Variational characterizations of the total scalar curvature and eigenvalues of the Laplacian

Abstract

For the dual operator sg'* of the linearization sg' of the scalar curvature function, it is well-known that if sg'*≠ 0, then sg is a non-negative constant. In particular, if the Ricci curvature is not flat, then sg/(n-1) is an eigenvalue of the Laplacian of the metric g. In this work, some variational characterizations were performed for the space sg'*. To accomplish this task, we introduce a fourth-order elliptic differential operator A and a related geometric invariant . We prove that vanishes if and only if sg'* 0, and if the first eigenvalue of the Laplace operator is large compared to its scalar curvature, then is positive and sg'*= 0. Furthermore, we calculated the lower bound on in the case of sg'* = 0. We also show that if there exists a function which is A-superharmonic and the Ricci curvature has a lower bound, then the first non-zero eigenvalue of the Laplace operator has an upper bound.