Metrizability of Mahavier products indexed by partial orders
Abstract
Let X be separable metrizable, and let f⊂eq X2 be a non-trivial relation on X. For a given partial order (P,≤), the Mahavier product M(X,f,P)⊂eq XP (also known as a generalized inverse limit) collects functions such that x(p)∈ f(x(q)) for all p≤ q. Clontz and Varagona previously showed for well orders P that M(X,f,P) is separable metrizable exactly when P is countable and f satisfies condition ; we extend this result to hold for all partial orders.
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