We associate a canonical unital involutive quantale to a topological groupoid. When the groupoid is also etale, this association is compatible with but independent from the theory of localic etale groupoids and their quantales [9] of P. Resende. As a motivating example, we describe the connection between the quantale and the C*-algebra that both classify Penrose tilings, which was left as an open problem in [5]
It is often stated that Frobenius quantales are necessarily unital. By taking negation as a primitiv...
AbstractQuantaloids are categories enriched in the symmetric, monoidal closed category of sup-lattic...
AbstractA quantale is a complete lattice provided with a (generally non commutative) binary multipli...
We associate a canonical unital involutive quantale to a topological groupoid. When the groupoid is ...
We associate a canonical unital involutive quantale to a topological groupoid. When the groupoid is ...
We establish a bijective correspondence involving a class of unital involutive quantales and a class...
We establish a bijective correspondence involving a class of unital involutive quantales and a class...
AbstractWe establish a bijective correspondence involving a class of unital involutive quantales and...
Topological groupoid quantales Palmigiano, A.; Re, R. General rights It is not permitted to downloa...
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...
In Palmigiano and Re (J Pure Appl Algebra 215(8):1945–1957, 2011), spatial SGF-quantales are axiomat...
In Palmigiano and Re (J Pure Appl Algebra 215(8):1945-1957, 2011), spatial SGF-quantales are axiomat...
Abstract. Quantales can be viewed as a framework for a non—commutative topology. Basic properties of...
Abstract We introduce and present results about a class of quantales, the topological relational qua...
It is often stated that Frobenius quantales are necessarily unital. By taking negation as a primitiv...
AbstractQuantaloids are categories enriched in the symmetric, monoidal closed category of sup-lattic...
AbstractA quantale is a complete lattice provided with a (generally non commutative) binary multipli...
We associate a canonical unital involutive quantale to a topological groupoid. When the groupoid is ...
We associate a canonical unital involutive quantale to a topological groupoid. When the groupoid is ...
We establish a bijective correspondence involving a class of unital involutive quantales and a class...
We establish a bijective correspondence involving a class of unital involutive quantales and a class...
AbstractWe establish a bijective correspondence involving a class of unital involutive quantales and...
Topological groupoid quantales Palmigiano, A.; Re, R. General rights It is not permitted to downloa...
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...
In Palmigiano and Re (J Pure Appl Algebra 215(8):1945–1957, 2011), spatial SGF-quantales are axiomat...
In Palmigiano and Re (J Pure Appl Algebra 215(8):1945-1957, 2011), spatial SGF-quantales are axiomat...
Abstract. Quantales can be viewed as a framework for a non—commutative topology. Basic properties of...
Abstract We introduce and present results about a class of quantales, the topological relational qua...
It is often stated that Frobenius quantales are necessarily unital. By taking negation as a primitiv...
AbstractQuantaloids are categories enriched in the symmetric, monoidal closed category of sup-lattic...
AbstractA quantale is a complete lattice provided with a (generally non commutative) binary multipli...