P-split formulations: A class of intermediate formulations between big-M and convex hull for disjunctive constraints

Abstract: We develop a class of mixed-integer formulations for disjunctive constraints intermediate to the big-M and convex hull formulations in terms of relaxation strength. The main idea is to capture the best of both the big-M and convex hull formulations: a computationally light formulation with a tight relaxation. The "P -split" formulations are based on a lifted transformation that splits convex additively separable constraints into P partitions and forms the convex hull of the linearized and partitioned disjuncti… Show more

“…This will include GDP solvers that implement the other solution techniques described in Section 2.4. Future work also involves extending the list of suported reformulation techniques to include the P-Split [19] and True-False [1] reformulations.…”

DisjunctiveProgramming.jl: Generalized Disjunctive Programming Models and Algorithms for JuMP

“…This will include GDP solvers that implement the other solution techniques described in Section 2.4. Future work also involves extending the list of suported reformulation techniques to include the P-Split [19] and True-False [1] reformulations.…”

DisjunctiveProgramming.jl: Generalized Disjunctive Programming Models and Algorithms for JuMP

“…, m} are given data and F is the feasible region. Problem (1) includes the least trimmed squares as a special case, which is a focus of this paper and discussed at length in §1.1, but also includes regression trees [17] (where 1 − z i = 1 indicates that a given datapoint is routed to a given leaf), regression problems with mismatched data [38] (where variables z indicate the datapoint/response pairs) and k-means [33] (where variables z represent assignment of datapoints to clusters). We point out that few or no mixed-integer optimization (MIO) approaches exist in the literature for (1), as the problems are notoriously hard to solve to optimality, and heuristics are preferred in practice.…”

Outlier Detection in Time Series via Mixed-Integer Conic Quadratic Optimization