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Uninorms on bounded lattices have been recently a remarkable field of inquiry. In the present study, we introduce two novel construction approaches for uninorms on bounded lattices with a neutral element, where some necessary and sufficient conditions are required. These constructions exploit a t-norm and a closure operator, or a t-conorm and an interior operator on a bounded lattice. Some illustrative examples are also included to help comprehend the newly added classes of uninorms.

A characterization of well-orders

Brian Scott (1981)

Fundamenta Mathematicae

A C(K) Banach space which does not have the Schroeder-Bernstein property

Piotr Koszmider (2012)

Studia Mathematica

We construct a totally disconnected compact Hausdorff space K₊ which has clopen subsets K₊” ⊆ K₊’ ⊆ K₊ such that K₊” is homeomorphic to K₊ and hence C(K₊”) is isometric as a Banach space to C(K₊) but C(K₊’) is not isomorphic to C(K₊). This gives two nonisomorphic Banach spaces (necessarily nonseparable) of the form C(K) which are isomorphic to complemented subspaces of each other (even in the above strong isometric sense), providing a solution to the Schroeder-Bernstein problem for Banach spaces...

A class of congruences on a posemigroup.

L. O'Carroll (1971)

Semigroup forum

A class of $l^{1}$ -preduals which are isomorphic to quotients of $C (ω^{ω})$

Ioannis Gasparis (1999)

Studia Mathematica

For every countable ordinal α, we construct an $l_{1}$ -predual $X_{α}$ which is isometric to a subspace of $C (ω^{ω^{ω^{α} + 2}})$ and isomorphic to a quotient of $C (ω^{ω})$ . However, $X_{α}$ is not isomorphic to a subspace of $C (ω^{ω^{α}})$ .

A class of multiplicative lattices

Tiberiu Dumitrescu, Mihai Epure (2021)

Czechoslovak Mathematical Journal

We study the multiplicative lattices $L$ which satisfy the condition $a = (a : (a : b)) (a : b)$ for all $a, b \in L$ . Call them sharp lattices. We prove that every totally ordered sharp lattice is isomorphic to the ideal lattice of a valuation domain with value group $ℤ$ or $ℝ$ . A sharp lattice $L$ localized at its maximal elements are totally ordered sharp lattices. The converse is true if $L$ has finite character.

A classification of rational languages by semilattice-ordered monoids

Libor Polák (2004)

Archivum Mathematicum

We prove here an Eilenberg type theorem: the so-called conjunctive varieties of rational languages correspond to the pseudovarieties of finite semilattice-ordered monoids. Taking complements of members of a conjunctive variety of languages we get a so-called disjunctive variety. We present here a non-trivial example of such a variety together with an equational characterization of the corresponding pseudovariety.

A combinatorial theorem on the existence of a separating element and its applications to sequences and $σ$ -derivations of measures

Pavel Čihák (1969)

Commentationes Mathematicae Universitatis Carolinae

A comment on Balbes' representation theorem for distributive quasi-lattices

R. Knoebel (1976)

Fundamenta Mathematicae

A common abstraction of boolean rings and lattice ordered groups

Klaus D. Schmidt (1985)

Compositio Mathematica

A common approach to directoids with an antitone involution and D-quasirings

Ivan Chajda, Miroslav Kolařík (2008)

Discussiones Mathematicae - General Algebra and Applications

We introduce the so-called DN-algebra whose axiomatic system is a common axiomatization of directoids with an antitone involution and the so-called D-quasiring. It generalizes the concept of Newman algebras (introduced by H. Dobbertin) for a common axiomatization of Boolean algebras and Boolean rings.

A Complete Boolean Algebra without Homogeneous or Rigid Factors.

Sabine Koppelberg (1978)

Mathematische Annalen

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