Results 281 to 290 of about 8,030 (311)

Compatible Operations on Residuated Lattices

Studia Logica, 2011
The authors adopt a definition for residuated lattices in which the lattice reduct is not necessarily bounded, commutativity is not assumed either, and both the left and right residua are present. An operation \(f\) on a set \(L\) endowed with an algebraic structure is said to be compatible iff every congruence of the algebra \(L\) is also a congruence
Castiglioni, J. L., San Martín, H. J.
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Banach Lattices of Bounded Operators

Mathematische Nachrichten, 1979
AbstractThere are given two equivalent methods to construct BANACH lattices of compact operators. All known examples of such lattices are included.
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Operators on complete lattices

2020
The operators that will be used frequently in later chapters are defined and their properties set out very clearly. In particular, erosion and dilation, opening and closing are introduced. The notion of the centre of a lattice is explained.
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Lattice Closure Operators

مجلة جامعة الزيتونة, 2020
Abdurahman Masoud Abdalla, Abdusslam M. Khalifa   +1 more
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Lattice Vertex Operator Superalgebras

1998
In this chapter, we shall present an update approach to the theory of vertex operator superalgebra constructed from pairs of a finite-dimensional space with a nondegenerate symmetric bilinear form and an integral additive subgroup. We call these algebras “lattice vertex operator superalgebras” because any integral subgroup is a direct sum of a ...
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Energy-Flux Operator for a Lattice

Physical Review, 1963
A systematic derivation of the energy-flux operator for a three-dimensional lattice is given. The treatment is based on the general expressions for the energy flux which are valid for all phases of matter; a short derivation of these expressions, making no restrictions to two-body forces, is presented.
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Distributive Lattices with a Negation Operator

Mathematical Logic Quarterly, 1999
AbstractIn this note we introduce and study algebras (L, V, Λ, ⌝, 0,1) of type (2, 2,1,1,1) such that (L, V, ⌝, 0,1) is a bounded distributive lattice and ⌝ is an operator that satisfies the condition ⌝ (a V b) = a ⌝ b and ⌝ 0 = 1. We develop the topological duality between these algebras and Priestley spaces with a relation.
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Integrative oncology: Addressing the global challenges of cancer prevention and treatment

Ca-A Cancer Journal for Clinicians, 2022
Jun J Mao,, Msce, Lorenzo Cohen, Karen M Mustian   +2 more
exaly  

Obesity and adverse breast cancer risk and outcome: Mechanistic insights and strategies for intervention

Ca-A Cancer Journal for Clinicians, 2017
Cynthia Morata-Tarifa, Joyce M Slingerland   +1 more
exaly  

Multidisciplinary standards of care and recent progress in pancreatic ductal adenocarcinoma

Ca-A Cancer Journal for Clinicians, 2020
Aaron J Grossberg, William L Hwang, Anirban Maitra   +2 more
exaly