Dirichlet eigenfunctions with nonzero mean value

Abstract

We consider Laplacian eigenfunctions on a domain ⊂ Rd. Under Neumann boundary conditions, the first eigenfunction is constant and the others have mean value 0. The situation is different for Dirichlet boundary conditions: on `generic' domains, one would expect that every eigenfunction has nonzero mean value. The other extreme is the ball in Rd, where among the first n eigenfunctions only n1/d have a mean value different from zero. We prove that this rate is sharp in any smooth domain, up to a logarithmic factor: in any smooth domain~, among the first n Dirichlet eigenfunctions at least (n)-1/2 · n1/d have a nonzero mean.

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