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Parallel AGEI method for fourth order parabolic equations
parabolic equations iterative method parallel computation
2010/9/14
Based on a high order absolutely stable implicit scheme, we construct the alternating group explicit iterative method (AGEI) for four order parabolic equations. The method is verified to be convergent...
An alternating group explicit iterative method for solving four-order parabolic equations
iterative method parallel computing alternating group
2010/9/14
A class of alternating group explicit iterative method using the C-N scheme is derived for solving four order parabolic equations, and the analysis for convergency is given. In the end, the numerical ...
Weak Periodic Solutions of Some Quasilinear Parabolic Equations with Data Measures
Quasilinear equations Periodic Parabolic Convex nonlinearities Data measures Nonlinear capacities
2008/6/26
The goal of this paper is to study the existence of weak periodic solutions for some quasilinear parabolic equations with data measures and critical growth nonlinearity with respect to the gradient. T...
Adomian decomposition method for approximating the solution of the parabolic equations
Adomian decomposition method parabolic equations
2010/9/15
In this paper, the Adomian decomposition method for solving the linear and nonlinear parabolic equations is implemented with appropriate initial conditions. In comparison with existing techniques, the...
Asymptotic Properties of Solutions of Parabolic Equations Arising from Transient Diffusions
singular perturbation diffusion backward operator
2007/12/10
This work is concerned with asymptotic properties of a class of parabolic systems arising from singularly perturbed diffusions. The underlying system has a fast varying component and a slowly changing...
GLOBAL EXISTENCE AND DECAY ESTIMATES FOR SOLUTIONS OF DEGENERATE PARABOLIC EQUATIONS
Parabolic equation existence
2007/12/10
In this paper, we will show the existence and certain decay estimate of the global solutions for the initial-boundary value problemin the smooth bounded domain Ω=Rn. n≥2.