Add to ORKGSuppose Q is a definite quadratic form on a vector space V over some totally real field K 6 = Q. Then the maximal integral ZK-lattices in (V,Q) are locally isometric everywhere and hence form a single genus. We enu-merate all orthogonal spaces (V,Q) of dimension at least 3, where the cor-responding genus of maximal integral lattices consists of a single isometry class. It turns out, there are 471 such genera. Moreover, the dimension of V and the degree of K are bounded by 6 and 5 respectively. This classification also yields all maximal quaternion orders of type number one.
For definite quadratic lattices over the rings of integers of algebraic number fields, it is shown t...
AbstractA quaternion order derived from an integral ternary quadratic form f = Σaijxixj of discrimin...
In the late 1970s, Herbert Gross asked whether there exist fields admitting anisotropic quadratic sp...
This thesis presents a classification, up to similarity, of all single-class genera of totally defin...
Artículo de publicación ISIWe explicitly compute the largest subtree, in the local Bruhat-Tits tree ...
AbstractLet V be a definite quaternary space over Q having square discriminant. We derive an explici...
Artículo de publicación ISIWe explicitly compute the largest subtree, in the local Bruhat-Tits tree ...
AbstractH. Pfeuffer [J. Number Theory 11 (1979), 188–196] showed that totally positive quadratic for...
Abstract. Let K be a global field or Q, F a nonzero quadratic form on KN, N ≥ 2, and V a subspace of...
AbstractLet V be a definite quaternary space over Q having square discriminant. We derive an explici...
AbstractLet k be an algebraic function field of one variable X having a finite field GF(q) of consta...
In this paper we investigate integral even unimodular lattices L in a vector space with a totally po...
A quadratic form has a one-class spinor genus if its spinor genus consists of a single equivalence c...
A celebrated theorem of Cassels (1955) asserts that an integral quadratic form, which is isotropic o...
A celebrated theorem of Cassels (1955) asserts that an integral quadratic form, which is isotropic o...
For definite quadratic lattices over the rings of integers of algebraic number fields, it is shown t...
AbstractA quaternion order derived from an integral ternary quadratic form f = Σaijxixj of discrimin...
In the late 1970s, Herbert Gross asked whether there exist fields admitting anisotropic quadratic sp...
This thesis presents a classification, up to similarity, of all single-class genera of totally defin...
Artículo de publicación ISIWe explicitly compute the largest subtree, in the local Bruhat-Tits tree ...
AbstractLet V be a definite quaternary space over Q having square discriminant. We derive an explici...
Artículo de publicación ISIWe explicitly compute the largest subtree, in the local Bruhat-Tits tree ...
AbstractH. Pfeuffer [J. Number Theory 11 (1979), 188–196] showed that totally positive quadratic for...
Abstract. Let K be a global field or Q, F a nonzero quadratic form on KN, N ≥ 2, and V a subspace of...
AbstractLet V be a definite quaternary space over Q having square discriminant. We derive an explici...
AbstractLet k be an algebraic function field of one variable X having a finite field GF(q) of consta...
In this paper we investigate integral even unimodular lattices L in a vector space with a totally po...
A quadratic form has a one-class spinor genus if its spinor genus consists of a single equivalence c...
A celebrated theorem of Cassels (1955) asserts that an integral quadratic form, which is isotropic o...
A celebrated theorem of Cassels (1955) asserts that an integral quadratic form, which is isotropic o...
For definite quadratic lattices over the rings of integers of algebraic number fields, it is shown t...
AbstractA quaternion order derived from an integral ternary quadratic form f = Σaijxixj of discrimin...
In the late 1970s, Herbert Gross asked whether there exist fields admitting anisotropic quadratic sp...