This paper is a brief analysis of the notion of syntactic representation of types followed by a proposal of a formal calculus of type subsumption. The idea which is developed centers on the concept of indexed term, an extension of the definition of algebraic terms relaxing the fixed arity and fixed indexing constraints, and which allows term symbols to have some pre-order structure. It is shown that the structure on the set of symbols can be homomorphically extended to indexed terms to what is defined to be a subsumption ordering. Furthermore, when symbols have a lattice structure, this structure extends to a lattice of indexed terms. The notions of unification and generalization are also shown to fit the extension, and constitute the me...
AbstractBy using intersection types and filter models we formulate a theory of types for a λ-calculu...
Abstract. The notion of subtyping has gained an important role both in theoretical and applicative d...
AbstractWe consider a generalization of term subsumption, or matching, to a class of mathematical st...
This paper is a brief analysis of the notion of syntactic representation of types followed by a prop...
AbstractConsider a first order typed language, with semantics 〚〛 for expressions and types. Adding s...
Term Subsumption Languages (TSLs), a generalization of both semantic networks and frames equipped wi...
AbstractThis paper deals with terminological representation languages for KL-ONE-type knowledge repr...
AbstractIn a previous paper we have defined a semantic preorder called operational subsumption, whic...
In a previous paper we have defined a semantic preorder called operational subsumption, which compar...
The purpose of this thesis is twofold: (1) to define a formal lattice-theoretic calculus of partiall...
This thesis describes techniques for efficiently performing polymorphic type inference for function...
Consider a first order typed language, with semantics $S$ for expressions and types. Adding subtypin...
International audienceWe consider a type algebra equipped with recursive, product, function, interse...
Subtyping in first order object calculi is studied with respect to the logical semantics obtained by...
It is possible to represent the terms of a syntax with binding constructors by a family of types, in...
AbstractBy using intersection types and filter models we formulate a theory of types for a λ-calculu...
Abstract. The notion of subtyping has gained an important role both in theoretical and applicative d...
AbstractWe consider a generalization of term subsumption, or matching, to a class of mathematical st...
This paper is a brief analysis of the notion of syntactic representation of types followed by a prop...
AbstractConsider a first order typed language, with semantics 〚〛 for expressions and types. Adding s...
Term Subsumption Languages (TSLs), a generalization of both semantic networks and frames equipped wi...
AbstractThis paper deals with terminological representation languages for KL-ONE-type knowledge repr...
AbstractIn a previous paper we have defined a semantic preorder called operational subsumption, whic...
In a previous paper we have defined a semantic preorder called operational subsumption, which compar...
The purpose of this thesis is twofold: (1) to define a formal lattice-theoretic calculus of partiall...
This thesis describes techniques for efficiently performing polymorphic type inference for function...
Consider a first order typed language, with semantics $S$ for expressions and types. Adding subtypin...
International audienceWe consider a type algebra equipped with recursive, product, function, interse...
Subtyping in first order object calculi is studied with respect to the logical semantics obtained by...
It is possible to represent the terms of a syntax with binding constructors by a family of types, in...
AbstractBy using intersection types and filter models we formulate a theory of types for a λ-calculu...
Abstract. The notion of subtyping has gained an important role both in theoretical and applicative d...
AbstractWe consider a generalization of term subsumption, or matching, to a class of mathematical st...