Menu

Logic group at the University of Salerno

Primary Menu

Skip to content
  • Home
  • Guests
  • Members of the group
  • Projects
  • Seminars
Search

Tag: Priestley Duality

Priestley duality and quotient lattices of many-valued algebras

Posted onJanuary 18, 2010October 30, 2015AuthorGaetano Vitale

by R. Cignoli, A. Di Nola A. Lettieri It is shown that the construction and the properties of the functor β from the category of MV-algebras to the category of bounded residuated lattices has a natural interpretation in the contest Read More …

CategoriesPreprintsTagsMV-algebras, Priestley Duality, Quotient Lattices

Search the website

Tag cloud

Abelian l-groups Algebraic Logic Algebraic Semantic Antonio Di Nola Birthday Boolean function BRAIN Conference Costituzione Didattica Di Nola Theorem DNF Full Lambek Calculus Fuzzy topology Game Theory Idempotent Analysis IRSES project "MaToMUVI" Learning algorithm Local algebras Logic Logica ManyVal Mathematical Logic model theory MV-algebras o-minimality Perfect MV-algebras Priestley Duality Prime Ideals PRIN2008 Proof-theory Quantale Quantale module Quotient Lattices Representation Residuated lattice Residuated Lattices Salerno Semimodule Seminars Semiring Stone duality Students Topos Theory Tropical geometry
Copyright © 2018 Logic group at the University of Salerno. All Rights Reserved.
Gridalicious by Catch Themes
Scroll Up
  • Home
  • Guests
  • Members of the group
  • Projects
  • Seminars