DOIAbstract
AbstractIn this paper we study generalizations of the following question: Is a subspace of a projective or affine space characterized by the cardinalities of intersections with all hyperplanes? In several cases the answer is affirmative
AbstractIn this paper we study generalizations of the following question: Is a subspace of a projective or affine space characterized by the cardinalities of intersections with all hyperplanes? In several cases the answer is affirmative
AbstractThe finite planar spaces containing at least one pair of planes intersecting in exactly one ...
AbstractLet π be a generalized projective geometry and i ϵ Z+ such that some i-dimensional subspace ...
We study an analogue of Garkavi's result on proximinal subspaces of C(X) of finite codimension in th...
AbstractIn this paper we study generalizations of the following question: Is a subspace of a project...
Let S be a finite linear space for which there is a non-negative integer s such that for any two dis...
The m-subspace polytope is defined as the convex hull of the characteristic vectors of all m-dimensi...
AbstractSuppose that A is a finite set-system of N elements with the property |A ∩ A′| = 0, 1 or k f...
We assume that there is given a locally finite family of euclidean subspaces in a euclidean space. I...
AbstractIn this note, we characterize finite three-dimensional affine spaces as the only linear spac...
AbstractWe say that a normed linear space X is a R(1) space if the following holds: If Y is a closed...
AbstractIn this note, we find a sharp bound for the minimal number (or in general, indexing set) of ...
AbstractWe present an abstract matroid formulation of the geometric construction of intersecting the...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
In this paper we study sets X of points of both affine and projective spaces over the Galois field ...
AbstractApart from some trivial exceptions, a finite incidence structure is a finite projective spac...
AbstractThe finite planar spaces containing at least one pair of planes intersecting in exactly one ...
AbstractLet π be a generalized projective geometry and i ϵ Z+ such that some i-dimensional subspace ...
We study an analogue of Garkavi's result on proximinal subspaces of C(X) of finite codimension in th...
AbstractIn this paper we study generalizations of the following question: Is a subspace of a project...
Let S be a finite linear space for which there is a non-negative integer s such that for any two dis...
The m-subspace polytope is defined as the convex hull of the characteristic vectors of all m-dimensi...
AbstractSuppose that A is a finite set-system of N elements with the property |A ∩ A′| = 0, 1 or k f...
We assume that there is given a locally finite family of euclidean subspaces in a euclidean space. I...
AbstractIn this note, we characterize finite three-dimensional affine spaces as the only linear spac...
AbstractWe say that a normed linear space X is a R(1) space if the following holds: If Y is a closed...
AbstractIn this note, we find a sharp bound for the minimal number (or in general, indexing set) of ...
AbstractWe present an abstract matroid formulation of the geometric construction of intersecting the...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
In this paper we study sets X of points of both affine and projective spaces over the Galois field ...
AbstractApart from some trivial exceptions, a finite incidence structure is a finite projective spac...
AbstractThe finite planar spaces containing at least one pair of planes intersecting in exactly one ...
AbstractLet π be a generalized projective geometry and i ϵ Z+ such that some i-dimensional subspace ...
We study an analogue of Garkavi's result on proximinal subspaces of C(X) of finite codimension in th...
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