Thermodynamic formalism of interval maps for upper semi-continuous potentials: Makarov-Smirnov's formalism

Abstract

In this paper, we study the thermodynamic formalism of interval maps f with sufficient regularity, for a sub class U composed of upper semi-continuous potentials which includes both H\"older and geometric potentials. We show that for a given u∈ U and negative values of t, the pressure function P(f,-tu) can be calculated in terms of the corresponding hidden pressure function P(f,-tu). Determination of the values t∈(-∞,0) at which P(f,-tu)≠ P(f,-tu) is also characterized explicitly. When restricting to the H\"older continuous potentials, our result recovers Theorem B in [Li \& Rivera-Letelier 2013] for maps with non-flat critical points. While restricting to the geometric potentials, we develop a real version of Makarnov-Smirnov's formalism, in parallel to the complex version shown in [Makarnov \& Smirnov 2000, Theo A,B]. Moreover, our results also provide a new and simpler proof (using [Ruelle 1992, Coro6.3]) of the original Makarnov-Smirnov's formalism in the complex setting, under an additional assumption about non-exceptionality, i.e., [Makarnov \& Smirnov 2000, Theo 3.1].