Inspired by the work of S. Kaplan on positive/negative conditional rewriting, we investigate initial semantics for algebraic specifications with Gentzen formulas. Since the standard initial approach is limited to conditional equations(i.e. positive Horn formulas), the notion of semi-initial an quasi-initial algebras is introduced, and it is shown that all specifications with (positive) Gentzen formulas admit quasi-initial models. The whole approach is generalized to the parametric case wher quasi-initiality generalizes to quasi-freeness. Since quasi-free objects need not be isomorphic, the persistency requirement is added to obtain a unique semantics for many interesting practical examples. Unique persistent quasi-free semantics can be desc...
We investigate containers and polynomial functors in Quantitative Type Theory, and give initial alge...
We investigate containers and polynomial functors in Quantitative Type Theory, and give initial alge...
AbstractWe develop a general study of the algebraic specification practice, originating from the OBJ...
In this paper we are interested in an algebraic specification language that (1) allows for sufficien...
AbstractPartial conditional specifications consist of conditional axioms, with equalities in the (po...
AbstractRelation lifting [Hermida, C. and B. Jacobs, Structural induction and coinduction in a fibra...
Abstract. One of the many results which makes Joachim Lambek famous is: an initial algebra of an end...
this paper, after presenting the basic properties of the category of non-strict algebras, is an inv...
AbstractTo provide a formal framework for discussing specifications of abstract data types we restri...
Relation lifting [6] extends an endofunctor F: C C to a functor Rel(F): Rel(C) Rel(C), where Rel(C) ...
AbstractTo provide a formal framework for discussing specifications of abstract data types we restri...
We conceive a parametrized data type as a partial functor φ: ALG (∑) --> ALG (Δ), where Δ is a sign...
AbstractWe study algebraic specifications given by finite sets R of positive/negative-conditional eq...
AbstractThis is the first of a short series of papers intended to provide one common semantics for s...
An algebraic specification is called ω-complete or inductively complete if all (open as well as clos...
We investigate containers and polynomial functors in Quantitative Type Theory, and give initial alge...
We investigate containers and polynomial functors in Quantitative Type Theory, and give initial alge...
AbstractWe develop a general study of the algebraic specification practice, originating from the OBJ...
In this paper we are interested in an algebraic specification language that (1) allows for sufficien...
AbstractPartial conditional specifications consist of conditional axioms, with equalities in the (po...
AbstractRelation lifting [Hermida, C. and B. Jacobs, Structural induction and coinduction in a fibra...
Abstract. One of the many results which makes Joachim Lambek famous is: an initial algebra of an end...
this paper, after presenting the basic properties of the category of non-strict algebras, is an inv...
AbstractTo provide a formal framework for discussing specifications of abstract data types we restri...
Relation lifting [6] extends an endofunctor F: C C to a functor Rel(F): Rel(C) Rel(C), where Rel(C) ...
AbstractTo provide a formal framework for discussing specifications of abstract data types we restri...
We conceive a parametrized data type as a partial functor φ: ALG (∑) --> ALG (Δ), where Δ is a sign...
AbstractWe study algebraic specifications given by finite sets R of positive/negative-conditional eq...
AbstractThis is the first of a short series of papers intended to provide one common semantics for s...
An algebraic specification is called ω-complete or inductively complete if all (open as well as clos...
We investigate containers and polynomial functors in Quantitative Type Theory, and give initial alge...
We investigate containers and polynomial functors in Quantitative Type Theory, and give initial alge...
AbstractWe develop a general study of the algebraic specification practice, originating from the OBJ...