Abstract
For certain types of quadratic forms lying in the n-th power of the fundamental ideal, we compute upper bounds and if possible exact values for the minimal number of general n-fold Pfister forms, that are needed to write the Witt class of that given form as the sum of the Witt classes of those n-fold Pfister forms. We restrict ourselves mostly to the case of so called rigid fields, i.e. fields in which anisotropic binary forms represent at most 2 square classes.
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