Proof-Carrying No-Arbitrage Surfaces: Constructive PCA-Smolyak Meets Chain-Consistent Diffusion with c-EMOT Certificates
Abstract
We study the construction of SPX--VIX (multi product) option surfaces that are simultaneously free of static arbitrage and dynamically chain consistent across maturities. Our method unifies constructive PCA--Smolyak approximation and a chain consistent diffusion model with a tri marginal, martingale constrained entropic OT (c EMOT) bridge on a single yardstick . We provide computable certificates with explicit constant dependence: a strong convexity lower bound μhat controlled by the whitened kernel Gram's λ, the entropic strength , and a martingale moment radius; solver correctness via and geometric decay ; and a 1-Lipschitz metric projection guaranteeing Dupire/Greeks stability. Finally, we report an end to end log additive risk bound and a Gate V2 decision protocol that uses tolerance bands (from α mixing concentration) and tail robust summaries, under which all tests pass: for example =\ ( 4!\!×\!10-2), =\ ( 1.05), empirical Lipschitz \!\!1.01, and Dupire nonincrease certificate =True.
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