Generalized linear complementarity problems treated without fixed-point theory

We study the (monotone) linear complementarity problem in reflexive Banach space. The problem is treated as a quadratic program and shown to satisfy appropriate constraint qualifications. This leads to a theory of the generalized monotone linear complementarity problem which is independent of Brouwer's fixed-point theorem. Certain related results on linear systems are given. The final section concerns copositive operators.This research was partially supported by NSERC Grant No. A-5516.The author thanks the referee for his painstaking and thorough comments on this paper.