Eigenvalues of the Neumann Laplacian with density and sharp Sobolev-Orlicz embeddings
Abstract
We provide the estimates for the constant in the weighted Poincar\'e inequality for a special class of planar domains and weights. Based on this, we prove the lower bounds for the first non-zero eigenvalue μ of the Neumann Laplacian with density . These estimates depend on the density function and the geometry of the domain. In particular, it is shown, that μ can be made arbitrarily large by changing the mass density of the domain.
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