Two new Weyl-type bounds for the Dirichlet Laplacian
Abstract
In this paper, we prove two new Weyl-type upper estimates for the eigenvalues of the Dirichlet Laplacian. As a consequence, we obtain the following lower bounds for its counting function. For 1, one has N() > 2n+2 1Hn (-1)n/2 1-n/2, and N() > (n+2n+4)n/2 1Hn (-(1+4/n) 1)n/2 1-n/2, where Hn=2 njn/2-1,12 Jn/22(jn/2-1,1) is a constant which depends on n, the dimension of the underlying space, and Bessel functions and their zeros.
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