Harmonic functions with polynomial growth on manifolds with nonnegative Ricci curvature

Abstract

Suppose (M,g) is a Riemannian manifold having dimension n, nonnegative Ricci curvature, maximal volume growth and unique tangent cone at infinity. In this case, the tangent cone at infinity C(X) is an Euclidean cone over the cross-section X. Denote by α=r→∞Vol(Br(p))rn the asymptotic volume ratio. Let hk=hk(M) be the dimension of the space of harmonic functions with polynomial growth of growth order at most k. In this paper, we prove a upper bound of hk in terms of the counting function of eigenvalues of X. As a corollary, we obtain k→∞k1-nhk=2α(n-1)!ωn. These results are sharp, as they recover the corresponding well-known properties of hk(Rn). In particular, these results hold on manifolds with nonnegative sectional curvature and maximal volume growth.