AbstractFor a projective plane over a field F, we classify all asymmetric linear correlations up to equivalence under the group of all collineations. The result is derived from the finer equivalence of bilinear forms on three-dimensional spaces
A dissertation presented to the Faculty of the Graduate School of Yale University in candidacy for t...
AbstractWe define a cotangency set (in the projective plane over any field) to be a set of points th...
AbstractIn an earlier paper [3], we associated to every projective plane X of order n a certain n3-d...
AbstractFor a projective plane over a field F, we classify all asymmetric linear correlations up to ...
AbstractAs a first step towards the general classification of correlations of finite Desarguesian pl...
This report concerns the study of algebra antiautomorphisms, the case of linear antiautomorphisms ov...
AbstractThe present article represents the next step in our ongoing program of classifying the corre...
The sets of the absolute points of (possibly degenerate) polarities of a projective space are well ...
AbstractThe general structure theory of bilinear forms, as formulated by Riehm and Scharlau, is here...
AbstractThe trace takes bilinear forms over a separable field extension to certain bilinear forms ov...
Let V be a (d+1)-dimensional vector space over a field F. Sesquilinear forms over V have been largel...
AbstractCanonical matrices are given for(i)bilinear forms over an algebraically closed or real close...
AbstractThis article deals with algorithmic and structural aspects related to the computer-aided stu...
AbstractWe study a generalization of the classical correspondence between homogeneous quadratic poly...
Two-dimensional linear spaces of symmetric matrices are classified by Segre symbols. After reviewing...
A dissertation presented to the Faculty of the Graduate School of Yale University in candidacy for t...
AbstractWe define a cotangency set (in the projective plane over any field) to be a set of points th...
AbstractIn an earlier paper [3], we associated to every projective plane X of order n a certain n3-d...
AbstractFor a projective plane over a field F, we classify all asymmetric linear correlations up to ...
AbstractAs a first step towards the general classification of correlations of finite Desarguesian pl...
This report concerns the study of algebra antiautomorphisms, the case of linear antiautomorphisms ov...
AbstractThe present article represents the next step in our ongoing program of classifying the corre...
The sets of the absolute points of (possibly degenerate) polarities of a projective space are well ...
AbstractThe general structure theory of bilinear forms, as formulated by Riehm and Scharlau, is here...
AbstractThe trace takes bilinear forms over a separable field extension to certain bilinear forms ov...
Let V be a (d+1)-dimensional vector space over a field F. Sesquilinear forms over V have been largel...
AbstractCanonical matrices are given for(i)bilinear forms over an algebraically closed or real close...
AbstractThis article deals with algorithmic and structural aspects related to the computer-aided stu...
AbstractWe study a generalization of the classical correspondence between homogeneous quadratic poly...
Two-dimensional linear spaces of symmetric matrices are classified by Segre symbols. After reviewing...
A dissertation presented to the Faculty of the Graduate School of Yale University in candidacy for t...
AbstractWe define a cotangency set (in the projective plane over any field) to be a set of points th...
AbstractIn an earlier paper [3], we associated to every projective plane X of order n a certain n3-d...