Peierls barrier for countable Markov shifts
classification
🧮 math.DS
keywords
barrierboundedcalibratedcontextcountableexistencemarkovpeierls
read the original abstract
We prove the existence of calibrated uniformly continuous subactions for coercive potentials with bounded variation defined on topologically transitive Markov shifts with countable alphabet through the construction of the Peierls barrier in this context. Also, we characterize the existence of bounded calibrated subactions in the same context.
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