Central elements and Cantor-Bernstein's theorem for pseudo-effect algebras

Remarks on effect-tribes ⋮ Smearing of observables and spectral measures on quantum structures ⋮ Pseudo-D-lattices and Lyapunov measures ⋮ Pseudo-D-lattices and separating points of measures ⋮ Atomic effect algebras with the Riesz decomposition property ⋮ State-morphism pseudo-effect algebras ⋮ Representation of states on effect-tribes and effect algebras by integrals ⋮ Two-dimensional observables and spectral resolutions ⋮ Decompositions of measures on pseudo effect algebras ⋮ Cantor-Bernstein theorem for pseudo-BCK-algebras ⋮ Perfect GMV-Algebras ⋮ Observables on quantum structures ⋮ Unnamed Item ⋮ The Cantor-Bernstein-Schröder theorem via universal algebra. ⋮ TYPE DECOMPOSITION OF A PSEUDOEFFECT ALGEBRA ⋮ On orders of observables on effect algebras ⋮ Olson order of quantum observables ⋮ Cantor–Bernstein Property for MV-Algebras ⋮ Quantum observables and effect algebras ⋮ Pseudo effect algebras are algebras over bounded posets ⋮ On the Schröder-Bernstein problem for carathéodory vector lattices ⋮ Decomposition of pseudo-effect algebras and the Hammer-Sobczyk theorem ⋮ On a theorem of Cantor-Bernstein type for algebras ⋮ Generalized pseudo-EMV-effect algebras ⋮ Intervals of effect algebras and pseudo-effect algebras ⋮ Unnamed Item ⋮ Unnamed Item ⋮ States on EMV-algebras

• Effect algebras and unsharp quantum logics.
• Interpretation of AF \(C^*\)-algebras in Łukasiewicz sentential calculus
• The center of an effect algebra
• Algebraic Analysis of Many Valued Logics
• Cantor-Bernstein theorem for MV-algebras
• A non-commutative generalization of MV-algebras
• Pseudoeffect algebras. I: Basic properties
• Pseudoeffect algebras. II: Group representations
• Unnamed Item