Article ID Journal Published Year Pages File Type
4632895 Applied Mathematics and Computation 2009 10 Pages PDF
Abstract
In this paper, we introduce a total step method for solving a system of linear complementarity problems with perturbations and interval data. It is applied to two interval matrices [A] and [B] and two interval vectors [b] and [c]. We prove that the sequence generated by the total step method converges to ([x∗],[y∗]) which includes the solution set for the system of linear complementarity problems defined by any fixed A∈[A],B∈[B],b∈[b] and c∈[c]. We also consider a modification of the method and show that, if we start with two interval vectors containing the limits, then the iterates contain the limits. We close our paper with two examples which illustrate our theoretical results.
Related Topics
Physical Sciences and Engineering Mathematics Applied Mathematics
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