The Weyl tube theorem for K\"ahler manifolds

Abstract

As sharpened in terms of Alesker's theory of valuations on manifolds, a classic theorem of Weyl asserts that the coefficients of the tube polynomial of an isometrically embedded riemannian manifold M Rn constitute a canonical finite dimensional subalgebra L K(M) of the algebra V (M) of all smooth valuations on M, isomorphic to the algebra of valuations on Euclidean space that are invariant under rigid motions. We construct an analogous, larger, canonical subalgebra KLK(M)⊂ V(M) for K\"ahler manifolds M: i) if M = n , then KLK(M) ValU(n), the algebra of valuations on Cn invariant under the holomorphic isometry group, and ii) if M M is a K\"ahler embedding, then the restriction map V( M) V(M) induces a surjection KLK( M) KLK(M). This answers a question posed by Alesker in 2010 and gives a structural explanation for some previously known, but mysterious phenomena in hermitian integral geometry.