Flag representations of mixed volumes and mixed functionals of convex bodies

Abstract

Mixed volumes V(K1,…, Kd) of convex bodies K1,… ,Kd in Euclidean space Rd are of central importance in the Brunn-Minkowski theory. Representations for mixed volumes are available in special cases, for example as integrals over the unit sphere with respect to mixed area measures. More generally, in Hug-Rataj-Weil (2013) a formula for V(K [n], M[d-n]), n∈ \1,… ,d-1\, as a double integral over flag manifolds was established which involved certain flag measures of the convex bodies K and M (and required a general position of the bodies). In the following, we discuss the general case V(K1[n1],… , Kk[nk]), n1+·s +nk=d, and show a corresponding result involving the flag measures n1(K1;·),…, nk(Kk;·). For this purpose, we first establish a curvature representation of mixed volumes over the normal bundles of the bodies involved. We also obtain a corresponding flag representation for the mixed functionals from translative integral geometry and a local version, for mixed (translative) curvature measures.