A. I. Kozhanov, G. A. Lukina, “Pseudoparabolic and pseudohyperbolic equations in noncylindrical time domains”, Mathematical notes of NEFU, 2019, Volume 26, Issue 3,Pages <nobr>15

Mathematics

Pseudoparabolic and pseudohyperbolic equations in noncylindrical time domains

A. I. Kozhanov^ab, G. A. Lukina^c

^a Sobolev Institute of Mathematics, 4 Acad. Koptyug Avenue, Novosibirsk 630090, Russia
^b Novosibirsk State University, 1 Pirogov Street, Novosibirsk 630090, Russia
^c Ammosov North-Eastern Federal University, Mirny Polytechnic Institute, 5/1 Tikhonov Street, Mirny 630090, Russia

Abstract: We study solvability of new boundary value problems for pseudoparabolic and pseudohyperbolic equations with one spatial variable. The solutions for these problems are sought in domains noncylindrical along the time variable, not in the domains with curvilinear borders (domains with moving border) as in the previous works. We prove the existence and uniqueness theorems for the regular solutions, those having all generalized Sobolev derivatives, required in the equation, in the inner subdomains.

Keywords: pseudoparabolic equation, pseudohyperbolic equation, noncylindrical domain, boundary value problem, regular solution, existence, uniqueness.

UDC: 517.946

Received: 01.08.2019
Revised: 23.08.2019
Accepted: 03.09.2019

DOI: 10.25587/SVFU.2019.17.12.002