1 - 10 of 14 articles
In this paper the existence and multiplicities of positive solutions for a class of quasiliear differential systems with singular nonlinearities via Leray-Schauder degree theory are established.
In this paper, the existence of coexistence states in the Voterra-Lotka competition model under Dirichlet boundary conditions is the major concern. Attention will be focused on the logistic equation. With a comparison theorem an inequality satisfied by the solution of logistic equation is...
In this paper, the fixed point theorem is applied to investigate the existence of solutions of Sturm-Liouville boundary value problems for nonlinear second order impulsive differential equations in Banach spaces.
Some modified Levitin-Polyak projection methods are proposed in this paper for solving monotone linear variational inequality x ε Ω,(x-x)T(hx+c+ c)≤0, ∀x ε Ω. It is pointed out that there are similar methods for solving a general linear variational inequality.
In this article the Cn-graphs are introduced, by which a characterization of the embeddability of a graph on either an orientable surface or a non-orientable surface is provided.
The definition of the ascending subgraph decomposition was given by Alavi. It has been conjectured that every graph of positive size has an ascending subgraph decomposition. In this paper it is proved that the regular graphs under some conditions do have an ascending sub-graph decomposition.
In this paper, an approach to construct a nontrivial end-regular graph of any order under some conditions are given.
In this paper,the problem of fault-tolerant routings in fault-tolerant networks is considered. A routing in a network assigns to each ordered pair of nodes a fixed path. All commu-nication among nodes must go on this routing. When either a node or a link in a fault-tolerant network fails, the...
In this paper,a class of generalized parallel matrix multisplitting relaxation methods for solving linear complementarity problems on the high-speed multiprocessor systems is set up; This class of methods not only includes all the existing relaxation methods for the linear complementarity...
In this paper a mixed finite element method for the convection-dominated diffusion problems with small parameter ε is presented,the effect of the parameter ε on the approximation error is considered and a sufficient condition for optimal error estimates is derived. The paper al-so shows that...
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