Deformation of domain and the limit of the variational eigenvalues of semilinear elliptic operators.

Shibata, Tetsutaro

Displaying similar documents to “Deformation of domain and the limit of the variational eigenvalues of semilinear elliptic operators.”

A river water quality model for time varying BOD discharge concentration.

Oppenheimer, Seth F., Adrian, Donald Dean, Alshawabkeh, Akram (1999)

Mathematical Problems in Engineering

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Spectral analysis of perturbed multiplication operators occurring in polymerization chemistry

Niels Joergen Kokholm (1989)

Journées équations aux dérivées partielles

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On the eigenvalues of a class of hypo-elliptic operators. IV

Johannes Sjöstrand (1980)

Annales de l'institut Fourier

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Let $P$ be a selfadjoint classical pseudo-differential operator of order $> 1$ with non-negative principal symbol on a compact manifold. We assume that $P$ is hypoelliptic with loss of one derivative and semibounded from below. Then exp $(- t P)$ , $t \geq 0$ , is constructed as a non-classical Fourier integral operator and the main contribution to the asymptotic distribution of eigenvalues of $P$ is computed. This paper is a continuation of a series of joint works with A. Menikoff.

Infinitely divisible processes and their potential theory. I

Sidney C. Port, Charles J. Stone (1971)

Annales de l'institut Fourier

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We show that associated with every i.d. (infinitely divisible) process on a locally compact, non-compact 2nd countable Abelian group is a corresponding potential theory that yields definitive results on the behavior of the process in both space and time. Our results are general, no density or other smoothness assumptions are made on the process. In this first part of two part work we have four main goals. (1) To lay the probabilistic foundation of such processes. This mainly...