📝 SummarXiv

Abstract

In this article we discuss pointwise spectral rigidity results for several billiard systems (e.g., Birkhoff billiards, symplectic billiards and $4$-th billiards), showing that a single value of Mather's $\beta$-function can determine whether a strongly convex smooth planar domain is a disk (or an ellipse, in the affine-invariant case of symplectic billiards). Evoking the famous question "Can you hear the shape of a billiard?", one could say that circular billiards can be heard by a single whisper! More specifically, we prove isoperimetric-type inequalities comparing the $\beta$-function associated to the billiard map of domain to that of a disk with the same perimeter or area, and investigate what are the consequences of having an equality. Surprisingly, this rigidity fails for outer billiards, where explicit counterexamples are constructed for rotation numbers $1/3$ and $1/4$. The results are framed within Aubry-Mather theory and provide a modern dynamical reinterpretation and extension of classical geometric inequalities for extremal polygons.