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FOSSACS
2009
Springer

Normal Bisimulations in Calculi with Passivation

14 years 7 months ago
Normal Bisimulations in Calculi with Passivation
Behavioral theory for higher-order process calculi is less well developed than for first-order ones such as the π-calculus. In particular, effective coinductive characterizations of barbed congruence, such as the notion of normal bisimulation developed by Sangiorgi for the higherorder π-calculus, are difficult to obtain. In this paper, we study bisimulations in two simple higher-order calculi with a passivation operator, that allows the interruption and thunkification of a running process. We develop a normal bisimulation that characterizes barbed congruence, in the strong and weak cases, for the first calculus which has no name restriction operator. We then show that this result does not hold in the calculus extended with name restriction.
Sergueï Lenglet, Alan Schmitt, Jean-Bernard S
Added 19 May 2010
Updated 19 May 2010
Type Conference
Year 2009
Where FOSSACS
Authors Sergueï Lenglet, Alan Schmitt, Jean-Bernard Stefani
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