English

Convex bodies with algebraic section volume functions

Metric Geometry 2024-10-01 v1 Classical Analysis and ODEs Functional Analysis

Abstract

The section volume function AK(ξ,t), ξRn, tR,A_K(\xi,t), \ \xi \in \mathbb R^n, \ t \in \mathbb R, of a body KRnK \subset \mathbb R^n evaluates the (n1)(n-1)-dimensional volume of the cross-section KK by the hyperplane {xξ=t}.\{ x \cdot \xi=t \}. We are concerned with the question: can the shape of a body KK be detected from an algebraic type of its section function? We prove that among strictly convex bodies KK with CC^{\infty} boundaries, ellipsoids are completely described by the algebraic equation qAKm+p=0,qA_K^m+p=0, where mNm \in \mathbb N and q=q(ξ), p=p(ξ,t)q=q(\xi), \ p=p(\xi,t) are polynomials. The result is motivated by Arnold's problem on algebraically integrable domains (which, in turn, has its roots in Newton's Lemma about ovals) and generalizes known results on polynomially integrable domains.

Keywords

Cite

@article{arxiv.2409.19373,
  title  = {Convex bodies with algebraic section volume functions},
  author = {Mark Agranovsky},
  journal= {arXiv preprint arXiv:2409.19373},
  year   = {2024}
}
R2 v1 2026-06-28T19:00:34.492Z