We present a theory of lattice-enriched semirings, called \emph{quantic semirings}, which generalize both quantales and powersets of hyperrings. Using these structures, we show how to recover the spectrum of a Krasner hyperring (and in particular, a commutative ring with unity) via universal constructions, and generalize the spectrum to a new class of hyperstructures, \emph{hypersemirings}. (These include hyperstructures currently studied under the name ``semihyperrings'', but we have weakened the distributivity axioms.)Much of the work consists of background material on closure systems, suplattices, quantales, and hyperoperations, some of which is new. In particular, we define the category of covered semigroups, show their close relation...
We present a discussion of sheaves and presheaves over a right sided idempotent quantale in a fashio...
We introduce the notion of infinitary preorder and use it to obtain a predicative presentation of su...
In this thesis we study quandles and Hurwitz orbits. A quandle is a self-distributive algebraic str...
Spectrum constructions appear throughout mathematics as a way of constructing topological spaces fro...
A sup-lattice is a complete lattice, a morphism of sup-lattices is a mapping preserving arbitrary su...
Abstract. Quantales can be viewed as a framework for a non—commutative topology. Basic properties of...
summary:The paper considers a fuzzification of the notion of quantaloid of K. I. Rosenthal, which re...
While the study of quantale-like structures goes back up to the 1930’s (not-withstanding that the te...
AbstractA quantale is a complete lattice provided with a (generally non commutative) binary multipli...
While the study of quantale-like structures goes back up to the 1930’s (notwithstanding that the ter...
summary:Semirings are modifications of unitary rings where the additive reduct does not form a group...
AbstractLet κQnt be the category of κ-quantales, quantales closed under κ-joins in which the monoid ...
Quandles are mathematical structures that have been mostly studied in knot theory, where they determ...
AbstractThe aim of this research work is to define and characterize a new class of n-ary multialgebr...
Hyperring is a structure generalizing that of a ring, but where the addition is not a composition, b...
We present a discussion of sheaves and presheaves over a right sided idempotent quantale in a fashio...
We introduce the notion of infinitary preorder and use it to obtain a predicative presentation of su...
In this thesis we study quandles and Hurwitz orbits. A quandle is a self-distributive algebraic str...
Spectrum constructions appear throughout mathematics as a way of constructing topological spaces fro...
A sup-lattice is a complete lattice, a morphism of sup-lattices is a mapping preserving arbitrary su...
Abstract. Quantales can be viewed as a framework for a non—commutative topology. Basic properties of...
summary:The paper considers a fuzzification of the notion of quantaloid of K. I. Rosenthal, which re...
While the study of quantale-like structures goes back up to the 1930’s (not-withstanding that the te...
AbstractA quantale is a complete lattice provided with a (generally non commutative) binary multipli...
While the study of quantale-like structures goes back up to the 1930’s (notwithstanding that the ter...
summary:Semirings are modifications of unitary rings where the additive reduct does not form a group...
AbstractLet κQnt be the category of κ-quantales, quantales closed under κ-joins in which the monoid ...
Quandles are mathematical structures that have been mostly studied in knot theory, where they determ...
AbstractThe aim of this research work is to define and characterize a new class of n-ary multialgebr...
Hyperring is a structure generalizing that of a ring, but where the addition is not a composition, b...
We present a discussion of sheaves and presheaves over a right sided idempotent quantale in a fashio...
We introduce the notion of infinitary preorder and use it to obtain a predicative presentation of su...
In this thesis we study quandles and Hurwitz orbits. A quandle is a self-distributive algebraic str...