For a simple probabilistic language we present a semantics based on linear operators on infinite dimensional Hilbert spaces.We show the equivalence of this semantics with a standard operational one and we discuss its relationship with the well-known denotational semantics introduced by Kozen. For probabilistic programs, it is typical to use Banach spaces and their norm topology to model the properties to be analysed (observables). We discuss the advantages in considering instead Hilbert spaces as denotational domains, and we present a weak limit construction of the semantics of probabilistic programs which is based on the inner product structure of this space, i.e. the duality between states and observables
Abstract. In this paper we redefined the definition of a bounded linear op-erator in probabilistic n...
Abstract. We present an approach to probabilistic analysis which is based on program semantics and e...
Probabilistic normed spaces have been redefined by Alsina, Schweizer, and Sklar. We give a detailed ...
Abstract. For a simple probabilistic language we present a semantics based on linear operators on in...
AbstractThis paper presents two complementary but equivalent semantics for a high level probabilisti...
Probabilistic programming has many applications in statistics, physics, ... so that all programming ...
We investigate the construction of linear operators representing the semantics of probabilistic prog...
The aims of these lecture notes are two-fold: (i) we investigate the relation between the operationa...
AbstractWe investigate the construction of linear operators representing the semantics of probabilis...
We present an approach to probabilistic analysis which is based on program semantics and exploits th...
We present a new approach to probabilistic logic programs with a possible worlds semantics. Classica...
We introduce a notion of strong monotonicity of probabilistic predicate transformers. This notion en...
This paper presents a Banach space based approach towards a denotational semantics of a probabilisti...
AbstractIn this paper, we consider strongly bounded linear operators on a finite dimensional probabi...
We give an adequate denotational semantics for languages with recursive higher-order types, continuo...
Abstract. In this paper we redefined the definition of a bounded linear op-erator in probabilistic n...
Abstract. We present an approach to probabilistic analysis which is based on program semantics and e...
Probabilistic normed spaces have been redefined by Alsina, Schweizer, and Sklar. We give a detailed ...
Abstract. For a simple probabilistic language we present a semantics based on linear operators on in...
AbstractThis paper presents two complementary but equivalent semantics for a high level probabilisti...
Probabilistic programming has many applications in statistics, physics, ... so that all programming ...
We investigate the construction of linear operators representing the semantics of probabilistic prog...
The aims of these lecture notes are two-fold: (i) we investigate the relation between the operationa...
AbstractWe investigate the construction of linear operators representing the semantics of probabilis...
We present an approach to probabilistic analysis which is based on program semantics and exploits th...
We present a new approach to probabilistic logic programs with a possible worlds semantics. Classica...
We introduce a notion of strong monotonicity of probabilistic predicate transformers. This notion en...
This paper presents a Banach space based approach towards a denotational semantics of a probabilisti...
AbstractIn this paper, we consider strongly bounded linear operators on a finite dimensional probabi...
We give an adequate denotational semantics for languages with recursive higher-order types, continuo...
Abstract. In this paper we redefined the definition of a bounded linear op-erator in probabilistic n...
Abstract. We present an approach to probabilistic analysis which is based on program semantics and e...
Probabilistic normed spaces have been redefined by Alsina, Schweizer, and Sklar. We give a detailed ...