Reduced points of E∞-rings in positive characteristic
Abstract
We investigate whether an arbitrary non-zero E∞-ring A admits a reduced point, meaning an E∞-map A T such that πT is a graded field. We show that if 2∈ π0A is not invertible, then A admits a reduced point and as an application deduce that a free A-module on n generators cannot be built from n-1 many cells. Perhaps surprisingly, the existence of reduced points completely fails at odd primes. More precisely, for any prime p>2, we construct a non-zero E∞-ring over Fp which admits no map to an E2-algebra T such that π0T is a field.
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