Add to ORKGhtmlabstractWe consider Voronoi's reduction theory of positive definite quadratic forms which is based on Delone subdivision. We extend it to forms and Delone subdivisions having a prescribed symmetry group. Even more general, the theory is developed for forms which are restricted to a linear subspace in the space of quadratic forms. We apply the new theory to complete the classification of totally real thin algebraic number fields which was recently initiated by Bayer-Fluckiger and Nebe. Moreover, we apply it to construct new best known sphere coverings in dimensions 9,..., 15
We consider the problem subject to where is positive definite or positive semi-definite. Variants o...
A reduction theory is developed for binary forms (homoge-neous polynomials) of degrees three and fou...
We prove that the singular locus of the moduli stack Perf given by the perfect cone or first Voronoi...
htmlabstractWe consider Voronoi's reduction theory of positive definite quadratic forms which is bas...
Starting from classical arithmetical questions on quadratic forms, this book takes the reader step b...
AbstractHurwitz developed a reduction theory for real binary quadratic forms of positive discriminan...
We present an adaptation of Voronoi theory for imaginary quadratic number fields of class number gre...
The main purpose of the reduction theory is to construct a fundamental domain of the unimodular grou...
In this article, quadratic forms over a field of characteristic different from two are generalised t...
Directed by Dr. Dan Yasaki. 53 pp. Let F be a real quadratic field with OF its ring of integers. Let...
Quadratic forms over fields of characteristic different from two are generalised to virtual forms ov...
Quadratic forms over fields of characteristic different from two are generalised to virtual forms ov...
Abstract. We present a theory of classifying quadratic forms over an algebraic number field which is...
A well known theorem of Voronoi caracterizes extreme quadratic forms and Euclidean lattices, that is...
A reduction theory is developed for binary forms (homogeneous polynomials) of degrees three and four...
We consider the problem subject to where is positive definite or positive semi-definite. Variants o...
A reduction theory is developed for binary forms (homoge-neous polynomials) of degrees three and fou...
We prove that the singular locus of the moduli stack Perf given by the perfect cone or first Voronoi...
htmlabstractWe consider Voronoi's reduction theory of positive definite quadratic forms which is bas...
Starting from classical arithmetical questions on quadratic forms, this book takes the reader step b...
AbstractHurwitz developed a reduction theory for real binary quadratic forms of positive discriminan...
We present an adaptation of Voronoi theory for imaginary quadratic number fields of class number gre...
The main purpose of the reduction theory is to construct a fundamental domain of the unimodular grou...
In this article, quadratic forms over a field of characteristic different from two are generalised t...
Directed by Dr. Dan Yasaki. 53 pp. Let F be a real quadratic field with OF its ring of integers. Let...
Quadratic forms over fields of characteristic different from two are generalised to virtual forms ov...
Quadratic forms over fields of characteristic different from two are generalised to virtual forms ov...
Abstract. We present a theory of classifying quadratic forms over an algebraic number field which is...
A well known theorem of Voronoi caracterizes extreme quadratic forms and Euclidean lattices, that is...
A reduction theory is developed for binary forms (homogeneous polynomials) of degrees three and four...
We consider the problem subject to where is positive definite or positive semi-definite. Variants o...
A reduction theory is developed for binary forms (homoge-neous polynomials) of degrees three and fou...
We prove that the singular locus of the moduli stack Perf given by the perfect cone or first Voronoi...