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A Finiteness Condition for Locally Compact Abelian Groups

Published online by Cambridge University Press:  09 April 2009

L. C. Grove  and
L. J. Lardy
L. C. Grove
Affiliation:
The University of Oregon Syracuse University
L. J. Lardy
Affiliation:
The University of Oregon Syracuse University
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A map f: AB in category is called monic if fg = fh implies that g = h for all maps g, h: CA; it is called epic if gf = hf implies that g = h for all maps g, h: BC. An object A ∈ is called an S-object if every monic map f: AA is also epic; it is called a Q-object if every epic map f: AA is also monic. If A is both an S-object and a Q-object then A is called an SQ-object. In the category of sets the SQ-sets are the finite sets. In the category of vector spaces over a field F the SQ-spaces are precisely the finite dimensional spaces. In the light of these simple examples, it seems reasonable to view the SQ-objects of a category as being of ‘finite type’. We shall be chiefly concerned with investigating the SQ-objects in certain subcategories of the category of locally compact abelian groups.

Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 12 , Issue 1 , February 1971 , pp. 115 - 121
Copyright
Copyright © Australian Mathematical Society 1971

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