Zobrazeno 1 - 10
of 25
pro vyhledávání: '"Wieslaw Dziobiak"'
Autor:
M. E. Adams, Wieslaw Dziobiak
Publikováno v:
Algebra universalis. 82
Let L denote the Q-lattice of the variety $${\mathcal {V}}$$ of lattices, i.e. the lattice of quasivarieties that are contained in $${\mathcal {V}}$$ . Let F denote the free lattice in $${\mathcal {V}}$$ with $$\omega $$ free generators and let Q(F)
Publikováno v:
Algebra universalis. 76:155-182
The lattice of varieties of quasi-Stone algebras ordered by inclusion is an $${\omega+1}$$ chain. It is shown that the variety $${\mathbf{Q_{2,2}}}$$ (of height 13) is finite-to-finite universal (in the sense of Hedrlin and Pultr). Further, it is sho
Autor:
Wiesław Dziobiak, Marina Schwidefsky
Publikováno v:
Bulletin of the Section of Logic, Vol 51, Iss 3, Pp 329-344 (2022)
The categorical dualities presented are: (first) for the category of bi-algebraic lattices that belong to the variety generated by the smallest non-modular lattice with complete (0,1)-lattice homomorphisms as morphisms, and (second) for the category
Externí odkaz:
https://doaj.org/article/70ec3dbc68ac4b1d950a6630e919dc33
Publikováno v:
Algebra universalis. 60:259-291
Let $$\langle {\mathcal{D}}, \leq \rangle$$ be the ordered set of isomorphism types of finite distributive lattices, where the ordering is by embeddability. We characterize the order ideals in $$\langle {\mathcal{D}}, \leq \rangle$$ that are well-qua
Publikováno v:
Algebra universalis. 60:247-258
We find all finite unavoidable ordered sets, finite unavoidable semilattices and finite unavoidable lattices.
Publikováno v:
Studia Logica. 91:113-123
We present some equivalent conditions for a quasivariety \({\mathcal {K}}\) of structures to be generated by a single structure. The first such condition, called the embedding property was found by A.I. Mal′tsev in [6]. It says that if \({{\bf A},
Publikováno v:
Fundamenta Mathematicae. 202:199-223
Publikováno v:
Semigroup Forum. 78:253-261
We describe all minimal quasivarieties and all minimal varieties of semilattices with one automorphism (considered as algebras with one binary and two unary operations).
Autor:
M. E. Adams, Wieslaw Dziobiak
Publikováno v:
International Journal of Algebra and Computation. 17:1349-1376
Let V be a non-trivial variety of bounded distributive lattices with a quantifier, as introduced by Cignoli in [7]. It is shown that if V does not contain the 4-element bounded Boolean lattice with a simple quantifier, then V contains non-isomorphic
Publikováno v:
Studia Logica. 83:5-14