate coloured random geometric graphs
Moderate deviations for empirical measures for nonhomogeneous Markov chains
Some large deviation results for near intermediate random geometric graphs
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