Your search keyword '"TOREBEK, BERIKBOL T."' showing total 6 results

1. Blowing-up solutions of the time-fractional dispersive equations

Author

Alsaedi Ahmed, Ahmad Bashir, Kirane Mokhtar, and Torebek Berikbol T.

Subjects

caputo derivative, burgers equation, korteweg-de vries equation, benjamin-bona-mahony equation, camassa-holm equation, rosenau equation, ostrovsky equation, blow-up, primary 35b50, secondary 26a33, 35k55, 35j60, Analysis, QA299.6-433

Abstract

This paper is devoted to the study of initial-boundary value problems for time-fractional analogues of Korteweg-de Vries, Benjamin-Bona-Mahony, Burgers, Rosenau, Camassa-Holm, Degasperis-Procesi, Ostrovsky and time-fractional modified Korteweg-de Vries-Burgers equations on a bounded domain. Sufficient conditions for the blowing-up of solutions in finite time of aforementioned equations are presented. We also discuss the maximum principle and influence of gradient non-linearity on the global solvability of initial-boundary value problems for the time-fractional Burgers equation. The main tool of our study is the Pohozhaev nonlinear capacity method. We also provide some illustrative examples.

Published

2021

2. Global existence and blow-up of solutions to the double nonlinear porous medium equation.

Author

Sabitbek, Bolys and Torebek, Berikbol T.

Subjects

BLOWING up (Algebraic geometry), POROUS materials, INVARIANT sets, THRESHOLD energy, EQUATIONS, POTENTIAL well

Abstract

In this study, we examine a double nonlinear porous medium equation subject to a novel nonlinearity condition within a bounded domain. First, we introduce the blow-up solution for the problem under consideration for the negative initial energy. By introducing a set of potential wells, we construct invariant sets of solutions for the double nonlinear porous medium equation. For subcritical and critical initial energy scenarios, we derive the global existence and asymptotic behavior of weak solutions, as well as blow-up phenomena occurring within a finite time for the positive solution to the double nonlinear porous medium equation. [ABSTRACT FROM AUTHOR]

Published

2024

3. Fisher–KPP equation on the Heisenberg group.

Author

Kashkynbayev, Ardak, Suragan, Durvudkhan, and Torebek, Berikbol T.

Subjects

EQUATIONS, BLOWING up (Algebraic geometry)

Abstract

In this paper, we consider the Fisher–KPP equation on the Heisenberg group. We discuss the existence of global solutions, asymptotic behavior of global solutions and blow‐up solutions. Moreover, we extend the obtained results to the time‐fractional Fisher–KPP equation on the Heisenberg group. [ABSTRACT FROM AUTHOR]

Published

2023

4. Global existence and blow-up for a space and time nonlocal reaction-diffusion equation.

Author

Alsaedi, Ahmed, Kirane, Mokhtar, and Torebek, Berikbol T.

Subjects

REACTION-diffusion equations, TIME

Abstract

A time-space fractional reaction-diffusion equation in a bounded domain is considered. Under some conditions on the initial data, we show that solutions may experience blow-up in a finite time. However, for realistic initial conditions, solutions are global in time. Moreover, the asymptotic behavior of bounded solutions is analysed. [ABSTRACT FROM AUTHOR]

Published

2021

5. Local existence and global nonexistence results for an integro‐differential diffusion system with nonlocal nonlinearities.

Author

Borikhanov, Meiirkhan B. and Torebek, Berikbol T.

Subjects

*DIFFUSION, *CRITICAL exponents, *NONLINEAR systems

Abstract

In the present paper, initial problem for the integro‐differential diffusion system with nonlocal nonlinear sources is considered. The results on existence of local mild solutions and nonexistence of global weak solution to the nonlinear integro‐differential diffusion system are presented. [ABSTRACT FROM AUTHOR]

Published

2021

6. Local and blowing-up solutions for an integro-differential diffusion equation and system.

Author

Borikhanov, Meiirkhan and Torebek, Berikbol T.

Subjects

*HEAT equation, *INTEGRO-differential equations, *MAXIMUM principles (Mathematics), *BLOWING up (Algebraic geometry), *INTEGRALS

Abstract

In the present paper, the semilinear integro-differential diffusion equation and system with singular in time sources are considered. An analog of Duhamel's principle for the linear integro-differential diffusion equation is proved. Using Duhamel's principle, a representation of the solution and the well-posedness of the initial problem for the linear integro-differential diffusion equation are established. The results on the existence of local integral solutions and the nonexistence of global solutions to the semilinear integro-differential diffusion equation and system are presented. [ABSTRACT FROM AUTHOR]

Published

2021