论文信息 - Monotone Difference Schemes for Weakly Coupled Elliptic and Parabolic Systems

Monotone Difference Schemes for Weakly Coupled Elliptic and Parabolic Systems

Abstract The present paper is devoted to the development of the theory of monotone difference schemes, approximating the so-called weakly coupled system of linear elliptic and quasilinear parabolic equations. Similarly to the scalar case, the canonical form of the vector-difference schemes is introduced and the definition of its monotonicity is given. This definition is closely associated with the property of non-negativity of the solution. Under the fulfillment of the positivity condition of the coefficients, two-side estimates of the approximate solution of these vector-difference equations are established and the important a priori estimate in the uniform norm C is given.

Francisco José Gaspar | Piotr P. Matus | Le Minh Hieu | Vo Thi Kim Tuyen

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