On the Covering Multiplicity of Lattices.
(1992)
Discrete & computational geometry
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(1992)
Discrete & computational geometry
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M. E. Adams (1974)
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L. Amour, P. Lévy-Bruhl, J. Nourrigat (2010)
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For a class of infinite lattices of interacting anharmonic oscillators, we study the existence of the dynamics, together with Lieb-Robinson bounds, in a suitable algebra of observables.
R. Beazer (1974)
Colloquium Mathematicae
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G. Szasz (1976)
Matematički Vesnik
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Batut, Christian, Quebbemann, Heinz-Georg, Scharlau, Rudolf (1995)
Experimental Mathematics
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Bachoc, Christine, Batut, Christian (1992)
Experimental Mathematics
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Edward Marczewski (1963)
Colloquium Mathematicum
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B. Węglorz (1967)
Colloquium Mathematicae
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M. F. Janowitz (1970)
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Y. A. Abramovich, A. K. Kitover
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A linear operator T: X → Y between vector lattices is said to be disjointness preserving if T sends disjoint elements in X to disjoint elements in Y. Two closely related questions are discussed in this paper: (1) If T is invertible, under what assumptions does the inverse operator also preserve disjointness? (2) Under what assumptions is the operator T regular? These problems were considered by the authors in [5] but the current paper (closely related to [5] but self-contained) reflects...
Rade Dacić (1982)
Publications de l'Institut Mathématique
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Albert R. Stralka (1974)
Colloquium Mathematicae
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R. Padmanabhan (1966)
Colloquium Mathematicae
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Hua Mao (2017)
Open Mathematics
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We characterize complete atomistic lattices whose classification lattices are geometric. This implies an proper solution to a problem raised by S. Radeleczki in 2002.
J. Quinn, R. Reichard (1974)
Colloquium Mathematicae
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