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Fenchel's duality theorem
Known as:
Fenchel-Rockafellar duality
, Fenche duality
, Fenchel-Rockafellar duality theorem
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In mathematics, Fenchel's duality theorem is a result in the theory of convex functions named after Werner Fenchel. Let ƒ be a proper convex function…
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Related topics
Related topics
14 relations
Broader (3)
Convex analysis
Convex optimization
Mathematical optimization
Convex conjugate
Duality (optimization)
Legendre transformation
List of numerical analysis topics
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Papers overview
Semantic Scholar uses AI to extract papers important to this topic.
Highly Cited
2017
Highly Cited
2017
N$$ \mathcal{N} $$ = 1 supersymmetric indices and the four-dimensional A-model
Cyril Closset
,
Hee-Cheol Kim
,
Brian Willett
2017
Corpus ID: 54225722
A bstractWe compute the supersymmetric partition function of N$$ \mathcal{N} $$ = 1 supersymmetric gauge theories with an R…
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Highly Cited
2012
Highly Cited
2012
Exact results in D = 2 supersymmetric gauge theories
N. Doroud
,
J. Gomis
,
B. Floch
,
Sungjay Lee
2012
Corpus ID: 119589797
A bstractWe compute exactly the partition function of two dimensional $ \mathcal{N} $ = (2, 2) gauge theories on S2 and show that…
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Highly Cited
2012
Highly Cited
2012
Pricing Non-Convexities in an Electricity Pool
Carlos Ruiz
,
A. Conejo
,
Steven A. Gabriel
IEEE Transactions on Power Systems
2012
Corpus ID: 9275856
Electricity pools are generally cleared through auctions that are conveniently formulated as mixed-integer linear programming…
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Highly Cited
2011
Highly Cited
2011
Comments on 3d Seiberg-like dualities
F. Benini
,
Cyril Closset
,
S. Cremonesi
2011
Corpus ID: 56252143
We study Seiberg-like dualities in three dimensional $ \mathcal{N} = 2 $ supersymmetric theories, emphasizing Chern-Simons terms…
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Highly Cited
2008
Highly Cited
2008
Seiberg duality in Chern–Simons theory
A. Giveon
,
D. Kutasov
2008
Corpus ID: 13207271
Highly Cited
2005
Highly Cited
2005
Fenchel duality, Fitzpatrick functions and the Kirszbraun-Valentine extension theorem
S. Reich
,
S. Simons
2005
Corpus ID: 123360850
We present a new proof of the classical Kirszbraun-Valentine extension theorem. Our proof is based on the Fenchel duality theorem…
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Highly Cited
2000
Highly Cited
2000
S-Duality and Noncommutative Gauge Theory
R. Gopakumar
,
J. Maldacena
,
Shiraz Minwalla
,
A. Strominger
2000
Corpus ID: 14334546
It is conjectured that strongly coupled, spatially noncommutative N = 4 Yang-Mills theory has a dual description as a weakly…
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Highly Cited
1998
Highly Cited
1998
Partial breaking of global D = 4 supersymmetry, constrained superfields, and three-brane actions
M. Roček
,
A. Tseytlin
1998
Corpus ID: 12049970
We show that the connection between partial breaking of supersymmetry and nonlinear actions is not accidental and has to do with…
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Highly Cited
1992
Highly Cited
1992
Partially finite convex programming, Part I: Quasi relative interiors and duality theory
J. Borwein
,
A. Lewis
Mathematical programming
1992
Corpus ID: 14826980
We study convex programs that involve the minimization of a convex function over a convex subset of a topological vector space…
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Highly Cited
1991
Highly Cited
1991
AN INTRODUCTION TO TANNAKA DUALITY AND QUANTUM GROUPS
A. Joyal
,
R. Street
1991
Corpus ID: 48793895
The goal of this paper is to give an account of classical Tannaka duality [C⁄] in such a way as to be accessible to the general…
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