Bijective linear maps on semimodules spanned by Boolean matrices of fixed rank
Let M(m,n) (B) be the semimodule of all m x n Boolean matrices where B is the Boolean algebra with two elements Let k be a positive integer such that 2 <= k <= min (m, n). Let B (m, n, k) denote the subsemimodule of M(m,n) (B) spanned by the set of all rank k matrices. We show that if T is a b...
محفوظ في:
| المؤلفون الرئيسيون: | , |
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| التنسيق: | مقال |
| منشور في: |
Elsevier Science Inc
2010
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| الموضوعات: | |
| الوصول للمادة أونلاين: | http://eprints.um.edu.my/11892/ |
| الوسوم: |
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| الملخص: | Let M(m,n) (B) be the semimodule of all m x n Boolean matrices where B is the Boolean algebra with two elements Let k be a positive integer such that 2 <= k <= min (m, n). Let B (m, n, k) denote the subsemimodule of M(m,n) (B) spanned by the set of all rank k matrices. We show that if T is a buective linear mapping on B (m, n, k), then there exist permutation matrices P and Q such that T (A) = PAQ for all A is an element of B (m, n, k) or m = n and T (A) = PA(l)Q for all A is an element of B (m, n, k) This result follows from a more general theorem we prove concerning the structure of linear mappings on B (m, n, k) that preserve bot h the weight of each matrix and rank one matrices of weight k(2) Here the weight of a Boolean matrix is the number of its non-zero entries (C) 2010 Elsevier Inc All rights reserved. |
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