Existence Theorem for the Discontinuous Generalized Quasivariational Inequality Problem

We consider the following generalized quasivariational inequality problem: given a real Banach space E with topological dual E* and given two multifunctions G:X→2 X and F:X→2 E *, find $$(\hat x,\hat \varphi ) \in X \times E*$$ such that $$\hat x \in G(\hat x),{\text{ }}\hat \varphi \in F(\hat x),{\text{ }}\left\langle {\hat \varphi ,\hat x - y} \right\rangle \leqslant 0,{\text{ for all }}y \in G(\hat x).$$ We prove an existence theorem where F is not assumed to have any continuity or monotonicity property. Making use of a different technical construction, our result improves some aspects of a recent existence result (Theorem 3.1 of Ref. 1). In particular, the coercivity assumption of this latter result is weakened meaningfully.