Eigenvalue asymptotics for potential type operators on Lipschitz surfaces of codimension greater than 1
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For potential type integral operators on a Lipschitz submanifold, the asymptotic formula for eigenvalues is proved in this article, based on the study of the rate of operator convergence as smooth surfaces approximate the Lipschnitz one.Abstract:
For potential type integral operators on a Lipschitz submanifold the asymptotic formula for eigenvalues is proved. The reasoning is based upon the study of the rate of operator convergence as smooth surfaces approximate the Lipschitz one.read more
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