Legendrian cycles and Reilly-type variational formulae for FnW2,n-sets

Abstract

We construct a natural Legendrian cycle NS associated with any FnW2,n-set S, that is, a closed set locally described as a finite union of graphs of (C0 W2,n)-regular functions with integer multiplicity. The construction relies on the fact that S is countably Hn-rectifiable of class C2 and, at Hn-almost every point p∈S, the proximal unit normal bundle at p, denoted by nor(S,p), consists of exactly two antipodal vectors \u,-u\, even in the presence of overlapping W2,n-graphs. As a consequence, we prove Reilly-type variational formulae for the higher-order mean curvature integrals of S, extending the classical results of Reilly to this non-smooth setting.