A new Lagrangean approach to the pooling problem

Almutairi, Hossa; Elhedhli, Samir

doi:10.1007/s10898-008-9371-1

Cited by 22 publications

(16 citation statements)

References 19 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Nonconvex bilinear terms in the standard pooling problem arise from tracking the levels of linearlyblending fuel qualities about the pooling nodes to meet constraints on the composition of the final products [Visweswaran, 2009]. Among the many notable contributions towards solving the standard pooling problem [Adhya et al, 1999, Almutairi and Elhedhli, 2009, Audet et al, 2004, Ben-Tal et al, 1994, Chakraborty, 2009, Quesada and Grossmann, 1995, Foulds et al, 1992, Greenberg, 1995, Haverly, 1978, Lasdon et al, 1979, Lodwick, 1992, Pham et al, 2009, Tawarmalani and Sahinidis, 2002, the most directly relevant to the work presented in this paper and the computational tool APOGEE are those of: Floudas and Visweswaran , who were the first to rigorously solve the pooling problem to global optimality; Foulds et al [1992], who developed a linear relaxation of the QCQP by replacing each bilinear term with their convex and concave hulls [Al-Khayyal andFalk, 1983, McCormick, 1976]; Ben-Tal et al [1994], who introduced an alternative q-formulation of the pooling problem that often has fewer nonconvex bilinear terms than the original p-formulation [Audet et al, 2004]; and Tawarmalani and Sahinidis [2002], who showed that augmenting the q-formulation with reformulation-linearization technique cuts Adams, 1999, Sherali andAlameddine, 1992] proposed by Quesada and Grossmann [1995] produces a linear relaxation of the pooling problem that strictly dominates both the p-and q-formulations. Depending on the formulation, the standard pooling problem can be classified as a linear objective with quadratic constraints (p-formulation) or a quadratic objective with quadratic constraints (q-and pq-formulations).…”

Section: Literature Reviewmentioning

confidence: 99%

APOGEE: Global optimization of standard, generalized, and extended pooling problems via linear and logarithmic partitioning schemes

Misener

Thompson

Floudas

2011

Computers & Chemical Engineering

115

View full text Add to dashboard Cite

Section: Literature Reviewmentioning

confidence: 99%

APOGEE: Global optimization of standard, generalized, and extended pooling problems via linear and logarithmic partitioning schemes

Misener

Thompson

Floudas

2011

Computers & Chemical Engineering

115

View full text Add to dashboard Cite

“…, M} Major applications of MIQCQP include quality blending in process networks, separating objects in computational geometry, and portfolio optimization in finance. Specific instantiations of MIQCQP in process networks optimization problems include: pooling problems [5,12,20,28,53,65,66,67,79,93,97,98,100,101,107,137,139], distillation sequences [8,54,58], wastewater treatment and total water systems [9,13,22,29,50,62,71,73,108,109], hybrid energy systems [23,24,49], heat exchanger networks [39,56], reactorseparator-recycle systems [75,76], separation systems [119], data reconciliation [115], batch processes [86], crude oil scheduling [78,80,81,104,103], and natural gas production [82,…”

mentioning

confidence: 99%

GloMIQO: Global mixed-integer quadratic optimizer

2012

View full text Add to dashboard Cite

This paper introduces the Global Mixed-Integer Quadratic Optimizer, GloMIQO, a numerical solver addressing mixed-integer quadratically-constrained quadratic programs (MIQCQP) to ε-global optimality. The algorithmic components are presented for: reformulating user input, detecting special structure including convexity and edge-concavity, generating tight convex relaxations, partitioning the search space, bounding the variables, and finding good feasible solutions. To demonstrate the capacity of GloMIQO, we extensively tested its performance on a test suite of 399 problems of diverse size and structure. The test cases are taken from process networks applications, computational geometry problems, GLOBALLib, MINLPLib, and the Bonmin test set. We compare the performance of GloMIQO with respect to four state-of-the-art global optimization solvers: BARON 10.1.2,

show abstract

“…Constraint (11), on the other hand, ensures that at every pool, the total incoming flow originating from an input must equal the total outgoing flow originating from the same input. In fact, using (10) and (13), we can show that (11) implies (1):…”

Section: Input Commodities: Mcf-i-(p)q-formulationmentioning

confidence: 97%

“…(11) can be viewed as a disaggregated flow conservation constraint. Note that (1) ensures that at every pool, the total incoming flow must equal the total outgoing flow, regardless of the origin of the flows.…”

Section: Input Commodities: Mcf-i-(p)q-formulationmentioning

confidence: 99%

New multi-commodity flow formulations for the pooling problem

2016

View full text Add to dashboard Cite

The pooling problem is a nonconvex nonlinear programming problem with numerous applications. The nonlinearities of the problem arise from bilinear constraints that capture the blending of raw materials. Bilinear constraints are well-studied and significant progress has been made in solving large instances of the pooling problem to global optimality. This is due in no small part to reformulations of the problem. Recently, Alfaki and Haugland proposed a multi-commodity flow formulation of the pooling problem based on input commodities. The authors proved that the new formulation has a stronger linear relaxation than previously known formulations. They also provided computational results which show that the new formulation outperforms previously known formulations when used in a global optimization solver. In this paper, we generalize their ideas and propose new multi-commodity flow formulations based on output, input and output and (input, output)-commodities. We prove the equivalence of formulations, and we study the partial order of formulations with respect to the strength of their LP relaxations. In an extensive computational study, we evaluate the performance of the new formulations. We study the trade-off between disaggregating commodities and therefore increasing the size of formulations versus strengthening the relaxed linear programs and improving the computational performance of the nonlinear programs. We provide computational results which show that output commodities often outperform input commodities, and that disaggregating commodities further only marginally strengthens the linear relaxations. In fact, smaller formulations often show a significantly better performance when used in a global optimization solver.

show abstract

A new Lagrangean approach to the pooling problem

Cited by 22 publications

References 19 publications

APOGEE: Global optimization of standard, generalized, and extended pooling problems via linear and logarithmic partitioning schemes

APOGEE: Global optimization of standard, generalized, and extended pooling problems via linear and logarithmic partitioning schemes

GloMIQO: Global mixed-integer quadratic optimizer

New multi-commodity flow formulations for the pooling problem

Contact Info

Product

Resources

About