Money as Minimal Complexity

Abstract

We consider mechanisms that provide traders the opportunity to exchange commodity i for commodity j, for certain ordered pairs ij. Given any connected graph G of opportunities, we show that there is a unique mechanism MG that satisfies some natural conditions of "fairness" and "convenience". Let M(m) denote the class of mechanisms MG obtained by varying G on the commodity set \1,…,m\ . We define the complexity of a mechanism M in M(m) to be a certain pair of integers τ(M),π(M) which represent the time required to exchange i for j and the information needed to determine the exchange ratio (each in the worst case scenario, across all i≠ j). This induces a quasiorder on M(m) by the rule \[ M Mifτ(M)≤τ(M)andπ(M)≤π(M). \] We show that, for m>3, there are precisely three -minimal mechanisms MG in M(m), where G corresponds to the star, cycle and complete graphs. The star mechanism has a distinguished commodity -- the money -- that serves as the sole medium of exchange and mediates trade between decentralized markets for the other commodities. Our main result is that, for any weights λ,μ>0, the star mechanism is the unique minimizer of λτ(M)+μπ(M) on M(m) for large enough m.