Metric properties in the mean of polynomials on compact isotropy irreducible homogeneous spaces

Abstract

Let M=G/H be a compact connected isotropy irreducible Riemannian homogeneous manifold, where G is a compact Lie group (may be, disconnected) acting on M by isometries. This class includes all compact irreducible Riemannian symmetric spaces and, for example, the tori n/n with the natural action on itself extended by the finite group generated by all transpositions of coordinates and inversions in circle factors. We say that u is a polynomial on M if it belongs to some G-invariant finite dimensional subspace of L2(M). We compute or estimate from above the averages over the unit sphere in for some metric quantities such as Hausdorff measures of level set and norms in Lp(M), 1≤ p≤∞, where M is equipped with the invariant probability measure. For example, the averages over of \|u\|Lp(M), p≥2, are less than p+1e independently of M and .