globally uniquely solvable property
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CHARACTERIZATION OF GLOBALLY-UNIQUELY-SOLVABLE PROPERTY OF A CONE-PRESERVING Z-TRANSFORMATION ON EUCLIDEAN JORDAN ALGEBRAS

Journal of applied mathematics & informatics ◽

10.14317/jami.2016.309 ◽

2016 ◽

Vol 34 (3_4) ◽

pp. 309-317 ◽

Cited By ~ 1

Author(s):

YOON J. SONG

Keyword(s):

Jordan Algebras ◽

Euclidean Jordan Algebras ◽

Globally Uniquely Solvable Property ◽

Z Transformation

STEIN LINEAR PROGRAMS OVER SYMMETRIC CONES

International Game Theory Review ◽

10.1142/s0219198913400331 ◽

2013 ◽

Vol 15 (04) ◽

pp. 1340033

Author(s):

I. JEYARAMAN ◽

K. C. SIVAKUMAR ◽

V. VETRIVEL

Keyword(s):

Linear Programming ◽

Linear Complementarity Problem ◽

Sufficient Conditions ◽

Euclidean Jordan Algebra ◽

Linear Complementarity ◽

Symmetric Cones ◽

Linear Programs ◽

Globally Uniquely Solvable Property ◽

Primal And Dual

In this paper, using Moore–Penrose inverse, we characterize the feasibility of primal and dual Stein linear programs over symmetric cones in a Euclidean Jordan algebra V. We give sufficient conditions for the solvability of the Stein linear programming problem. Further, we give a characterization of the globally uniquely solvable property for the Stein transformation in terms of a least element of a set in V in the context of the linear complementarity problem.

globally uniquely solvable propertyRecently Published Documents

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CHARACTERIZATION OF GLOBALLY-UNIQUELY-SOLVABLE PROPERTY OF A CONE-PRESERVING Z-TRANSFORMATION ON EUCLIDEAN JORDAN ALGEBRAS

STEIN LINEAR PROGRAMS OVER SYMMETRIC CONES

globally uniquely solvable property
Recently Published Documents