Spectral asymptotics of periodic elliptic operators

Abstract

We demonstrate that the structure of complex second-order strongly elliptic operators H on Rd with coefficients invariant under translation by Zd can be analyzed through decomposition in terms of versions Hz, z∈ Td, of H with z-periodic boundary conditions acting on L2( Id) where I=[0,1>. If the semigroup S generated by H has a H\"older continuous integral kernel satisfying Gaussian bounds then the semigroups Sz generated by the Hz have kernels with similar properties and z Sz extends to a function on Cd\0\ which is analytic with respect to the trace norm. The sequence of semigroups S(m),z obtained by rescaling the coefficients of Hz by c(x) c(mx) converges in trace norm to the semigroup Sz generated by the homogenization Hz of Hz. These convergence properties allow asymptotic analysis of the spectrum of H.

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