The minimal structures for T_A

Aisling Mccluskey

The minimal structures for T_A

Mathematics

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Abstract

Given the lattice of all topologies definable for an infinite set X, a technique to solve many minimality problems is developed. Its potential in characterizing and, where possible, identifying those topologies that are minimal with respect to various invariants, including T(A), is illustrated. Finally, an alternative description of each topologically established minimal structure in terms of the behavior of the naturally occurring specialization order and the intrinsic topology on the resulting partially ordered set is offered.

Original language	English (Ireland)
Journal	Annals of the New York Academy of Sciences
Volume	659
Publication status	Published - 1 Sep 1992

Authors (Note for portal: view the doc link for the full list of authors)

Authors
MCCLUSKEY, AE,MCCARTAN, SD

Cite this

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title = "The minimal structures for T\_A",

abstract = " Given the lattice of all topologies definable for an infinite set X, a technique to solve many minimality problems is developed. Its potential in characterizing and, where possible, identifying those topologies that are minimal with respect to various invariants, including T(A), is illustrated. Finally, an alternative description of each topologically established minimal structure in terms of the behavior of the naturally occurring specialization order and the intrinsic topology on the resulting partially ordered set is offered. ",

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year = "1992",

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language = "English (Ireland)",

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AU - Mccluskey, Aisling

PY - 1992/9/1

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N2 - Given the lattice of all topologies definable for an infinite set X, a technique to solve many minimality problems is developed. Its potential in characterizing and, where possible, identifying those topologies that are minimal with respect to various invariants, including T(A), is illustrated. Finally, an alternative description of each topologically established minimal structure in terms of the behavior of the naturally occurring specialization order and the intrinsic topology on the resulting partially ordered set is offered.

AB - Given the lattice of all topologies definable for an infinite set X, a technique to solve many minimality problems is developed. Its potential in characterizing and, where possible, identifying those topologies that are minimal with respect to various invariants, including T(A), is illustrated. Finally, an alternative description of each topologically established minimal structure in terms of the behavior of the naturally occurring specialization order and the intrinsic topology on the resulting partially ordered set is offered.

M3 - Article

VL - 659

JO - Annals of the New York Academy of Sciences

JF - Annals of the New York Academy of Sciences

ER -

The minimal structures for T_A

Abstract

Authors (Note for portal: view the doc link for the full list of authors)

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