Generalizations of the Coincidence Value Property

Abstract

For f,g:X X continuous and commuting maps of a Hausdorff space, we investigate various conditions on X and on the pair (f,g) which provide existence of a coincidence value. We introduce generalized notions of the coincidence value property and use this added flexibility to determine how various coincidence properties of X are related to group actions on X and to coincidence properties of associated fibre bundles and adjunction spaces. We also present a sheaf theoretical approach to obtaining information concerning coincidence values through construction of an "almost constant" presheaf. In particular, we prove several partial results concerning the special cases where X is either a low dimensional dimensional sphere or the closed unit disk.