Add to ORKGWe extend Liu's fundamental theorem of the geometry of alternate matrices to the second exterior power of an infinite dimensional vector space and also use her theorem to characterize surjective mappings T from the vector space V of all n x n alternate matrices over a field with at least three elements onto itself such that for any pair A,B in V,rank(A - B) <= 2k if and only if rank(T(A) - T(B)) <=2k, where k is a fixed positive integer such that n >= 2k + 2 and k >= 2. (Authors' abstract
We characterize bijections on matrix spaces (operator algebras) preserving full rank (invertibility)...
AbstractSuppose F is any field and n is an integer with n⩾4. Let Kn(F) be the set of all n×n alterna...
AbstractIn this paper, we characterize (i) linear transformations from one space of Boolean matrices...
AbstractWe extend Liu’s fundamental theorem of the geometry of alternate matrices to the second exte...
AbstractLet m, n and k be positive integers such that 2⩽k<n⩽m. Let V denote either the vector space ...
AbstractWe extend Liu’s fundamental theorem of the geometry of alternate matrices to the second exte...
Let m, n and k be positive integers such that 2 · k < n · m. Let V denote either the vector space o...
Denote by n(F) the linear space of all n×n alternate matrices over a field F. We first characterize ...
Denote by n(F) the linear space of all n×n alternate matrices over a field F. We first characterize ...
Denote by n(F) the linear space of all n×n alternate matrices over a field F. We first characterize ...
AbstractLet Kn(F) be the linear space of all n×n alternate matrices over a field F, and let Kn2(F) b...
AbstractLet Kn(F) be the linear space of all n×n alternate matrices over a field F. An operator f : ...
AbstractLet m, n and k be positive integers such that 2⩽k<n⩽m. Let V denote either the vector space ...
AbstractLet F be a field. Let V denote the vector space of all m×n matrices over F or the vector spa...
AbstractLet λ be any element in an algebraically closed field F of characteristic not 2, and let M :...
We characterize bijections on matrix spaces (operator algebras) preserving full rank (invertibility)...
AbstractSuppose F is any field and n is an integer with n⩾4. Let Kn(F) be the set of all n×n alterna...
AbstractIn this paper, we characterize (i) linear transformations from one space of Boolean matrices...
AbstractWe extend Liu’s fundamental theorem of the geometry of alternate matrices to the second exte...
AbstractLet m, n and k be positive integers such that 2⩽k<n⩽m. Let V denote either the vector space ...
AbstractWe extend Liu’s fundamental theorem of the geometry of alternate matrices to the second exte...
Let m, n and k be positive integers such that 2 · k < n · m. Let V denote either the vector space o...
Denote by n(F) the linear space of all n×n alternate matrices over a field F. We first characterize ...
Denote by n(F) the linear space of all n×n alternate matrices over a field F. We first characterize ...
Denote by n(F) the linear space of all n×n alternate matrices over a field F. We first characterize ...
AbstractLet Kn(F) be the linear space of all n×n alternate matrices over a field F, and let Kn2(F) b...
AbstractLet Kn(F) be the linear space of all n×n alternate matrices over a field F. An operator f : ...
AbstractLet m, n and k be positive integers such that 2⩽k<n⩽m. Let V denote either the vector space ...
AbstractLet F be a field. Let V denote the vector space of all m×n matrices over F or the vector spa...
AbstractLet λ be any element in an algebraically closed field F of characteristic not 2, and let M :...
We characterize bijections on matrix spaces (operator algebras) preserving full rank (invertibility)...
AbstractSuppose F is any field and n is an integer with n⩾4. Let Kn(F) be the set of all n×n alterna...
AbstractIn this paper, we characterize (i) linear transformations from one space of Boolean matrices...