J 2020

Generalized symmetries, conservation laws and Hamiltonian structures of an isothermal no-slip drift flux model

OPANASENKO, Stanislav, Alexander BIHLO, Roman POPOVYCH and Artur SERGYEYEV

Basic information

Original name

Generalized symmetries, conservation laws and Hamiltonian structures of an isothermal no-slip drift flux model

Authors

OPANASENKO, Stanislav (804 Ukraine, guarantor), Alexander BIHLO (40 Austria), Roman POPOVYCH (804 Ukraine, belonging to the institution) and Artur SERGYEYEV (804 Ukraine, belonging to the institution)

Edition

Physica D: Nonlinear Phenomena, Amsterdam, Elsevier B.V. 2020, 0167-2789

Other information

Language

English

Type of outcome

Článek v odborném periodiku

Field of Study

10101 Pure mathematics

Country of publisher

Netherlands

Confidentiality degree

není předmětem státního či obchodního tajemství

RIV identification code

RIV/47813059:19610/20:A0000068

Organization unit

Mathematical Institute in Opava

UT WoS

000558454900017

Keywords in English

Generalized symmetry; Local conservation law; Recursion operator; Hamiltonian structure; Hydrodynamic-type system; Isothermal no-slip drift flux

Tags

Links

GBP201/12/G028, research and development project.
Změněno: 6/4/2021 13:40, Mgr. Aleš Ryšavý

Abstract

V originále

We study the hydrodynamic-type system of differential equations modeling isothermal no-slip drift flux. Using the facts that the system is partially coupled and its subsystem reduces to the (1+1)-dimensional Klein-Gordon equation, we exhaustively describe generalized symmetries, cosymmetries and local conservation laws of this system. A generating set of local conservation laws under the action of generalized symmetries is proved to consist of two zeroth-order conservation laws. The subspace of translation-invariant conservation laws is singled out from the entire space of local conservation laws. We also find broad families of local recursion operators and a nonlocal recursion operator, and construct an infinite family of Hamiltonian structures involving an arbitrary function of a single argument. For each of the constructed Hamiltonian operators, we obtain the associated algebra of Hamiltonian symmetries.