AbstractLet (F, p) be a quadratic ramified extension of the field Q2 of 2-adic numbers, with D its ring of integers and u the group of units of D. Let L be a regular n-ary quadratic lattice over D with n ≥ 3 and sL ⊆ D. A lower bound is obtained for ordpdL when u ⊈ θ(O+ (L)). This yields a sufficient condition for the class number of an indefinite quadratic form over the ring of integers of a quadratic number field to be a divisor of the class number of the field
It is known that classes of indefinite quadratic forms in a genus are classified by the Galois group...
AbstractLet f be an integral quadratic form in three or more variables and g any form in the genus o...
A positive definite ternary integral quadratic form is called regular if it represents all the posit...
AbstractLet (F, p) be a quadratic ramified extension of the field Q2 of 2-adic numbers, with D its r...
Integral spinor norms in dyadic local fields II by Fei Xu (Hefei) In the previous paper [X] we have ...
The spinor norms of the integral rotations on the modular quadratic forms over a local field, which ...
AbstractThe spinor norms of integral rotations on modular quadratic forms over a local field of char...
AbstractThe spinor norms of integral rotations of an arbitrary quadratic lattice over an arbitrary d...
Artículo de publicación ISIWe complete all local spinor norm computations for quater-nionic skew-her...
Artículo de publicación ISIWe complete all local spinor norm computations for quater-nionic skew-her...
AbstractThe spinor norms of integral rotations of an arbitrary quadratic lattice over an arbitrary d...
AbstractLetFbe a quadratic extension of Q and OFthe ring of integers inF. A result of Tate enables o...
AbstractThe spinor norms of integral rotations on modular quadratic forms over a local field of char...
It is our basic question to study the following Diophantine equations (1.1) tXAX = B over the ring o...
We prove Knebusch’s Norm Principle for finite extensions of semi-local regular rings containing a fi...
It is known that classes of indefinite quadratic forms in a genus are classified by the Galois group...
AbstractLet f be an integral quadratic form in three or more variables and g any form in the genus o...
A positive definite ternary integral quadratic form is called regular if it represents all the posit...
AbstractLet (F, p) be a quadratic ramified extension of the field Q2 of 2-adic numbers, with D its r...
Integral spinor norms in dyadic local fields II by Fei Xu (Hefei) In the previous paper [X] we have ...
The spinor norms of the integral rotations on the modular quadratic forms over a local field, which ...
AbstractThe spinor norms of integral rotations on modular quadratic forms over a local field of char...
AbstractThe spinor norms of integral rotations of an arbitrary quadratic lattice over an arbitrary d...
Artículo de publicación ISIWe complete all local spinor norm computations for quater-nionic skew-her...
Artículo de publicación ISIWe complete all local spinor norm computations for quater-nionic skew-her...
AbstractThe spinor norms of integral rotations of an arbitrary quadratic lattice over an arbitrary d...
AbstractLetFbe a quadratic extension of Q and OFthe ring of integers inF. A result of Tate enables o...
AbstractThe spinor norms of integral rotations on modular quadratic forms over a local field of char...
It is our basic question to study the following Diophantine equations (1.1) tXAX = B over the ring o...
We prove Knebusch’s Norm Principle for finite extensions of semi-local regular rings containing a fi...
It is known that classes of indefinite quadratic forms in a genus are classified by the Galois group...
AbstractLet f be an integral quadratic form in three or more variables and g any form in the genus o...
A positive definite ternary integral quadratic form is called regular if it represents all the posit...
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