An Alternative to Spherical Witt Vectors
Abstract
We give a direct construction of the ring spectrum of spherical Witt vectors of a perfect Fp-algebra R as the completion of the spherical monoid algebra S[R] of the multiplicative monoid (R,·) at the ideal I = fib(S[R] R). This generalizes a construction of Cuntz and Deninger. We also use this to give a description of the category of p-complete modules over the spherical Witt vectors and a universal property for spherical Witt vectors as an E1-ring.
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