On Polyhedral Approximations of the Second-Order Cone

Aharon Ben-Tal
Aharon Ben-Tal
[email protected]
Faculty of Industrial Engineering and Management, Technion—Israel Institute of Technology, Haifa 32000, Israel
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,
Arkadi Nemirovski
Arkadi Nemirovski
[email protected]
Faculty of Industrial Engineering and Management, Technion—Israel Institute of Technology, Haifa 32000, Israel
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Aharon Ben-Tal

[email protected]

Faculty of Industrial Engineering and Management, Technion—Israel Institute of Technology, Haifa 32000, Israel

Search for more papers by this author

Arkadi Nemirovski

[email protected]

Faculty of Industrial Engineering and Management, Technion—Israel Institute of Technology, Haifa 32000, Israel

Search for more papers by this author

Published Online:1 May 2001https://doi.org/10.1287/moor.26.2.193.10561

Abstract

We demonstrate that a conic quadratic problem,

(CQP) \min_{x} {e^{T} x {| Ax \geq b, | A_{ℓ} x - b_{ℓ} |}_{2} \leq c_{ℓ}^{T} x - d_{ℓ}, ℓ = 1, \dots, m}, {| y |}_{2} = \sqrt{y^{T} y} .

is “polynomially reducible” to Linear Programming. We demonstrate this by constructing, for every ϵ ∈ (0, ½], an LP program (explicitly given in terms of ϵ and the data of (CQP))

(LP) min_{x, u} {e^{T} x | P (\begin{matrix} x \\ u \end{matrix}) + p \geq 0}

with the following properties:

the number dim x + dim u of variables and the number dim p of constraints in (LP) do not exceed
$O (1) [dim x + dim b + \sum_{ℓ = 1}^{m} dim b_{ℓ}] ln \frac{1}{ϵ};$
every feasible solution x to (CQP) can be extended to a feasible solution (x, u) to (LP);
if (x, u) is feasible for (LP), then x satisfies the “ϵ-relaxed” constraints of (CQP), namely,
$Ax \geq b, {‖ A_{ℓ} x - b_{ℓ} ‖}_{2} \leq (1 + ϵ) [c_{ℓ}^{T} x - d_{ℓ}], ℓ = 1, \dots, m .$

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cover image Mathematics of Operations Research

Volume 26, Issue 2

May 2001

Pages 193-445

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Received:July 02, 1999
Published Online:May 01, 2001

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Aharon Ben-Tal, Arkadi Nemirovski, (2001) On Polyhedral Approximations of the Second-Order Cone. Mathematics of Operations Research 26(2):193-205.

https://doi.org/10.1287/moor.26.2.193.10561

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On Polyhedral Approximations of the Second-Order Cone

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Volume 26, Issue 2

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