Profinite tensor powers

Abstract

We discuss the problem of defining a tensor product of profinitely many copies of a vector space V, and propose a definition Xmcc V in the special situation that (1) V is finite-dimensional over F2, and (2) the profinite X indexing the tensor factors is acted on with finitely many orbits by a pro-2-group. The "mcc" on the tensor sign stands for "magnetized and conditionally convergent." A variant construction makes sense when V is a bimodule over a ring of the form F2 × ·s × F2, and the index set X has the profinite version of a cyclic order. The definition organizes some computations in Heegaard Floer homology: it can be pitched as a computation of the Heegaard Floer theory of some pro-3-manifolds, though we do not know how to define such a thing.