The modal μ-calculus μL is a well-known fixpoint logic to express and model check properties interpreted over labeled transition systems. In this paper, we propose two variants of the μ-calculus, μLf and μL?f, for feature transition systems. For this, we explicitly incorporate feature expressions into the logics, allowing operators to select transitions and behavior restricted to specific products and subfamilies. We provide semantics for μLf and μL?f and relate the two new μ-calculi and μL to each other. Next, we focus on the analysis of SPL behavior and show how our formalism can be applied for product-based verification with μLf as well as family-based verification with μL?f. We illustrate by means of a toy example how properties can be ...
When analyzing the behavior of finite-state concurrent systems by model checking, one way of fightin...
AbstractThe π-calculus is one of the most important mobile process calculi and has been well studied...
Model-checking is a successful technique for automatically verifying concurrent finite-state systems...
\u3cp\u3eThe modal μ-calculus μL is a well-known fixpoint logic to express and model check propertie...
\u3cp\u3eFamily-based model checking targets the simultaneous verfication of multiple system variant...
\u3cp\u3eWe discuss how the general-purpose model checker mCRL2 can be used for family-based verific...
AbstractWe propose a procedure for automatically verifying properties (expressed in an extension of ...
International audienceModal mu-calculus is an expressive specification formalism for temporal proper...
We propose a procedure for automatically verifying properties (expressed in an extension of the moda...
Abstract. Modal µ-calculus is an expressive specification formalism for temporal properties of concu...
AbstractThis note presents a straightforward algorithm for checking whether or not a state of a labe...
AbstractModel-checking is a successful technique for automatically verifying concurrent finite-state...
The π-calculus is one of the most important mobile process calculi and has been well studied in the ...
The higher-dimensional modal µ-calculus is an extension of the µ-calculus in which formulas are inte...
When analyzing the behavior of finite-state concurrent systems by model checking, one way of fightin...
AbstractThe π-calculus is one of the most important mobile process calculi and has been well studied...
Model-checking is a successful technique for automatically verifying concurrent finite-state systems...
\u3cp\u3eThe modal μ-calculus μL is a well-known fixpoint logic to express and model check propertie...
\u3cp\u3eFamily-based model checking targets the simultaneous verfication of multiple system variant...
\u3cp\u3eWe discuss how the general-purpose model checker mCRL2 can be used for family-based verific...
AbstractWe propose a procedure for automatically verifying properties (expressed in an extension of ...
International audienceModal mu-calculus is an expressive specification formalism for temporal proper...
We propose a procedure for automatically verifying properties (expressed in an extension of the moda...
Abstract. Modal µ-calculus is an expressive specification formalism for temporal properties of concu...
AbstractThis note presents a straightforward algorithm for checking whether or not a state of a labe...
AbstractModel-checking is a successful technique for automatically verifying concurrent finite-state...
The π-calculus is one of the most important mobile process calculi and has been well studied in the ...
The higher-dimensional modal µ-calculus is an extension of the µ-calculus in which formulas are inte...
When analyzing the behavior of finite-state concurrent systems by model checking, one way of fightin...
AbstractThe π-calculus is one of the most important mobile process calculi and has been well studied...
Model-checking is a successful technique for automatically verifying concurrent finite-state systems...