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Decomposition of group-valued measures on orthoalgebras

Paolo De Lucia, Pedro Morales (1998)

Fundamenta Mathematicae

We present a general decomposition theorem for a positive inner regular finitely additive measure on an orthoalgebra L with values in an ordered topological group G, not necessarily commutative. In the case where L is a Boolean algebra, we establish the uniqueness of such a decomposition. With mild extra hypotheses on G, we extend this Boolean decomposition, preserving the uniqueness, to the case where the measure is order bounded instead of being positive. This last result generalizes A. D. Aleksandrov's...

Decomposition of $ℓ$ -group-valued measures

Giuseppina Barbieri, Antonietta Valente, Hans Weber (2012)

Czechoslovak Mathematical Journal

We deal with decomposition theorems for modular measures $μ : L \to G$ defined on a D-lattice with values in a Dedekind complete $ℓ$ -group. Using the celebrated band decomposition theorem of Riesz in Dedekind complete $ℓ$ -groups, several decomposition theorems including the Lebesgue decomposition theorem, the Hewitt-Yosida decomposition theorem and the Alexandroff decomposition theorem are derived. Our main result—also based on the band decomposition theorem of Riesz—is the Hammer-Sobczyk decomposition for $ℓ$ -group-valued...

Decomposition of set functions with values in a topological semigroups

R. Urbański (1977)

Studia Mathematica

Decomposition theorems in measure theory

Peter Capek (1981)

Mathematica Slovaca

Die atomare Struktur topologischer Boolescher Ringe und s-beschränkter Inhalte

Hans Weber (1982)

Studia Mathematica

Dieudonné-type theorems for lattice group-valued $k$ -triangular set functions

Antonio Boccuto, Xenofon Dimitriou (2019)

Kybernetika

Some versions of Dieudonné-type convergence and uniform boundedness theorems are proved, for $k$ -triangular and regular lattice group-valued set functions. We use sliding hump techniques and direct methods. We extend earlier results, proved in the real case. Furthermore, we pose some open problems.