The universal deformation of the Witt ring scheme

A connection between the theory of quadratic forms defined over a given field F, and the space XF of all orderings of F is developed by A. Pfister in [12]. XF can be viewed as a set of characters acting on the group F×/ΣF×2, where ΣF×2 denotes the subgroup of F× consisting of sums of squares. Namely, each ordering P ∈ XF can be identified with the characterdefined byIt follows from Pfister's result that the Witt ring of F modulo its radical is completely determined by the pair (XF, F×/ΣF×2).

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Decomposition of Witt Rings

Canadian Journal of Mathematics ◽

10.4153/cjm-1982-089-1 ◽

1982 ◽

Vol 34 (6) ◽

pp. 1276-1302 ◽

Cited By ~ 16

Author(s):

Andrew B. Carson ◽

Murray A. Marshall

Keyword(s):

Quadratic Forms ◽

Classification Problem ◽

Bilinear Forms ◽

Interesting Problem ◽

Witt Ring ◽

Witt Rings ◽

Finite Case ◽

Characteristic 2 ◽

Definition Of

We take the definition of a Witt ring to be that given in [13], i.e., it is what is called a strongly representational Witt ring in [8]. The classical example is obtained by considering quadratic forms over a field of characteristic ≠ 2 [17], but Witt rings also arise in studying quadratic forms or symmetric bilinear forms over more general types of rings [5,7, 8, 9]. An interesting problem in the theory is that of classifying Witt rings in case the associated group G is finite. The reduced case, i.e., the case where the nilradical is trivial, is better understood. In particular, the above classification problem is completely solved in this case [4, 12, or 13, Corollary 6.25]. Thus, the emphasis here is on the non-reduced case. Although some of the results given here do not require |G| < ∞, they do require some finiteness assumption. Certainly, the main goal here is to understand the finite case, and in this sense this paper is a continuation of work started by the second author in [13, Chapter 5].

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