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The journal Asymptotic Analysis fulfills a twofold function. It aims at publishing original mathematical results in the asymptotic theory of problems affected by the presence of small or large parameters on the one hand, and at giving specific indications of their possible applications to different fields of natural sciences on the other hand.
Asymptotic Analysis thus provides mathematicians with a concentrated source of newly acquired information which they may need in the analysis of asymptotic problems.
Authors: Sene, Abdou
Article Type: Research Article
Abstract: We study the behavior of a piezoelectric plate when its thickness tends to 0. Our analysis regorously justifies the classical a priori assumption that the electric potential is a second order polynomial with respect to the thickness variable. We prove that the electric potential appears in the limit bidimensional equation only. Moreover, we obtain the very contribution of the piezoelectric constants in the bending operator.
Citation: Asymptotic Analysis, vol. 25, no. 1, pp. 1-20, 2001
Authors: Liu, Hailiang | Natalini, Roberto
Article Type: Research Article
Abstract: We study the large time behavior of the solutions to the Cauchy problem for the system with relaxation source ut +vx =0, vt +a2 ux =f(u)−v, with $(x,t)\in{\mathbb{R}} \times{\mathbb{R}} ^{+}$ , for the initial data (u,v)=(u0 ,v0 ) at t=0, with $u_{0},v_{0}\in L^{1}({\mathbb{R}})\cap L^{\infty}({\mathbb{R}})$ , f(u)=αu2 /2 and |v0 |≤au0 . Under the sub‐characteristic condition we show that, as t→∞, the component u tends towards a fundamental solution of the convection‐diffusion equation ut +f(u)x =a2 uxx in the Lp norm, at a rate faster than t−(p−1)/2p .
Keywords: relaxation model, long‐time behavior, self‐similarity, diffusion wave
Citation: Asymptotic Analysis, vol. 25, no. 1, pp. 21-38, 2001
Authors: Ambroso, A. | Méhats, F. | Raviart, P.A.
Article Type: Research Article
Abstract: We study a singular perturbation problem for the nonlinear Poisson equation and we classify its solutions. This classification is based on their monotonicity properties, which mainly depend on the stationary points of the so‐called Sagdeev potential. For each class of solution, we give necessary and sufficient conditions for the resolution of the problem and provide a boundary layer analysis.
Keywords: nonlinear Poisson equation, singular perturbation problem, Sagdeev potential, boundary layer
Citation: Asymptotic Analysis, vol. 25, no. 1, pp. 39-91, 2001
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