We study a syntax for specifying quantitative assertions—functions mapping program states to numbers—for probabilistic program verification. We prove that our syntax is expressive in the following sense: Given any probabilistic program C, if a function f is expressible in our syntax, then the function mapping each initial state σ to the expected value of evaluated in the final states reached after termination of C on σ (also called the weakest preexpectation wp[C](f)) is also expressible in our syntax. As a consequence, we obtain a relatively complete verification system for reasoning about expected values and probabilities in the sense of Cook: Apart from proving a single inequality between two functions given by syntactic expressions i...
Abstract. We present static analyses for probabilistic loops using expectation in-variants. Probabil...
Probabilistic predicate transformers provide a semantics for imperative programs containing both dem...
AbstractOf all scientific investigations into reasoning with uncertainty and chance, probability the...
We study a syntax for specifying quantitative “assertions” - functions mapping program states to num...
International audienceResearch on deductive verification of probabilistic programs has considered ex...
We study quantitative reasoning about probabilistic programs. In doing so, we investigate two main a...
This paper presents a quantitative program verification infrastructure for discrete probabilistic pr...
Current needs in the verification of systems evolve from boolean properties to finer quantitative pr...
The weakest pre-expectation calculus [20] has been proved to be a mature theory to analyze quan-tita...
Probability, be it inherent or explicitly introduced, has become an important issue in the verificat...
In this thesis we consider sequential probabilistic programs. Such programsare a means to model rand...
Traditional assertions express correctness properties that must hold on every program execution. How...
Morgan and McIver's weakest pre-expectation framework is one of the most well-established methods fo...
AbstractProbabilistic annotations generalise standard Hoare Logic [20] to quantitative properties of...
Probabilistic annotations generalise standard Hoare Logic [20] to quantitative properties of probabi...
Abstract. We present static analyses for probabilistic loops using expectation in-variants. Probabil...
Probabilistic predicate transformers provide a semantics for imperative programs containing both dem...
AbstractOf all scientific investigations into reasoning with uncertainty and chance, probability the...
We study a syntax for specifying quantitative “assertions” - functions mapping program states to num...
International audienceResearch on deductive verification of probabilistic programs has considered ex...
We study quantitative reasoning about probabilistic programs. In doing so, we investigate two main a...
This paper presents a quantitative program verification infrastructure for discrete probabilistic pr...
Current needs in the verification of systems evolve from boolean properties to finer quantitative pr...
The weakest pre-expectation calculus [20] has been proved to be a mature theory to analyze quan-tita...
Probability, be it inherent or explicitly introduced, has become an important issue in the verificat...
In this thesis we consider sequential probabilistic programs. Such programsare a means to model rand...
Traditional assertions express correctness properties that must hold on every program execution. How...
Morgan and McIver's weakest pre-expectation framework is one of the most well-established methods fo...
AbstractProbabilistic annotations generalise standard Hoare Logic [20] to quantitative properties of...
Probabilistic annotations generalise standard Hoare Logic [20] to quantitative properties of probabi...
Abstract. We present static analyses for probabilistic loops using expectation in-variants. Probabil...
Probabilistic predicate transformers provide a semantics for imperative programs containing both dem...
AbstractOf all scientific investigations into reasoning with uncertainty and chance, probability the...