Results 1 to 10 of about 33 (33)

Refinement monoids, equidecomposability types, and boolean inverse semigroups [PDF]

, 2017
Adopting a new universal algebraic approach, this book explores and consolidates the link between Tarski's classical theory of equidecomposability types monoids, abstract measure theory (in the spirit of Hans Dobbertin's work on monoid-valued measures on
Friedrich Wehrung, Wehrung, Friedrich
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Separating points of measures on effect algebras [PDF]

, 2007
summary:We prove an extension theorem for modular measures on lattice ordered effect algebras. This is used to obtain a representation of these measures by the classical ones.
Barbieri, Giuseppina, BARBIERI, Giuseppina Gerarda, Avallone, Anna, Anna Avallone   +3 more
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Two extension theorems. Modular functions on complemented lattices [PDF]

, 1998
summary:We prove an extension theorem for modular functions on arbitrary lattices and an extension theorem for measures on orthomodular lattices. The first is used to obtain a representation of modular vector-valued functions defined on complemented ...
LEPELLERE M. A., WEBER, Hans Josef Karl, Weber, Hans, AVALLONE, Anna   +3 more
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Direct product decomposition of $MV$-algebras [PDF]

, 1994
summary:We show that each sequentially continuous (with respect to the pointwise convergence) normed measure on a bold algebra of fuzzy sets (Archimedean $MV$-algebra) can be uniquely extended to a sequentially continuous measure on the generated ...
Jakubík, Ján, Pawar, Y. S., Frič, Roman, Pulmannová, Sylvia   +3 more
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Order boundedness and weak compactness of the set of quasi-measure extensions of a quasi-measure [PDF]

, 2015
summary:Let $\mathfrak M$ and $\mathfrak R$ be algebras of subsets of a set $\Omega $ with $\mathfrak M\subset\mathfrak R$, and denote by $E(\mu )$ the set of all quasi-measure extensions of a given quasi-measure $\mu $ on $\mathfrak M$ to $\mathfrak R$.
Lipecki, Zbigniew
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Topos-Theoretic Approaches to Quantum Theory [PDF]

, 2012
Starting from a naive investigation into the nature of experiments on a physical system one can argue that states of the system should pair non-degenerately with physical observables. This duality is closely related to that between space and quantity, or,
Vákár, Matthijs, Matthijs Vakar
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Spaces X in Which All Prime z-Ideals of C(X) Are Minimal or Maximal

, 2003
Quasi P-spaces are defined to be those Tychonoff spaces X such that each prime z-ideal of C(X) is either minimal or maximal. This article is devoted to a systematic study of these spaces, which are an obvious generalization of P-spaces. The compact quasi
Woods, R. Grant, Henriksen, Melvin, Martinez, Jorge, Woods, R. G.   +3 more
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Towards Measurable Types for Dynamical Process Modeling Languages. [PDF]

Electron Notes Theor Comput Sci, 2010
Mjolsness E.
europepmc   +1 more source

ERGODIC THEORY, GROUP THEORY AND DIFFERENTIAL GEOMETRY. [PDF]

Proc Natl Acad Sci U S A, 1963
Mackey GW.
europepmc   +1 more source

Second duals of measure algebras [PDF]

, 2012
Dales, H.G., Lau, A.T.-M., Strauss, D.
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