Let L be either [0, 1] or {0, 1} with the usual order. We study topologies on a set X for which the cozero-sets of certain subfamilies H of Lx form a base, and the properties imposed on such topologies by hypothesizing various order-theoretic conditions on H. We thereby obtain useful generalizations of extremely disconnected spaces, basically disconnected spaces, and F-spaces. In particular we use these tools to study the space of minimal prime ideals of certain commutative rings

Dow, Alan

Henriksen, Melvin

Kopperman, Ralph

Woods, R. G.

English

Keck Graduate Institute

Topologies and Cotopologies Generated by Sets of Functions

Scholarship@Claremont

ABSTRACT. Let L be either [0, 1] or {0, 1} with the usual order. We study topologies on a set X for which the cozero-sets of certain subf•.milies • of L X form a ba.se, and the properties imposed on such topologies by hy-pothesizing various order-theoretic conditions on •t. We thereby obtain use-ful generalizatons of extremally disconcted spaces, basically disconnected spaces, and F-spaces. In paxticular we use these tools to study the space of minimal prime ideals of certain commutative rings. 1. Introduction. For over half a century topologists have studied what we now call Tychonoff topological spaces with the aid of the lattice-ordered ring C(X) of continuous real-valued functions on X. Zero-dimensional spaces have been studied using the ring C(X, {0, 1}) of continuous functions on X into th

A. Dow

M. Henriksen

R. Kopperman

R. G. Woods

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Topologies and cotopologies generated by sets of functions

https://scholarship.claremont.edu/cgi/viewcontent.cgi?article=1343&amp;context=hmc_fac_pub

Topologies and Cotopologies Generated by Sets of Functions

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Keck Graduate Institute

Scholarship@Claremont

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