Quadratic forms over fields of characteristic different from two are generalised to virtual forms over arbitrary fields. These objects are related to Milnor’s K-theory for fields. The connection is established by a sequence of maps corresponding to Delzant’s Stiefel–Whitney classes
Directed by Dr. Dan Yasaki. 53 pp. Let F be a real quadratic field with OF its ring of integers. Let...
Some aspects of conformal field theory over Riemann surfaces are examined. We study, in particular, ...
Abstract. We present a theory of classifying quadratic forms over an algebraic number field which is...
Quadratic forms over fields of characteristic different from two are generalised to virtual forms ov...
In this article, quadratic forms over a field of characteristic different from two are generalised t...
The main part of this thesis comprises a study of quasilinear p-forms (i.e., Fermat-type forms of de...
htmlabstractWe consider Voronoi's reduction theory of positive definite quadratic forms which is bas...
htmlabstractWe consider Voronoi's reduction theory of positive definite quadratic forms which is bas...
AbstractLet F be a field of characteristic ≠ 2 and let q be an anisotropic quadratic form over F. Th...
. Let F be a field of characteristic 6= 2 and let q be an anisotropic quadratic form over F . The f...
Some aspects of conformal field theory over Riemann surfaces are examined. We study, in particular, ...
Some aspects of conformal field theory over Riemann surfaces are examined. We study, in particular, ...
We present an adaptation of Voronoi theory for imaginary quadratic number fields of class number gre...
A number of recent results give constructions of totally real number fields of specific degrees that...
AbstractLet P(k) denote the set of equivalence classes of nonsingular pencils of quadratic forms of ...
Directed by Dr. Dan Yasaki. 53 pp. Let F be a real quadratic field with OF its ring of integers. Let...
Some aspects of conformal field theory over Riemann surfaces are examined. We study, in particular, ...
Abstract. We present a theory of classifying quadratic forms over an algebraic number field which is...
Quadratic forms over fields of characteristic different from two are generalised to virtual forms ov...
In this article, quadratic forms over a field of characteristic different from two are generalised t...
The main part of this thesis comprises a study of quasilinear p-forms (i.e., Fermat-type forms of de...
htmlabstractWe consider Voronoi's reduction theory of positive definite quadratic forms which is bas...
htmlabstractWe consider Voronoi's reduction theory of positive definite quadratic forms which is bas...
AbstractLet F be a field of characteristic ≠ 2 and let q be an anisotropic quadratic form over F. Th...
. Let F be a field of characteristic 6= 2 and let q be an anisotropic quadratic form over F . The f...
Some aspects of conformal field theory over Riemann surfaces are examined. We study, in particular, ...
Some aspects of conformal field theory over Riemann surfaces are examined. We study, in particular, ...
We present an adaptation of Voronoi theory for imaginary quadratic number fields of class number gre...
A number of recent results give constructions of totally real number fields of specific degrees that...
AbstractLet P(k) denote the set of equivalence classes of nonsingular pencils of quadratic forms of ...
Directed by Dr. Dan Yasaki. 53 pp. Let F be a real quadratic field with OF its ring of integers. Let...
Some aspects of conformal field theory over Riemann surfaces are examined. We study, in particular, ...
Abstract. We present a theory of classifying quadratic forms over an algebraic number field which is...
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