Bounds for the representation of quadratic forms
[摘要] We prove first that, for fixed integers n, m greater than or equal to 1, there is a uniform bound on the number of Pfister forms of degree n over any Pythagorean field F necessary to represent (in the Witt ring of F) any form of dimension m as a linear combination of such forms with non-zero coefficients in F. Uniform means that the bound does not depend either on the form or on the field F; it is given by a recursive function f of n and m. Similar results hold for the reduced special groups arising from preordered fields and from fields whose Pythagoras number is bounded by a fixed integer. We single out a large class of Pythagorean fields and, more generally, of reduced special groups (cf. [4]) for which f has a simply exponential bound of the form cm(n-1) (c a constant). Such a class is closed under certain-possibly infinitary-operations which preserve Marshall's signature conjecture. In the case of groups of finite stability index s, we obtain an upper bound for f which is quadratic on [m/2(n)], where c depends on s. (C) 2003 Elsevier Inc. All rights reserved.
[发布日期] 2003-10-01 [发布机构]
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