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The Compartmental and Fibrillar Polyhedral Architecture of Fascia: An Assessment of Connective Tissue Anatomy Without Its Abstract Classifications. [PDF]
Life (Basel)Scarr G.
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Optimal Designs for Discrete Choice Models Via Graph Laplacians. [PDF]
J Stat Theory PractRöttger F, Kahle T, Schwabe R.
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Energy-Harvesting Reinforcement Learning-based Offloading Decision Algorithm for Mobile Edge Computing Networks (EHRL). [PDF]
PLoS OneBayoumi H +3 more
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Directional duality theory Directional duality theory
Economic Theory, 2005In [Can. J. Math. 5, 364--383 (1953; Zbl 0052.16403)] \textit{G. C. Shephard} introduced radial distance functions as representations of a firm's technology. \textit{R. G. Chambers}, \textit{Y. Chung} and \textit{R. Färe} [J. Econ. Theory 70, No. 2, 407--419 (1996; Zbl 0866.90027) and \textit{R. G. Chambers}, \textit{R. Färe}, \textit{E. Jaenicke} and \
Färe, Rolf, Primont, Daniel
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1994
Abstract Duality theory in the context of distributive lattice-ordered algebras has rather a long history. It was in 1933 that G. Birkhoff established his famous representation theorem for finite distributive lattices and, about three years later, M. H.
T S Blyth, J C Varlet
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Abstract Duality theory in the context of distributive lattice-ordered algebras has rather a long history. It was in 1933 that G. Birkhoff established his famous representation theorem for finite distributive lattices and, about three years later, M. H.
T S Blyth, J C Varlet
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On decomposition theory: Duality
IEEE Transactions on Systems, Man, and Cybernetics, 1983Decomposition theory is concerned with the structures that arise in the decomposition of systems. It states from the premise that any method of system decomposition is based, either explicitly or implicitly, on some concept of dependence. The formal setting of decomposition theory is the dependence, an ordered-triple (E, M, D), where E is a nonempty ...
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1995
Nonlinear optimization problems have two different representations, the primal problem and the dual problem. The relation between the primal and the dual problem is provided by an elegant duality theory. This chapter presents the basics of duality theory. Section 4.1 discusses the primal problem and the perturbation function.
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Nonlinear optimization problems have two different representations, the primal problem and the dual problem. The relation between the primal and the dual problem is provided by an elegant duality theory. This chapter presents the basics of duality theory. Section 4.1 discusses the primal problem and the perturbation function.
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Duality in compactified string theory
Physical Review D, 1990We reformulate compactified strings in order to manifest its duality under the transformation {ital R}{r arrow}{alpha}{prime}/{ital R}. New degrees of freedom {ital y}{sup {ital i}} 's are introduced. The duality for the nonperturbative effects of orbifolds is also proved using the new formalism.
, Chang, , Li
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2019
This chapter covers the duality theory for closure algebras and Heyting algebras. The notion of a hybrid of topology and order is introduced, and the fundamental properties of hybrids are studied. It is proved that the category of hybrids and hybrid maps is dually equivalent to the category of closure algebras and closure algebra homomorphisms, while ...
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This chapter covers the duality theory for closure algebras and Heyting algebras. The notion of a hybrid of topology and order is introduced, and the fundamental properties of hybrids are studied. It is proved that the category of hybrids and hybrid maps is dually equivalent to the category of closure algebras and closure algebra homomorphisms, while ...
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1981
In a sense, the present chapter is the most fundamental one for the entire theory of locally convex spaces. Duality is what makes this theory powerful because it establishes a tool to translate a problem on the space (where it may appear to be difficult) into one concerning its linear forms (which may happen to be much easier to handle).
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In a sense, the present chapter is the most fundamental one for the entire theory of locally convex spaces. Duality is what makes this theory powerful because it establishes a tool to translate a problem on the space (where it may appear to be difficult) into one concerning its linear forms (which may happen to be much easier to handle).
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