Probabilistic Safety Verification of Stochastic Hybrid Systems Using Barrier Certificates

The problem of probabilistic safety verification of stochastic hybrid systems is to check whether the probability that a given system will reach an unsafe region from certain initial states can be bounded by some given probability threshold. The paper considers stochastic hybrid systems where the behavior is governed by polynomial equalities and inequalities, as for usual hybrid systems, but the initial states follow some stochastic distributions. It proposes a new barrier certificate based method for probabilistic safety verification which guarantees the absolute safety in a infinite time horizon that is beyond the reach of existing techniques using either statistical model checking or probabilistic reachable set computation. It also gives a novel computational approach, by building and solving a constrained optimization problem coming from verification conditions of barrier certificates, to compute the lower bound on safety probabilities which can be compared with the given threshold. Experimental evidence is provided demonstrating the applicability of our approach on several benchmarks.

[1]  Paolo Zuliani,et al.  Probabilistic Hybrid Systems Verification via SMT and Monte Carlo Techniques , 2016, Haifa Verification Conference.

[2]  K. Larsen,et al.  Statistical Model Checking: Past, Present, and Future , 2016, ISoLA.

[3]  Xia Zeng,et al.  Darboux-type barrier certificates for safety verification of nonlinear hybrid systems , 2016, 2016 International Conference on Embedded Software (EMSOFT).

[4]  André Platzer,et al.  A Method for Invariant Generation for Polynomial Continuous Systems , 2016, VMCAI.

[5]  Edmund M. Clarke,et al.  SReach: A Probabilistic Bounded Delta-Reachability Analyzer for Stochastic Hybrid Systems , 2015, CMSB.

[6]  Mahesh Viswanathan,et al.  Statistical model checking: challenges and perspectives , 2015, International Journal on Software Tools for Technology Transfer.

[7]  Michel Kieffer,et al.  Computation of parametric barrier functions for dynamical systems using interval analysis , 2014, 53rd IEEE Conference on Decision and Control.

[8]  Paolo Zuliani,et al.  ProbReach: verified probabilistic delta-reachability for stochastic hybrid systems , 2014, HSCC.

[9]  Martin Fränzle,et al.  Statistical model checking for stochastic hybrid systems involving nondeterminism over continuous domains , 2014, International Journal on Software Tools for Technology Transfer.

[10]  Sriram Sankaranarayanan,et al.  Simulation-guided lyapunov analysis for hybrid dynamical systems , 2014, HSCC.

[11]  Liyun Dai,et al.  Barrier certificates revisited , 2013, J. Symb. Comput..

[12]  Hui Kong,et al.  Exponential-Condition-Based Barrier Certificate Generation for Safety Verification of Hybrid Systems , 2013, CAV.

[13]  Antoine Girard,et al.  Reachability Analysis of Polynomial Systems Using Linear Programming Relaxations , 2012, ATVA.

[14]  Joost-Pieter Katoen,et al.  A compositional modelling and analysis framework for stochastic hybrid systems , 2012, Formal Methods in System Design.

[15]  Thao Dang,et al.  Discretizing Affine Hybrid Automata with Uncertainty , 2011, ATVA.

[16]  André Platzer,et al.  Stochastic Differential Dynamic Logic for Stochastic Hybrid Programs , 2011, CADE.

[17]  Lijun Zhang,et al.  Measurability and safety verification for stochastic hybrid systems , 2011, HSCC '11.

[18]  Lijun Zhang,et al.  Safety Verification for Probabilistic Hybrid Systems , 2010, Eur. J. Control.

[19]  M. Buss,et al.  Stochastic reachable sets of interacting traffic participants , 2008, 2008 IEEE Intelligent Vehicles Symposium.

[20]  George J. Pappas,et al.  A Framework for Worst-Case and Stochastic Safety Verification Using Barrier Certificates , 2007, IEEE Transactions on Automatic Control.

[21]  Marta Z. Kwiatkowska,et al.  Symbolic model checking for probabilistic timed automata , 2007, Inf. Comput..

[22]  Stefan Ratschan,et al.  Safety verification of hybrid systems by constraint propagation-based abstraction refinement , 2007, TECS.

[23]  A. Agung Julius,et al.  Approximate Abstraction of Stochastic Hybrid Automata , 2006, HSCC.

[24]  D. Henrion,et al.  Solving polynomial static output feedback problems with PENBMI , 2005, Proceedings of the 44th IEEE Conference on Decision and Control.

[25]  George J. Pappas,et al.  Stochastic safety verification using barrier certificates , 2004, 2004 43rd IEEE Conference on Decision and Control (CDC) (IEEE Cat. No.04CH37601).

[26]  Manuela L. Bujorianu,et al.  Extended Stochastic Hybrid Systems and Their Reachability Problem , 2004, HSCC.

[27]  Joao P. Hespanha,et al.  Stochastic Hybrid Systems: Application to Communication Networks , 2004, HSCC.

[28]  John Lygeros,et al.  A Stochastic Hybrid Model for Air Traffic Control Simulation , 2004, HSCC.

[29]  Ali Jadbabaie,et al.  Safety Verification of Hybrid Systems Using Barrier Certificates , 2004, HSCC.

[30]  John Lygeros,et al.  Reachability Questions in Piecewise Deterministic Markov Processes , 2003, HSCC.

[31]  Jeremy Sproston Decidable Model Checking of Probabilistic Hybrid Automata , 2000, FTRTFT.

[32]  S. Sastry,et al.  Towars a Theory of Stochastic Hybrid Systems , 2000, HSCC.

[33]  Thomas A. Henzinger,et al.  The Algorithmic Analysis of Hybrid Systems , 1995, Theor. Comput. Sci..

[34]  João Pedro Hespanha,et al.  Modeling and analysis of networked control systems using stochastic hybrid systems , 2014, Annu. Rev. Control..

[35]  Xin Chen,et al.  Lyapunov Function Synthesis Using Handelman Representations , 2013, NOLCOS.

[36]  N-DIMENSIONAL CUMULATIVE FUNCTION, AND OTHER USEFUL FACTS ABOUT GAUSSIANS AND NORMAL DENSITIES by Michaël Bensimhoun (reviewed by David Arnon) , 2013 .

[37]  Thao Dang,et al.  Reachability Analysis for Polynomial Dynamical Systems Using the Bernstein Expansion , 2012, Reliab. Comput..

[38]  Joost-Pieter Katoen,et al.  Approximate Model Checking of Stochastic Hybrid Systems , 2010, Eur. J. Control.