A recently found local-global principle for quadratic forms over function fields of curves over a complete discretely valued field is applied to the study of quadratic forms, sums of squares, and related field invariants
We consider local-global principles for rational points on varieties, in particular torsors, over on...
" p-adic fields provide remarkable, easy and natural solutions to problems which apparently have no ...
Let K be a (non-archimedean) local field and let F be the function field of a curve over K. Let D be...
A recently found local-global principle for quadratic forms over function fields of curves over a co...
We study sums of squares, quadratic forms, and related field invariants in a quadratic extension of ...
We study sums of squares, quadratic forms, and related field invariants in a quadratic extension of ...
We study sums of squares in algebraic function fields over formally real fields, in particular the a...
We study sums of squares in algebraic function fields over formally real fields, in particular the a...
We study sums of squares in algebraic function fields over formally real fields, in particular the a...
A new local-global principle for existence of non-trivial units in quadratic functional fields is pr...
The Hasse-Minkowski theorem says that a quadratic form over a global field admits a nontrivial zero ...
The Hasse-Minkowski theorem says that a quadratic form over a global field admits a nontrivial zero ...
AbstractWe develop some of the theory of automorphic forms in the function field setting. As an appl...
Abstract. This paper provides applications of patching to qua-dratic forms and central simple algebr...
We consider local-global principles for rational points on varieties, in particular torsors, over on...
We consider local-global principles for rational points on varieties, in particular torsors, over on...
" p-adic fields provide remarkable, easy and natural solutions to problems which apparently have no ...
Let K be a (non-archimedean) local field and let F be the function field of a curve over K. Let D be...
A recently found local-global principle for quadratic forms over function fields of curves over a co...
We study sums of squares, quadratic forms, and related field invariants in a quadratic extension of ...
We study sums of squares, quadratic forms, and related field invariants in a quadratic extension of ...
We study sums of squares in algebraic function fields over formally real fields, in particular the a...
We study sums of squares in algebraic function fields over formally real fields, in particular the a...
We study sums of squares in algebraic function fields over formally real fields, in particular the a...
A new local-global principle for existence of non-trivial units in quadratic functional fields is pr...
The Hasse-Minkowski theorem says that a quadratic form over a global field admits a nontrivial zero ...
The Hasse-Minkowski theorem says that a quadratic form over a global field admits a nontrivial zero ...
AbstractWe develop some of the theory of automorphic forms in the function field setting. As an appl...
Abstract. This paper provides applications of patching to qua-dratic forms and central simple algebr...
We consider local-global principles for rational points on varieties, in particular torsors, over on...
We consider local-global principles for rational points on varieties, in particular torsors, over on...
" p-adic fields provide remarkable, easy and natural solutions to problems which apparently have no ...
Let K be a (non-archimedean) local field and let F be the function field of a curve over K. Let D be...
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