Search results for "Hilbert algebra"

showing 3 items of 3 documents

Lattice of closure endomorphisms of a Hilbert algebra

2019

A closure endomorphism of a Hilbert algebra [Formula: see text] is a mapping that is simultaneously an endomorphism of and a closure operator on [Formula: see text]. It is known that the set [Formula: see text] of all closure endomorphisms of [Formula: see text] is a distributive lattice where the meet of two elements is defined pointwise and their join is given by their composition. This lattice is shown in the paper to be isomorphic to the lattice of certain filters of [Formula: see text], anti-isomorphic to the lattice of certain closure retracts of [Formula: see text], and compactly generated. The set of compact elements of [Formula: see text] coincides with the adjoint semilattice of …

Pure mathematicsEndomorphismHilbert algebraGeneral Mathematics010102 general mathematicsAstrophysics::Instrumentation and Methods for AstrophysicsClosure (topology)Computer Science::Computation and Language (Computational Linguistics and Natural Language and Speech Processing)010103 numerical & computational mathematics01 natural sciencesSet (abstract data type)Lattice (module)Computer Science::General LiteratureClosure operator0101 mathematicsMathematicsAsian-European Journal of Mathematics
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Quasi-decompositions and quasidirect products of Hilbert algebras

2021

Abstract A quasi-decomposition of a Hilbert algebra A is a pair (C, D) of its subalgebras such that (i) every element a ∈ A is a meet c ∧ d with c ∈ C, d ∈ D, where c and d are compatible (i.e., c → d = c → (c ∧ d)), and (ii) d → c = c (then c is uniquely defined). Quasi-decompositions are intimately related to the so-called triple construction of Hilbert algebras, which we reinterpret as a construction of quasidirect products. We show that it can be viewed as a generalization of the semidirect product construction, that quasidirect products has a certain universal property and that they can be characterised in terms of short exact sequences. We also discuss four classes of Hilbert algebras…

Pure mathematicsHilbert algebraGeneral MathematicsMathematicsMathematica Slovaca
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Some classes of topological quasi *-algebras

2001

The completion $\overline{A}[\tau]$ of a locally convex *-algebra $A [ \tau ]$ with not jointly continuous multiplication is a *-vector space with partial multiplication $xy$ defined only for $x$ or $y \in A_{0}$, and it is called a topological quasi *-algebra. In this paper two classes of topological quasi *-algebras called strict CQ$^*$-algebras and HCQ$^*$-algebras are studied. Roughly speaking, a strict CQ$^*$-algebra (resp. HCQ$^*$-algebra) is a Banach (resp. Hilbert) quasi *-algebra containing a C$^*$-algebra endowed with another involution $\sharp$ and C$^*$-norm $\| \|_{\sharp}$. HCQ$^*$-algebras are closely related to left Hilbert algebras. We shall show that a Hilbert space is a H…

Topological quasi *-algebraTopological algebraHilbert algebraApplied MathematicsGeneral MathematicsHilbert spaceRegular polygonFOS: Physical sciencesHCQ*-algebraMathematical Physics (math-ph)TopologyCQ*-algebrasymbols.namesakesymbolsSettore MAT/07 - Fisica MatematicaSubspace topologyMathematical PhysicsMathematics
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