Nonlinear Evolution Equations: Blow-up, Stability, Asymptotic Behavior

Name: Nonlinear Evolution Equations: Blow-up, Stability, Asymptotic Behavior
Brand: LAP LAMBERT Academic Publishing
Availability: OutOfStock
Rating: 5 (1 reviews)

By Soufiane Benkouider

0 - Default Title

Description

This book investigates the blow-up phenomena, asymptotic behavior, and stability ofsolutions for several classes of nonlinear partial differential equations (PDEs), includingreaction-diffusion and wave-type equations with variable exponents, memory effects, andsingular coeffcients. The work is divided into four main parts.First, we study the blow-up phenomenon for nondegenerate parabolic PDEs in boundeddomains. By considering a nonnegative diffusion coeffcient a(x, t), we establish new blowup criteria and derive sharp lower and upper bounds for the blow-up time of semilinearreaction-diffusion equations and nonlinear equations involving the m(x, t)-Laplacian operator.Second, we analyze the initial-boundary value problem for Kirchhoff-type viscoelasticwave equations with Balakrishnan-Taylor damping, infinite memory, and time-varyingdelay. Under suitable assumptions on the relaxation function and initial data, we provethat the energy decays at a rate determined by the relaxation function, which may beneither exponential nor polynomial. Moreover, we establish a general stability resultunder a weak growth condition on the relaxation kernel.

Product details

Binding:

Paperback

Number of Pages:

144

Release Date:

2025-09-10

Publication Date:

2025-09-10

Publisher:

LAP LAMBERT Academic Publishing

Languages:

Original: English

ISBN10:

6202431776

ISBN13:

9786202431774

GPSR Manufacturer Reference:

[email protected]

Weight:

233 g

Height:

150 cm

Width:

220 cm

Thickness:

9 cm

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