Please use this identifier to cite or link to this item:
https://open.uns.ac.rs/handle/123456789/5596
Title: | Globally bisingular elliptic operators | Authors: | Battisti U. Gramchev T. Rodino L. Pilipović, Stevan |
Issue Date: | 1-Jan-2013 | Journal: | Operator Theory: Advances and Applications | Abstract: | © 2013 Springer Basel. The main goal of this work is to extend the notion of bisingular pseudo-differential operators, already introduced on compact manifolds, to Shubin type operators on ℝn = ℝn1 ⊕ ℝn2, n1 + n2 = n. First, we prove global calculus (an analogue of the Γ calculus in the work of Shubin) for such operators, we introduce the notion of bisingular globally elliptic operators and we derive estimates for the action in anisotropic weighted Sobolev spaces, recently introduced by Gramchev, Pilipović, Rodino. Next, we investigate the complex powers of such operators and we demonstrate a Weyl type theorem for the spectral counting function of positive self-adjoint unbounded bisingular globally elliptic operators. The crucial ingredient for the proof is the use of the spectral zeta function. For particular classes of operators, defined as polynomials of P1×P2, P1×Iℝn2, Iℝn1 ×P2, Pj being globally elliptic in ℝnj, j = 1, 2, we are able to estimate and, in some cases, calculate explicitly the lower-order term in the asymptotic expansion of the spectral function. | URI: | https://open.uns.ac.rs/handle/123456789/5596 | ISBN: | 9783034805360 | ISSN: | 02550156 |
Appears in Collections: | PMF Publikacije/Publications |
Show full item record
SCOPUSTM
Citations
4
checked on Feb 22, 2020
Page view(s)
18
Last Week
13
13
Last month
0
0
checked on May 3, 2024
Google ScholarTM
Check
Altmetric
Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.