AbstractAn algebraic technique for reasoning about recursive programs is proposed. The technique is based on Tarski's axioms of least fixed points of monotonic functions and the existence of weak-op-inverses. The algebraic style gives rise to elegant proofs, although the requirement of existence of weak-op-inverse may limit applicability. When such inverses do exist, the method can be used in presence of noncontinuous but monotonic operators occuring in languages containing unbounded nondeterminism, fairness constraints and specification statements
We develop the semantics of a language with arbitrary atomic statements, unbounded nondeterminacy, a...
AbstractAny mathematical theory of algorithms striving to offer a foundation for programming needs t...
AbstractMoschovakis (1984, in “Computation and Proof Theory” (Y. Richter et al., Eds.), Lect. Notes ...
AbstractAn algebraic technique for reasoning about recursive programs is proposed. The technique is ...
AbstractIn applicative theories the recursion theorem provides a term rec which solves recursive equ...
AbstractThis paper studies parallel recursion. The trace specification language used in this paper i...
Dijkstra's language of guarded commands is extended with recursion and transformed into algebra. The...
On donne dans cet article une condition suffisante pour que le plus petit point fixe de l'équation X...
AbstractThis paper establishes a method of constructing a recursion equation set computing a given l...
The object of this paper is to study the mechanism of recursion in a simple, LISP-like programming l...
The weakest-precondition interpretation of recursive procedures is developed for a language with a c...
Abstract. Dijkstra's language of guarded commands i extended with recursion and transformed int...
. We present a new fixpoint theorem which guarantees the existence and the finite computability of t...
Abstract-Write down the definition of a recursion operator on a piece of paper. Tell me its type, bu...
Write down the definition of a recursion operator on a piece of paper. Tell me its type, but be care...
We develop the semantics of a language with arbitrary atomic statements, unbounded nondeterminacy, a...
AbstractAny mathematical theory of algorithms striving to offer a foundation for programming needs t...
AbstractMoschovakis (1984, in “Computation and Proof Theory” (Y. Richter et al., Eds.), Lect. Notes ...
AbstractAn algebraic technique for reasoning about recursive programs is proposed. The technique is ...
AbstractIn applicative theories the recursion theorem provides a term rec which solves recursive equ...
AbstractThis paper studies parallel recursion. The trace specification language used in this paper i...
Dijkstra's language of guarded commands is extended with recursion and transformed into algebra. The...
On donne dans cet article une condition suffisante pour que le plus petit point fixe de l'équation X...
AbstractThis paper establishes a method of constructing a recursion equation set computing a given l...
The object of this paper is to study the mechanism of recursion in a simple, LISP-like programming l...
The weakest-precondition interpretation of recursive procedures is developed for a language with a c...
Abstract. Dijkstra's language of guarded commands i extended with recursion and transformed int...
. We present a new fixpoint theorem which guarantees the existence and the finite computability of t...
Abstract-Write down the definition of a recursion operator on a piece of paper. Tell me its type, bu...
Write down the definition of a recursion operator on a piece of paper. Tell me its type, but be care...
We develop the semantics of a language with arbitrary atomic statements, unbounded nondeterminacy, a...
AbstractAny mathematical theory of algorithms striving to offer a foundation for programming needs t...
AbstractMoschovakis (1984, in “Computation and Proof Theory” (Y. Richter et al., Eds.), Lect. Notes ...