On finite-dimensional uniform spaces. II

Abstract: Introduction. The main subject of this paper is the [inductive* dimension δ Ind μX of uniform spaces μX. This is defined similarly to topological dimension Ind, but instead of separation one uses the notion of a set H, arbitrarily small uniform neighborhoods of which uniformly separate given sets A, B. For finite dimensional metric spaces M (i.e. the large dimension Δd M is finite) 8 Ind coincides with the covering dimensions Ad and δd. For general spaces μX we have 8 Ind μX ^ δd μX. For all known examples (in… Show more

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A simple proof of a theorem of Isbell

“…After changing several obvious coefficients n~l to (for [2 ] in the same review. The writer regrets these inaccuracies.…”

A simple proof of a theorem of Isbell

“…Z is homeomorphic to a closed subset of JXT-oI A(n)|. [2 ] in the same review. The writer regrets these inaccuracies.…”

A Simple Proof of a Theorem of Isbell

“…This definition used the notion of a "freeing set." Isbell posed the problem of whether or not δInd and δd coincide in [6] and [7].…”

Proximity inductive dimension and Brouwer dimension agree on compact Hausdorff spaces