Fixed and periodic points of the intersection body operators of lower orders
Abstract
The intersection body of order $i$ for $i=1,2,\ldots,n-2$, $I_iK$, of a star body $K$ in $\mathbb{R}^n$ introduced by G. Zhang, plays a central role in the dual Brunn-Minkowski theory. We show that when $n \geq 3$, $I_i^2K = cK$ iff $K$ is an origin-symmetric ball, and hence $I_iK = cK$ iff $K$ is an origin-symmetric ball. Combining the breakthrough (case $i = n-1$) of Milman, Shabelman and Yehudayoff (Invent. Math., 241 (2025), 509-558), two long-standing questions 8.6 and 8.7 posed by R. Gardner (Page 302, Geometric Tomography, Cambridge University Press, 1995) are completely resolved. An equivalent formulation of the latter in terms of non-linear harmonic analysis states that a non-negative $\rho\in L^{\infty}(\mathbb{S}^{n-1})$ satisfies $\mathcal{R}(\rho^i) = c\rho$ for some $c > 0$ iff $\rho$ is constant, where $\mathcal{R}$ is the spherical Radon transform. As applications, the generalized Busemann intersection inequalities are established.