"Blinking eigenvalues" of the Steklov problem generate the continuous spectrum in a cuspidal domain

Abstract

We study the Steklov spectral problem for the Laplace operator in a bounded domain ⊂ Rd, d ≥ 2, with a cusp such that the continuous spectrum of the problem is non-empty, and also in the family of bounded domains ⊂ , > 0, obtained from by blunting the cusp at the distance of from the cusp tip. While the spectrum in the blunted domain consists for a fixed of an unbounded positive sequence \ λj \j=1∞ of eigenvalues, we single out different types of behavior of some eigenvalues as +0: in particular, stable, blinking, and gliding families of eigenvalues are found. We also describe a mechanism which transforms the family of the eigenvalue sequences into the continuous spectrum of the problem in , when +0.