Global behavior of solutions to the fast diffusion equation with boundary flux governed by memory

We study global existence and blow up in finite time for a one‐dimensional fast diffusion equation with memory boundary condition. The problem arises out of a corresponding model formulated from tumor‐induced angiogenesis. We obtain necessary and sufficient conditions for global existence of solutions to the problem. Copyright © 2016 John Wiley & Sons, Ltd.     

带有热源项的非线性扩散方程的精确解

讨论了带有热源项的非线性扩散方程.通过一种直接简洁的方法得到了几种精确解.该方法可用于更高阶演化方程的求解问题.     

Non-self-similar solutions of multidimensional nonlinear diffusion equations

An original construction of the exact nonnegative solution of multidimensional nonlinear diffusion equations is proposed and studied. On substituting this construction into the original equation, we obtain a system of algebro-differential equations in which the number of equations exceeds the number of unknown functions. It is proved that the resulting system possesses nontrivial solutions. On the basis of this result, we construct exact non-self-similar explicit nonnegative solutions anisotropic with respect to the space variables both of the class of equations of a porous medium (nonstationary filtration) and of the class of equations involving nonlinear thermal conductivity with negative exponent. In particular, this class contains the so-called equations of rapid and limit diffusion. Translated fromMatematicheskie Zametki, Vol. 67, No. 2, pp. 250–256, February, 2000.     

High accuracy error estimates of a Galerkin finite element method for nonlinear time fractional diffusion equation

In this work, an effective and fast finite element numerical method with high-order accuracy is discussed for solving a nonlinear time fractional diffusion equation. A two-level linearized finite element scheme is constructed and a temporal–spatial error splitting argument is established to split the error into two parts, that is, the temporal error and the spatial error. Based on the regularity of the time discrete system, the temporal error estimate is derived. Using the property of the Ritz projection operator, the spatial error is deduced. Unconditional superclose result in H¹-norm is obtained, with no additional regularity assumption about the exact solution of the problem considered. Then the global superconvergence error estimate is obtained through the interpolated postprocessing technique. In order to reduce storage and computation time, a fast finite element method evaluation scheme for solving the nonlinear time fractional diffusion equation is developed. To confirm the theoretical error analysis, some numerical results are provided.     

Blow-up and existence for fast diffusion equations with general nonlinearities

1.IntroductionInthispaperweconsidertheCauchyproblemforthefastdiffusionequationwheremaxandpositivefunction.Thistypeofequationhasbeenextensivelystudiedasamathematicalmodelofalotofphysicalproblems(see[1-3]).Amajortopicofstudyistheexistenceandnonexistenc...     

An electrochemistry model with nonlinear diffusion: steady-state solutions

We formulate and study the steady-state solutions for an electrochemistrymodel with nonlinear diffusion. We establish the existenceand uniqueness of solutions, prove the global convergence ofa successive iteration scheme, and use examples to illustratethe formation of vacuum regions, which is not possible in alinear diffusion model.     

Painlevé analysis and exact solutions of the nonlinear diffusion equation with a polynomial source

Nonlinear diffusion equation with a polynomial source is considered. The Painlevé analysis of equation has been studied. Exact traveling wave solutions in the simplest cases have been found. Copyright © 2015 John Wiley & Sons, Ltd.     

Extinction for a fast diffusion equation with a nonlinear nonlocal source

In this article, the authors establish conditions for the extinction of solutions, in finite time, of the fast diffusion equation \({u_t=\Delta u^m+a\int_\Omega u^p(y,t)\,{d}y,\ 0 < m < 1,}\) in a bounded domain \({\Omega\subset R^N}\) with N > 2. More precisely speaking, it is shown that if p > m, any solution with small initial data vanishes in finite time, and if p < m, the maximal solution is positive in Ω for all t > 0. For the critical case p = m, whether the solutions vanish in finite time or not depends on the value of aμ, where \({\mu=\int_{\Omega}\varphi(x)\,{d}x}\) and \({\varphi}\) is the unique positive solution of the elliptic problem \({-\Delta\varphi(x)=1,\ x\in \Omega; \varphi(x)=0,\ x\in\partial\Omega}\) .     

具有非线性梯度吸收项的快速扩散方程的有限熄灭

本文研究快速扩散方程ut-Δum +｜ u｜p =0的柯西问题 ,其中m ,p∈ ( 0 ,1) .对于 0

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