Maximising measure

Known as: Maximizing measure

In mathematics — specifically, in ergodic theory — a maximising measure is a particular kind of probability measure. Informally, a probability…

Papers overview

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2014

Let $M$ be a compact $n$-dimensional Riemanian manifold, End($M$) the set of the endomorphisms of $M$ with the usual $\mathcal{C…

2013

On a one-sided shift of finite type we prove that for a generic Holder continuous function there is a unique maximizing measure…

2011

We consider $(M,d)$ a connected and compact manifold and we denote by $X$ the Bernoulli space $M^{\mathbb{N}}$. The shift acting…

2011

Abstract In this article we analyze two issues related with large deviations in dynamical systems: 1. We show that the level-2…

2010

We follow the works of William Parry and Mark Pollicott considering expressions of dinamical zeta functions and construct…

2010

If T is a concave unimodal map on the unit interval [0,1] and {x: T n (x) = 1 for some n} is dense in [0,1], we prove that all T…

2009

This paper is concerned with the application of recent results in optimization of stochastic uncertain systems on general…

2009

This paper is concerned with optimization of stochastic uncertain systems, when systems are described by measures and the pay-off…

2007

This paper considers optimization of stochastic uncertain systems on general abstract spaces, when the uncertainty of the system…

2006

Given a circle endowed with a doubling map, we consider the problem of maximizing measures for Lipschitz functions. We provide a…