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Smart Contract Adoption in Derivative Markets under Bounded Risk: An Optimization Approach

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  • Jinho Cha
  • Long Pham
  • Thi Le Hoa Vo
  • Jaeyoung Cho
  • Jaejin Lee

Abstract

This study develops and analyzes an optimization model of smart contract adoption under bounded risk, linking structural theory with simulation and real-world validation. We examine how adoption intensity alpha is structurally pinned at a boundary solution, invariant to variance and heterogeneity, while profitability and service outcomes are variance-fragile, eroding under volatility and heavy-tailed demand. A sharp threshold in the fixed cost parameter A3 triggers discontinuous adoption collapse (H1), variance shocks reduce profits monotonically but not adoption (H2), and additional results on readiness heterogeneity (H3), profit-service co-benefits (H4), and distributional robustness (H5) confirm the duality between stable adoption and fragile payoffs. External validity checks further establish convergence of sample average approximation at the canonical O(1/sqrt(N)) rate (H6). Empirical validation using S&P 500 returns and the MovieLens100K dataset corroborates the theoretical structure: bounded and heavy-tailed distributions fit better than Gaussian models, and profits diverge across volatility regimes even as adoption remains stable. Taken together, the results demonstrate that adoption choices are robust to uncertainty, but their financial consequences are highly fragile. For operations and finance, this duality underscores the need for risk-adjusted performance evaluation, option-theoretic modeling, and distributional stress testing in strategic investment and supply chain design.

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  • Jinho Cha & Long Pham & Thi Le Hoa Vo & Jaeyoung Cho & Jaejin Lee, 2025. "Smart Contract Adoption in Derivative Markets under Bounded Risk: An Optimization Approach," Papers 2510.07006, arXiv.org.
    • Handle: RePEc:arx:papers:2510.07006
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