Title :
The Computational Meaning of Probabilistic Coherence Spaces
Author :
Ehrhard, Thomas ; Pagani, Michele ; Tasson, Christine
Author_Institution :
Lab. PPS, Univ. Paris Diderot, Paris, France
Abstract :
We study the probabilistic coherent spaces - a denotational semantics interpreting programs by power series with non negative real coefficients. We prove that this semantics is adequate for a probabilistic extension of the untyped λ-calculus: the probability that a term reduces to ahead normal form is equal to its denotation computed on a suitable set of values. The result gives, in a probabilistic setting, a quantitative refinement to the adequacy of Scott´s model for untyped λ-calculus.
Keywords :
pi calculus; probability; programming language semantics; Scott´s model; denotational semantic interpreting programs; nonnegative real coefficients; power series; probabilistic coherent spaces; untyped λ-calculus; Coherence; Computational modeling; Equations; Indexes; Mathematical model; Probabilistic logic; Semantics; Adequacy Theorem; Coherence Spaces; Denotational Semantics; Linear Logic; Probabilistic Lambda Calculus;
Conference_Titel :
Logic in Computer Science (LICS), 2011 26th Annual IEEE Symposium on
Conference_Location :
Toronto, ON
Print_ISBN :
978-1-4577-0451-2
Electronic_ISBN :
1043-6871
DOI :
10.1109/LICS.2011.29
