An MDL-Style Cost Functional KC, Distribution-Preserving Reductions (A2d), and an AC0+log Lower Bound for 3SAT via Balanced 3XOR

Abstract

We introduce a model-agnostic MDL-style cost functional KC for resource-bounded classifiers and prove a Total-Variation stable reduction lemma (A2d) for distribution-preserving many-to-one reductions. On a balanced distribution of random 3XOR instances (with co-rank t'=(n)) we obtain a size-aware lower bound against P-uniform AC0+log models: [M=] 12 + s(N)(-αd mc/d) with an absolute c ∈ (0,1) (e.g., c=1/3 gives βd=1/(3d)). A deterministic, injective 3XOR->3SAT translation (four 3-clauses per XOR, no auxiliaries) is δ=0 measure-preserving on its image window; by A2d the bound transfers to 3SAT. This yields, to our knowledge, the first explicit KC-reading of such size-aware bounds under a δ=0 measure-preserving reduction in small-depth circuit lower bounds. We provide artifacts (generator -> DIMACS -> verification) with match-rate 1.0.