The equational theory of deterministic monadic recursion schemes is known to be decidable by the result of Sénizergues on the decidability of the problem of DPDA equivalence. In order to capture some properties of the domain of computation, we augment equations with certain hypotheses. This preserves the decidability of the theory, which we call simple implicational theory. The asymptotically fastest algorithm known for deciding the equational theory, and also for deciding the simple implicational theory, has running time that is non-elementary. We therefore consider a restriction of the properties about schemes to check: instead of arbitrary equations f ≡ g between schemes, we focus on propositional Hoare assertions {p}f{q}, where f is a ...
In the following theories a formalization of the Owicki-Gries and the rely-guarantee methods is pres...
The inclusion problem for the class of monadic recursion schemes is shown to be undecidable. The pro...
AbstractThis paper introduces a compositional Hoare logic for reasoning about the partial correctnes...
The Dijkstra and Hoare monads have been introduced recently for capturing weak-est precondition comp...
Abstract. We study a propositional variant of Hoare logic that can be used for reasoning about progr...
The equivalence problem for deterministic context-free languages is shown to be decidable if and onl...
AbstractWe study the computational complexity of decision problems for the class M of monadic recurs...
AbstractIterative monads of Calvin Elgot were introduced to treat the semantics of recursive equatio...
Abstract. We present a novel Hoare-style logic, called Reverse Hoare Logic, which can be used to rea...
This thesis is composed of three separate, yet related strands. They have in common the notion that...
AbstractThe main problem in recursive scheme theory is determining how to solve a scheme and express...
This paper presents general methods for studying the problems of translatability between classes of ...
How can we rigorously prove that an algorithm does what we think it does? Logically verifying progr...
We provide a sound and relatively complete Hoare logic for reasoning about partial correctness of re...
AbstractThis paper studies Hoare's logic for nondeterministic regular programs (with unbounded nonde...
In the following theories a formalization of the Owicki-Gries and the rely-guarantee methods is pres...
The inclusion problem for the class of monadic recursion schemes is shown to be undecidable. The pro...
AbstractThis paper introduces a compositional Hoare logic for reasoning about the partial correctnes...
The Dijkstra and Hoare monads have been introduced recently for capturing weak-est precondition comp...
Abstract. We study a propositional variant of Hoare logic that can be used for reasoning about progr...
The equivalence problem for deterministic context-free languages is shown to be decidable if and onl...
AbstractWe study the computational complexity of decision problems for the class M of monadic recurs...
AbstractIterative monads of Calvin Elgot were introduced to treat the semantics of recursive equatio...
Abstract. We present a novel Hoare-style logic, called Reverse Hoare Logic, which can be used to rea...
This thesis is composed of three separate, yet related strands. They have in common the notion that...
AbstractThe main problem in recursive scheme theory is determining how to solve a scheme and express...
This paper presents general methods for studying the problems of translatability between classes of ...
How can we rigorously prove that an algorithm does what we think it does? Logically verifying progr...
We provide a sound and relatively complete Hoare logic for reasoning about partial correctness of re...
AbstractThis paper studies Hoare's logic for nondeterministic regular programs (with unbounded nonde...
In the following theories a formalization of the Owicki-Gries and the rely-guarantee methods is pres...
The inclusion problem for the class of monadic recursion schemes is shown to be undecidable. The pro...
AbstractThis paper introduces a compositional Hoare logic for reasoning about the partial correctnes...