Improvement of eigenfunction estimates on manifolds of nonpositive curvature

Abstract

Let (M,g) be a compact, boundaryless manifold of dimension n with the property that either (i) n=2 and (M,g) has no conjugate points, or (ii) the sectional curvatures of (M,g) are nonpositive. Let be the positive Laplacian on M determined by g. We study the L2Lp mapping properties of a spectral cluster of of width 1/λ. Under the geometric assumptions above, berard77 B\'erard obtained a logarithmic improvement for the remainder term of the eigenvalue counting function which directly leads to a (λ)1/2 improvement for H\"ormander's estimate on the L∞ norms of eigenfunctions. In this paper we extend this improvement to the Lp estimates for all p>2(n+1)n-1.