Area spectral rigidity for axially symmetric and Radon domains

Abstract: We prove that $(a)$ any finitely smooth axially symmetric strictly convex domain, with everywhere positive curvature and sufficiently close to an ellipse, and $(b)$ any finitely smooth centrally symmetric strictly convex domain, even-rationally integrable, with everywhere positive curvature and sufficiently close to an ellipse is area spectrally rigid. This means that any area-isospectral family of domains in these classes is necessarily equi-affine. We use the same technique -- adapted to symplectic billiards -- of the paper by De Simoi, Kaloshin, and Wei (2017). The novelty is that the result holds for axially symmetric domains, as in the cited paper, as well as for a subset of centrally symmetric ones.