Homogenization of nonlocal spectral problems
Journal article, 2024
We consider a spectral problem for convolution-type operators in environments with locally periodic microstructure and study the asymptotic behavior of the bottom of the spectrum. We show that the bottom point of the spectrum converges as the microstructure period tends to zero, and identify the limit in terms of an additive eigenvalue problem for effective Hamilton-Jacobi equation. In the periodic case, we establish a more accurate two-term asymptotic formula.
Nonlocal operators
Homogenization
Spectral problems
Author
Andrey Piatnitski
University of Tromsø – The Arctic University of Norway
Volodymyr Rybalko
University of Gothenburg
Chalmers, Mathematical Sciences, Analysis and Probability Theory
Zeitschrift für Angewandte Mathematik und Physik
0044-2275 (ISSN) 1420-9039 (eISSN)
Vol. 75 6 226Subject Categories
Mathematical Analysis
DOI
10.1007/s00033-024-02365-x