The p-metrization of functors with finite supports

Abstract

Let p∈[1,∞] and F:SetSet be a functor with finite supports in the category Set of sets. Given a non-empty metric space (X,dX), we introduce the distance dpFX on the functor-space FX as the largest distance such that for every n∈ N and a∈ Fn the map Xn FX, f Ff(a), is non-expanding with respect to the p-metric dpXn on Xn. We prove that the distance dpFX is a pseudometric if and only if the functor F preserves singletons; dpFX is a metric if F preserves singletons and one of the following conditions holds: (1) the metric space (X,dX) is Lipschitz disconnected, (2) p=1, (3) the functor F has finite degree, (4) F preserves supports. We prove that for any Lipschitz map f:(X,dX) (Y,dY) between metric spaces the map Ff:(FX,dpFX) (FY,dpFY) is Lipschitz with Lipschitz constant Lip(Ff) Lip(f). If the functor F is finitary, has finite degree (and preserves supports), then F preserves uniformly continuous function, coarse functions, coarse equivalences, asymptotically Lipschitz functions, quasi-isometries (and continuous functions). For many dimension functions we prove the formula FpX(F)· X. Using injective envelopes, we introduce a modification dpFX of the distance dpFX and prove that the functor Fp:DistDist, Fp:(X,dX) (FX, dpFX), in the category Dist of distance spaces preserves Lipschitz maps and isometries between metric spaces.