Greg Martin
Published 1998-04-08Version 1
We derive an upper bound for the least number of variables needed to guarantee that a system of t quadratic forms (t>=2) over a field F has a nontrivial zero. In particular, if F is a local field, then 2t^2+3 variables insure the existence of a nontrivial zero (2t^2+1 if t is even), while if F=Q_p with p>=11, then 2t^2-2t+5 variables suffice (2t^2-2t+1 if 3 divides t). The improvement lies in a more efficient use of information on the solubility of pairs and triplets of quadratic forms, and the arguments are completely elementary.
Comments: 4 pages
Journal: Bull. London Math. Soc. 29 (1997), 385-388
Zeros of Pairs of Quadratic Forms
On Fields of dimension one that are Galois extensions of a global or local field
Fields of dimension one algebraic over a global or local field need not be of type $(C_{1})$
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