Sentence examples for medium equation with from inspiring English sources

Moreover, some of the techniques were also applied to the porous medium equation with reaction.

A stochastic version of the porous medium equation with coloured noise is studied.

In this article, we investigate the Dirichlet problem for a porous medium equation with a more complicated source term.

Wang et al. [10] studied the porous medium equation with terms of power form u t = △ u m + u p, ( x, t ) ∈ Ω × ( 0, + ∞ ).

This paper concerns the regularity of the weak solutions of the Cauchy problem to a fractional porous medium equation with a forcing term.

An adaptive moving mesh finite element method is studied for the numerical solution of the porous medium equation with and without variable exponents and absorption.

Porous medium equations with local sources or with nonlocal sources subjected to nonlocal boundary conditions were also studied (see [9 12]).

Thereafter, they obtained the same results for a class of nonlocal porous medium equations with strong absorption, see [10].

We consider the initial Dirichlet boundary value problem for a class of porous medium equations with nonlocal source and strong absorption terms (1).

In addition, for the system of porous medium equations with nonlinear memory terms and a homogeneous Dirichlet boundary condition, one can refer for example to [8, 9].

Numerical discretizations of the Generalized Porous Medium Equation (GPME) with discontinuous coefficients are analyzed with respect to the formation of numerical artifacts.