Inequalities for the quermassintegrals of sections of convex bodies

Abstract

We provide general estimates which compare the quermassintegrals of a convex body K in Rn with the averages of the corresponding quermassintegrals of the k-codimensional sections of K over Gn,n-k. An example is the inequality αn,k,jWj(K)|K|≤∫Gn,n-kWj(K F)|K F|dn,n-k(F)≤ βn,k,jWj(K)|K| where the constants αn,k,j and βn,k,j depend only on n,k and j, which holds true for any centrally symmetric convex body K in Rn and any 0≤ j≤ n-k-1≤ n-1. Using these estimates we obtain some positive results for suitable versions of the slicing problem for the quermassintegrals of a convex body.