Title of article
On the lattices of NP-subspaces of a polynomial time vector space over a finite field Original Research Article
Author/Authors
Anil Nerode، نويسنده , , T.M. Langley and J.B. Remmel، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1996
Pages
46
From page
125
To page
170
Abstract
In this paper, we study the lower semilattice of NP-subspaces of both the standard polynomial time representation and the tally polynomial time representation of a countably infinite dimensional vector space V∞ over a finite field F. We show that for both the standard and tally representation of V∞, there exists polynomial time subspaces U and W such that U + V is not recursive. We also study the NP analogues of simple and maximal subspaces. We show that the existence of P-simple and NP-maximal subspaces is oracle dependent in both the tally and standard representations of V∞. This contrasts with the case of sets, where the existence of NP-simple sets is oracle dependent but NP-maximal sets do not exist. We also extend many results of Nerode and Remmel (1990) concerning the relationship of P bases and NP-subspaces in the tally representation of V∞ to the standard representation of V∞.
Journal title
Annals of Pure and Applied Logic
Serial Year
1996
Journal title
Annals of Pure and Applied Logic
Record number
890089
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