Reciprocal Convex Costs for Ratio Matching: Functional-Equation Characterization and Decision Geometry

Abstract

We study ratio-induced mismatch costs of the form c(s,o)=J(S(s)/O(o)), built from positive scale maps S:S(0,∞) and O:O(0,∞) and a penalty J:(0,∞)[0,∞). Assuming inversion symmetry, strict convexity, normalization J(1)=0, and a multiplicative d'Alembert identity, we show that f(u):=1+J(eu) satisfies the additive d'Alembert equation and hence J(x)=(a x)-1=12(xa+x-a)-1 for some a>0. We then analyze the associated argmin mapping over feasible scale sets: existence under explicit subspace-closedness hypotheses, geometric-mean decision boundaries for finite dictionaries with stability away from boundaries, exact compositionality for product models, and an optimal sequential mediation principle given by a geometric mean (or its log-space projection when infeasible). The paper is purely mathematical; any semantic interpretation is optional and external to the theorems proved here.