AbstractThis paper is concerned with the equational logic of corecursion, that is of definitions involving final coalgebra maps. The framework for our study is iteration theories (cf. e.g. [1,2]), recently reintroduced as models of the FLR0 fragment of the Formal Language of Recursion [5–7]. We present a new class of iteration theories derived from final coalgebras. This allows us to reason with a number of types of fixed-point equations which heretofore seemed to require to metric or order-theoretic ideas. All of the work can be done using finality properties and equational reasoning.Having a semantics, we obtain the following completeness result: the equations involving fixed-point terms which are valid for final coalgebra interpretations...
Bove and Capretta's popular method for justifying function definitions by general recursive equation...
AbstractThe purpose of this paper is two-fold: first to show how a natural mathematical formulation ...
In type theory based logical frameworks, recursive and corecursive definitions are subject to syntac...
AbstractThis paper is concerned with the equational logic of definitions whose semantics is given in...
We prove the following completeness theorem: If the fixed point operation over a category is defined...
AbstractWe prove the following completeness theorem: If the fixed point operation over a category is...
Theoretical models of recursion schemes have been well studied under the names well-founded coalgebr...
Recursion is a well-known and powerful programming technique, with a wide variety of applications. ...
. In a simply-typed, call-by-value (CBV) language with first-class continuations, the usual CBV fixp...
We investigate the expressive power of three alternative approaches for the definition of infinite b...
“In the setting of algebraic theories enriched with an external fixed-point operation, the no-tion o...
Abstract. Final coalgebras for a functor serve as semantic domains for state based systems of variou...
AbstractThe concept of iteration theory of Bloom and Ésik summarizes all equational properties that ...
All known structures involving a constructively obtainable fixed point (or it-eration) operation sat...
AbstractThe (in)equational properties of iteration, i.e., least (pre-)fixed point solutions over cpo...
Bove and Capretta's popular method for justifying function definitions by general recursive equation...
AbstractThe purpose of this paper is two-fold: first to show how a natural mathematical formulation ...
In type theory based logical frameworks, recursive and corecursive definitions are subject to syntac...
AbstractThis paper is concerned with the equational logic of definitions whose semantics is given in...
We prove the following completeness theorem: If the fixed point operation over a category is defined...
AbstractWe prove the following completeness theorem: If the fixed point operation over a category is...
Theoretical models of recursion schemes have been well studied under the names well-founded coalgebr...
Recursion is a well-known and powerful programming technique, with a wide variety of applications. ...
. In a simply-typed, call-by-value (CBV) language with first-class continuations, the usual CBV fixp...
We investigate the expressive power of three alternative approaches for the definition of infinite b...
“In the setting of algebraic theories enriched with an external fixed-point operation, the no-tion o...
Abstract. Final coalgebras for a functor serve as semantic domains for state based systems of variou...
AbstractThe concept of iteration theory of Bloom and Ésik summarizes all equational properties that ...
All known structures involving a constructively obtainable fixed point (or it-eration) operation sat...
AbstractThe (in)equational properties of iteration, i.e., least (pre-)fixed point solutions over cpo...
Bove and Capretta's popular method for justifying function definitions by general recursive equation...
AbstractThe purpose of this paper is two-fold: first to show how a natural mathematical formulation ...
In type theory based logical frameworks, recursive and corecursive definitions are subject to syntac...