Abstract Let V , W be finite dimensional vector spaces over a field K, each with n distin- guished subspaces, with a dimension-preserving correspondence between intersec- tions. When does this guarantee the existence of an isomorphism between V and W matching corresponding subspaces? The setting where it happens requires that the distinguished subspaces be generated by subsets of a given redundant base of the space; this gives rise to a (0,1)-incidence table called tent, an object which occurs in the study of Butler B(1)-groups.
On vector spaces with distinguished subspaces and redundant base / F., Barioli; DE VIVO, Clorinda; Metelli, Claudia. - In: LINEAR ALGEBRA AND ITS APPLICATIONS. - ISSN 0024-3795. - STAMPA. - 374:(2003), pp. 107-126.
On vector spaces with distinguished subspaces and redundant base
DE VIVO, CLORINDA;METELLI, CLAUDIA
2003
Abstract
Abstract Let V , W be finite dimensional vector spaces over a field K, each with n distin- guished subspaces, with a dimension-preserving correspondence between intersec- tions. When does this guarantee the existence of an isomorphism between V and W matching corresponding subspaces? The setting where it happens requires that the distinguished subspaces be generated by subsets of a given redundant base of the space; this gives rise to a (0,1)-incidence table called tent, an object which occurs in the study of Butler B(1)-groups.| File | Dimensione | Formato | |
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