Proper sub-APS
From Apstheory
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- | + | A sub-APS <math>H</math> of an APS <math>G</math> is termed '''proper''' if there is an index <math>n</math> for which <math>H_n</math> is a proper subset of <math>G_n</math>. | |
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Current revision as of 23:19, 25 January 2007
This article defines terminology that is local to the wiki. For its use outside the wiki, please give full definitions
This article describes a property that can be evaluated for a sub-APS of an APS and uses only set-theoretical properties
A sub-APS Failed to parse (Can't write to or create math temp directory): H
of an APS Failed to parse (Can't write to or create math temp directory): G is termed proper if there is an index Failed to parse (Can't write to or create math temp directory): n for which Failed to parse (Can't write to or create math temp directory): H_n is a proper subset of Failed to parse (Can't write to or create math temp directory): G_n
.