Pólya's conjecture fails for the fractional Laplacian

Mateusz Kwaśnicki; Richard S. Laugesen; Bartłomiej A. Siudeja

doi:10.4171/jst/242

JournalsjstVol. 9, No. 1pp. 127–135

Pólya's conjecture fails for the fractional Laplacian

Mateusz Kwaśnicki
Wrocław University of Science and Technology, Poland
Richard S. Laugesen
University of Illinois, Urbana, USA
Bartłomiej A. Siudeja
Eugene, USA

$Pólya's conjecture fails for the fractional Laplacian cover$

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Abstract

The analogue of Pólya's conjecture is shown to fail for the fractional Laplacian $(- Δ)^{α /2}$ on an interval in 1-dimension, whenever $0 < α < 2$ . The failure is total: every eigenvalue lies below the corresponding term of the Weyl asymptotic.

In 2-dimensions, the fractional Pólya conjecture fails already for the first eigenvalue, when $0 < α < 0.984$ .

Cite this article

Mateusz Kwaśnicki, Richard S. Laugesen, Bartłomiej A. Siudeja, Pólya's conjecture fails for the fractional Laplacian. J. Spectr. Theory 9 (2019), no. 1, pp. 127–135

DOI 10.4171/JST/242