Add to ORKGWe prove a uniform boundedness theorem and a Vitali-Hahn-Saks theorem for modular measures on D-lattices with values in Dedekind complete l-groups. Two of the most important theorems of measure theory are Nikodym boundedness theorem and Vitali-Hahn-Saks, see for example
We prove a Hahn decomposition theorem for σ-additive modular measures on σ-complete lattice ordered ...
A version of Dieudonné theorem is proved for lattice group-valued modular measures on lattice ordere...
Convergence Theorems for Lattice Group-valued Measures explains limit and boundedness theorems for m...
We prove a uniform boundedness theorem and a Vitali-Hahn-Saks theorem for modular measures on D-lat...
We prove a linearity theorem for modular measures on D-lattices (= lattice ordered effect algebras) ...
AbstractAbsolute continuity, s-boundedness, and extensions are studied, in the context of the so-cal...
summary:We deal with decomposition theorems for modular measures $\mu \colon L\rightarrow G$ defined...
summary:A version of Dieudonné theorem is proved for lattice group-valued modular measures on lattic...
We prove a Cafiero type theorem for measures on effect algebras and a Nikodym boundedness theorem fo...
We deal with decomposition theorems for modular measures $\mu:L\rightarrow G$ defined on a D-latti...
We prove Brooks–Jewett, Vitali–Hahn–Saks and Nikodym Boundedness theorems for modular measures on la...
Abstract. We deal with decomposition theorems for modular measures µ: L → G de-fined on a D-lattice ...
We deal with decomposition theorems for modular measures $\mu:L\rightarrow G$ defined on a D-latt...
We prove a Hahn decomposition theorem for σ-additive modular measures on σ-complete lattice ordered ...
A version of Dieudonné theorem is proved for lattice group-valued modular measures on lattice ordere...
Convergence Theorems for Lattice Group-valued Measures explains limit and boundedness theorems for m...
We prove a uniform boundedness theorem and a Vitali-Hahn-Saks theorem for modular measures on D-lat...
We prove a linearity theorem for modular measures on D-lattices (= lattice ordered effect algebras) ...
AbstractAbsolute continuity, s-boundedness, and extensions are studied, in the context of the so-cal...
summary:We deal with decomposition theorems for modular measures $\mu \colon L\rightarrow G$ defined...
summary:A version of Dieudonné theorem is proved for lattice group-valued modular measures on lattic...
We prove a Cafiero type theorem for measures on effect algebras and a Nikodym boundedness theorem fo...
We deal with decomposition theorems for modular measures $\mu:L\rightarrow G$ defined on a D-latti...
We prove Brooks–Jewett, Vitali–Hahn–Saks and Nikodym Boundedness theorems for modular measures on la...
Abstract. We deal with decomposition theorems for modular measures µ: L → G de-fined on a D-lattice ...
We deal with decomposition theorems for modular measures $\mu:L\rightarrow G$ defined on a D-latt...
We prove a Hahn decomposition theorem for σ-additive modular measures on σ-complete lattice ordered ...
A version of Dieudonné theorem is proved for lattice group-valued modular measures on lattice ordere...
Convergence Theorems for Lattice Group-valued Measures explains limit and boundedness theorems for m...