Qualitative sensitivity analysis in monotropic programming
Qualitative sensitivity analysis in monotropic programming
Optimal selections are parameter-dependent optimal solutions of parametric optimization problems whose properties can be used in sensitivity analysis. Here we present a qualitative theory of sensitivity analysis for linearly-constrained convex separable (i.e., monotropic) parametric optimization problems. Three qualitative sensitivity analysis results previously derived for network flows are extended to monotropic problems: The Ripple and Smoothing Theorems give upper bounds on the magnitude of optimal-variable variations as a function of variations in the problem parameter(s), the theory of substitutes and complements provides necessary and sufficient conditions for optimal-variable changes to consistently have the same (or the opposite) sign(s) in two given variables, and the Monotonicity Theorem links changes in the value of the parameters to changes in optimal decision variables. We introduce a class of optimal selections for which these results hold, thereby answering a long-standing question due to Granot and Veinott (1985) with a simple and elegant method. Although a number of results are known to depend on the resolution of NP-complete problems, easily computable nonnetwork classes of monotropic problems such as unimodular systems of constraints emerge in the light of the present approach.
695-707
Gautier, A.
de6930f6-dcc4-424c-809a-7ececc8d5a6d
Granot, F.
429b0dba-839b-413f-8d3e-1835ce10bb79
Zheng, H.
22605265-1a2f-4a65-b86d-b7f1e73c3fc9
1998
Gautier, A.
de6930f6-dcc4-424c-809a-7ececc8d5a6d
Granot, F.
429b0dba-839b-413f-8d3e-1835ce10bb79
Zheng, H.
22605265-1a2f-4a65-b86d-b7f1e73c3fc9
Gautier, A., Granot, F. and Zheng, H.
(1998)
Qualitative sensitivity analysis in monotropic programming.
Mathematics of Operations Research, 23 (3), .
Abstract
Optimal selections are parameter-dependent optimal solutions of parametric optimization problems whose properties can be used in sensitivity analysis. Here we present a qualitative theory of sensitivity analysis for linearly-constrained convex separable (i.e., monotropic) parametric optimization problems. Three qualitative sensitivity analysis results previously derived for network flows are extended to monotropic problems: The Ripple and Smoothing Theorems give upper bounds on the magnitude of optimal-variable variations as a function of variations in the problem parameter(s), the theory of substitutes and complements provides necessary and sufficient conditions for optimal-variable changes to consistently have the same (or the opposite) sign(s) in two given variables, and the Monotonicity Theorem links changes in the value of the parameters to changes in optimal decision variables. We introduce a class of optimal selections for which these results hold, thereby answering a long-standing question due to Granot and Veinott (1985) with a simple and elegant method. Although a number of results are known to depend on the resolution of NP-complete problems, easily computable nonnetwork classes of monotropic problems such as unimodular systems of constraints emerge in the light of the present approach.
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Published date: 1998
Organisations:
Operational Research
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Local EPrints ID: 29664
URI: http://eprints.soton.ac.uk/id/eprint/29664
ISSN: 0364-765X
PURE UUID: 950123df-dfb0-498b-b10e-f2a98e228662
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Date deposited: 14 Mar 2007
Last modified: 08 Jan 2022 03:51
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Author:
A. Gautier
Author:
F. Granot
Author:
H. Zheng
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