Polygonal hybrid systems are a subclass of planar hybrid automata which can be represented by piecewise constant differential inclusions. Here, we identify and compute an important object of such systems’ phase portrait, namely invariance kernels. An invariant set is a set of initial points of trajectories which keep rotating in a cycle forever and the invariance kernel is the largest of such sets. We show that this kernel is a non-convex polygon and we give a non-iterative algorithm for computing the coordinates of its vertices and edges. Moreover, we present a breadth-first search algorithm for solving the reachability problem for such systems. Invariance kernels play an important role in the algorithm.peer-reviewe
The problem of determining invariance kernels for planar single-input nonlinear systems is considere...
Hybrid systems are systems that exhibit both discrete and continuous behavior. Reachability, the que...
Hybrid systems combining discrete and continuous dynamics arise as mathematical models of various ar...
Polygonal hybrid systems are a subclass of planar hybrid automata which can be represented by piecew...
AbstractPolygonal differential inclusion systems (SPDI) are a subclass of planar hybrid automata whi...
A polygonal differential inclusion system (SPDI) is a non-deterministic planar hybrid system which c...
Polygonal differential inclusion systems (SPDI) are a subclass of planar hybrid automata which can b...
AbstractIn this work we are concerned with the formal verification of two-dimensional non-determinis...
International audienceIn this work we are concerned with the formal verification of two-dimensional ...
Polygonal hybrid systems (SPDI) are a subclass of planar hybrid automata which can be represented by...
Polygonal hybrid systems are a subclass of planar hybrid automata which can be represented by piece...
Polygonal hybrid systems (SPDI) are a subclass of planar hybrid automata which can be represented by...
The reachability problem as well as the computation of the phase portrait for the class of planar hy...
Polygonal hybrid systems (SPDIs) are planar hybrid systems, whose dynamics are defined in terms of c...
Polygonal hybrid systems (SPDIs) are planar hybrid systems, whose dynamics are defined in terms of c...
The problem of determining invariance kernels for planar single-input nonlinear systems is considere...
Hybrid systems are systems that exhibit both discrete and continuous behavior. Reachability, the que...
Hybrid systems combining discrete and continuous dynamics arise as mathematical models of various ar...
Polygonal hybrid systems are a subclass of planar hybrid automata which can be represented by piecew...
AbstractPolygonal differential inclusion systems (SPDI) are a subclass of planar hybrid automata whi...
A polygonal differential inclusion system (SPDI) is a non-deterministic planar hybrid system which c...
Polygonal differential inclusion systems (SPDI) are a subclass of planar hybrid automata which can b...
AbstractIn this work we are concerned with the formal verification of two-dimensional non-determinis...
International audienceIn this work we are concerned with the formal verification of two-dimensional ...
Polygonal hybrid systems (SPDI) are a subclass of planar hybrid automata which can be represented by...
Polygonal hybrid systems are a subclass of planar hybrid automata which can be represented by piece...
Polygonal hybrid systems (SPDI) are a subclass of planar hybrid automata which can be represented by...
The reachability problem as well as the computation of the phase portrait for the class of planar hy...
Polygonal hybrid systems (SPDIs) are planar hybrid systems, whose dynamics are defined in terms of c...
Polygonal hybrid systems (SPDIs) are planar hybrid systems, whose dynamics are defined in terms of c...
The problem of determining invariance kernels for planar single-input nonlinear systems is considere...
Hybrid systems are systems that exhibit both discrete and continuous behavior. Reachability, the que...
Hybrid systems combining discrete and continuous dynamics arise as mathematical models of various ar...