Linear response asymmetry between SRB and physical measures for families of intermittent maps with a transition point

TL;DR

This paper investigates how the physical measures of intermittent maps change at a critical transition point, revealing an asymmetry where measures are continuous but not differentiable, with explicit formulas and novel methods involving the Riemann zeta function.

Contribution

It introduces a new method linking physical measure dependence to the Riemann zeta function, providing explicit formulas for one-sided derivatives at the transition.

Findings

Physical measures are continuous but not differentiable at the transition point.

Derived explicit one-sided derivative formulas for the physical measures.

Established a connection between measure behavior and the Riemann zeta function near its pole.

Abstract

We study linear response for families of intermittent maps whose SRB measure undergoes a transition from finite to infinite total mass at a critical parameter value. Our results reveal the following fundamental asymmetry arising from this transition. Smooth parameter dependence of the SRB measure implies continuity of the physical measure at the transition point, while simultaneously precluding its differentiability there. In particular, although the physical measure varies continuously with respect to the parameter at the transition, it fails to admit a linear response for a large class of potentials in the usual sense. We derive an explicit one-sided derivative formula describing this singular behavior and thereby give a quantitative characterization of how statistical properties degenerate as the total mass of the SRB measure diverges. The key ingredient in the proof of our main theorem is a new method that relates the parameter dependence of physical measures near the transition point to the behavior of the Riemann zeta function near its pole at 1.