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S-Convexity and Gross Substitutability

Author

Listed:
  • Xin Chen

    (H. Milton Stewart School of Industrial and Systems Engineering, Georgia Institute of Technology, Atlanta, Georgia 30332)

  • Menglong Li

    (Department of Management Sciences, City University of Hong Kong, Hong Kong)

Abstract

We propose a new concept of S-convex functions (and its variant, semistrictly quasi-S- (SSQS)-convex functions) to study substitute structures in economics and operations models with continuous variables. We develop a host of fundamental properties and characterizations of S-convex functions, including various preservation properties, conjugate relationships with submodular and convex functions, and characterizations using Hessians. For a divisible market, we show that the utility function satisfies gross substitutability if and only if it is S-concave under mild regularity conditions. In a parametric maximization model with a box constraint, we show that the set of optimal solutions is nonincreasing in the parameters if the objective function is (SSQS-) S-concave. Furthermore, we prove that S-convexity is necessary for the property of nonincreasing optimal solutions under some conditions. Our monotonicity result is applied to analyze two notable inventory models: a single-product inventory model with multiple unreliable suppliers and a classic multiproduct dynamic inventory model with lost sales.

Suggested Citation

  • Xin Chen & Menglong Li, 2024. "S-Convexity and Gross Substitutability," Operations Research, INFORMS, vol. 72(3), pages 1242-1254, May.
    • Handle: RePEc:inm:oropre:v:72:y:2024:i:3:p:1242-1254
    DOI: 10.1287/opre.2022.2394
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