In this paper we present a novel approach for solving Boolean equation systems with nested minimal and maximal fixpoints. The method works by successively eliminating variables and reducing a Boolean equation system similar to Gauß elimination for linear equation systems. It does not require backtracking techniques. Within one framework we suggest a global and a local algorithm. In the context of model checking in the modal-calculus the local algorithm is related to the tableau methods, but has a better worst case complexity
AbstractWe describe a method for translating a satisfaction problem of the modal μ-calculus into a p...
We propose a procedure for automatically verifying properties (expressed in an extension of the moda...
Boolean Equation Systems are a useful formalism for modeling various verification problems of finite...
ABSTRACT In this paper we present anovel approach for solving Boolean equation systems with nested m...
In this paper we present a novel approach for solving Boolean equation systems with nested minimal a...
Abstract Boolean equation system are a useful tool for verifying formulas from modal mu-calculus on ...
Boolean equation system are a useful tool for verifying formulas from modal mu-calculus on transitio...
Boolean equation systems are ordered sequences of Boolean equations decorated with least and greates...
We present a new technique for the automatic verification of first order modal µ-calculus formulae o...
We propose an algorithm for the automatic verification of first-order modal µ-calculus formulae on i...
Given a boolean equation system E and one of its bound variables X init , we propose a local algori...
We present a general theory of abstraction for a variety of verification problems. Our theory is set...
We present a theory of abstraction for the framework of parameterised Boolean equation systems, a fi...
AbstractWe propose a procedure for automatically verifying properties (expressed in an extension of ...
AbstractWe discuss an algebraic method for model checking in the modal μ-calculus over finite state ...
AbstractWe describe a method for translating a satisfaction problem of the modal μ-calculus into a p...
We propose a procedure for automatically verifying properties (expressed in an extension of the moda...
Boolean Equation Systems are a useful formalism for modeling various verification problems of finite...
ABSTRACT In this paper we present anovel approach for solving Boolean equation systems with nested m...
In this paper we present a novel approach for solving Boolean equation systems with nested minimal a...
Abstract Boolean equation system are a useful tool for verifying formulas from modal mu-calculus on ...
Boolean equation system are a useful tool for verifying formulas from modal mu-calculus on transitio...
Boolean equation systems are ordered sequences of Boolean equations decorated with least and greates...
We present a new technique for the automatic verification of first order modal µ-calculus formulae o...
We propose an algorithm for the automatic verification of first-order modal µ-calculus formulae on i...
Given a boolean equation system E and one of its bound variables X init , we propose a local algori...
We present a general theory of abstraction for a variety of verification problems. Our theory is set...
We present a theory of abstraction for the framework of parameterised Boolean equation systems, a fi...
AbstractWe propose a procedure for automatically verifying properties (expressed in an extension of ...
AbstractWe discuss an algebraic method for model checking in the modal μ-calculus over finite state ...
AbstractWe describe a method for translating a satisfaction problem of the modal μ-calculus into a p...
We propose a procedure for automatically verifying properties (expressed in an extension of the moda...
Boolean Equation Systems are a useful formalism for modeling various verification problems of finite...