p-adic dimensions in symmetric tensor categories in characteristic p
Abstract
To every object X of a symmetric tensor category over a field of characteristic p>0 we attach p-adic integers Dim+(X) and Dim-(X) whose reduction modulo p is the categorical dimension dim(X) of X, coinciding with the usual dimension when X is a vector space. We study properties of Dim(X), and in particular show that they don't always coincide with each other, and can take any value in Zp. We also discuss the connection of p-adic dimensions with the theory of λ-rings and Brauer characters.
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