"Semidefinite programming"의 두 판 사이의 차이
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# Semidefinite programming has been used in the optimization of complex systems.<ref name="ref_ab40" /> | # Semidefinite programming has been used in the optimization of complex systems.<ref name="ref_ab40" /> | ||
# We hope that our algorithm and techniques open the door to improved solvers for positive semidefinite programming and its applications.<ref name="ref_eb8a">[https://dl.acm.org/doi/10.1145/3357713.3384338 Positive semidefinite programming: mixed, parallel, and width-independent]</ref> | # We hope that our algorithm and techniques open the door to improved solvers for positive semidefinite programming and its applications.<ref name="ref_eb8a">[https://dl.acm.org/doi/10.1145/3357713.3384338 Positive semidefinite programming: mixed, parallel, and width-independent]</ref> | ||
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# We focus on readers with a basic background in continuous Optimization, but without a previous knowledge in Semidefinite Programming.<ref name="ref_f2a9">[https://www.scielo.br/scielo.php?script=sci_arttext&pid=S0101-74382014000300495 LINEAR AND NONLINEAR SEMIDEFINITE PROGRAMMING]</ref> | # We focus on readers with a basic background in continuous Optimization, but without a previous knowledge in Semidefinite Programming.<ref name="ref_f2a9">[https://www.scielo.br/scielo.php?script=sci_arttext&pid=S0101-74382014000300495 LINEAR AND NONLINEAR SEMIDEFINITE PROGRAMMING]</ref> | ||
# A short overview on the theoretical and algorithmic results in the case of nonlinear semidefinite programming is also given.<ref name="ref_f2a9" /> | # A short overview on the theoretical and algorithmic results in the case of nonlinear semidefinite programming is also given.<ref name="ref_f2a9" /> | ||
2020년 12월 17일 (목) 05:16 판
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- Semidefinite Programming is a rapidly emerging area of mathematical programming.[1]
- Semidefinite programming is a relatively new field of optimization which is of growing interest for several reasons.[2]
- Semidefinite programming has been used in the optimization of complex systems.[2]
- We hope that our algorithm and techniques open the door to improved solvers for positive semidefinite programming and its applications.[3]
- We focus on readers with a basic background in continuous Optimization, but without a previous knowledge in Semidefinite Programming.[4]
- A short overview on the theoretical and algorithmic results in the case of nonlinear semidefinite programming is also given.[4]
- The linear semidefinite programming can be intended as linear programming over the cone of positive semidefinite matrices.[4]