Bansal, ManishZhang, Yingqiu2022-02-132022-02-132021-01-220925-5001http://hdl.handle.net/10919/108329In this paper, we derive (partial) convex hull for deterministic multi-constraint polyhedral conic mixed integer sets with multiple integer variables using conic mixed integer rounding (CMIR) cut-generation procedure of Atamtürk and Narayanan (Math Prog 122:1–20, 2008), thereby extending their result for a simple polyhedral conic mixed integer set with single constraint and one integer variable. We then introduce two-stage stochastic p-order conic mixed integer programs (denoted by TSS-CMIPs) in which the second stage problems have sum of lp-norms in the objective function along with integer variables. First, we present sufficient conditions under which the addition of scenario-based nonlinear cuts in the extensive formulation of TSS-CMIPs is sufficient to relax the integrality restrictions on the second stage integer variables without impacting the integrality of the optimal solution of the TSS-CMIP. We utilize scenario-based CMIR cuts for TSS-CMIPs and their distributionally robust generalizations with structured CMIPs in the second stage, and prove that these cuts provide conic/linear programming equivalent or approximation for the second stage CMIPs. We also perform extensive computational experiments by solving stochastic and distributionally robust capacitated facility location problem and randomly generated structured TSS-CMIPs with polyhedral CMIPs and second-order CMIPs in the second stage, i.e. p= 1 and p= 2 , respectively. We observe that there is a significant reduction in the total time taken to solve these problems after adding the scenario-based cuts.Pages 391-43343 page(s)application/pdfenIn CopyrightOperations Research & Management ScienceMathematics, AppliedMathematicsTwo-stage stochastic p-order conic mixed integer programScenario-based cutting planesTwo-stage distributionally robust program(Partial) convex hullConic mixed integer roundingMulti-module capacitated facility locationINEQUALITIES FACETSVALID INEQUALITIESALGORITHMDECOMPOSITIONOPTIMIZATIONFORMULATIONSRECOURSESETOperations Research0102 Applied Mathematics0103 Numerical and Computational Mathematics0802 Computation Theory and MathematicsScenario-based cuts for structured two-stage stochastic and distributionally robust p-order conic mixed integer programsArticle - Refereed2022-02-13Journal of Global Optimizationhttps://doi.org/10.1007/s10898-020-00986-w8121573-2916