Determination of Inner and Outer Bounds of Reachable Sets

The computation of the reachable set of states of a given dynamic system is an important step to verify its safety during operation. There are different methods of computing reachable sets, namely interval integration, capture basin, methods involving the minimum time to reach function, and level set methods. This work deals with interval integration to compute subpavings to over or under approximate reachable sets of low dimensional systems. The main advantage of this method is that, compared to guaranteed integration, it allows to control the amount of over-estimation at the cost of increased computational effort. An algorithm to over and under estimate sets through subpavings, which potentially reduces the computational load when the test function or the contractor is computationally heavy, is implemented and tested. This algorithm is used to compute inner and outer approximations of reachable sets. The test function and the contractors used in this work to obtain the subpavings involve guaranteed integration, provided either by the Euler method or by another guaranteed integration method. The methods developed were applied to compute inner and outer approximations of reachable sets for the double integrator example. From the results it was observed that using contractors instead of test functions yields much tighter results. It was also confirmed that for a given minimum box size there is an optimum time step such that with a greater or smaller time step worse results are obtained.

[1]  Siegfried M. Rump,et al.  INTLAB - INTerval LABoratory , 1998, SCAN.

[2]  Nedialko S. Nedialkov,et al.  An Interval Hermite-Obreschkoff Method for Computing Rigorous Bounds on the Solution of an Initial Value Problem for an Ordinary Differential Equation , 1998, SCAN.

[3]  T. Csendes Developments in Reliable Computing , 2000 .

[4]  Luc Jaulin,et al.  Applied Interval Analysis , 2001, Springer London.

[5]  John D. Pryce,et al.  An Effective High-Order Interval Method for Validating Existence and Uniqueness of the Solution of an IVP for an ODE , 2001, Reliab. Comput..

[6]  Pascal Van Hentenryck,et al.  A Constraint Satisfaction Approach for Enclosing Solutions to Parametric Ordinary Differential Equations , 2002, SIAM J. Numer. Anal..

[7]  Alexandre M. Bayen,et al.  A time-dependent Hamilton-Jacobi formulation of reachable sets for continuous dynamic games , 2005, IEEE Transactions on Automatic Control.

[8]  P. Varaiya,et al.  Ellipsoidal Techniques for Hybrid Dynamics: the Reachability Problem , 2005 .

[9]  M. Stadtherr,et al.  Validated solution of ODEs with parametric uncertainties , 2006 .

[10]  Antoine Girard,et al.  Hybridization methods for the analysis of nonlinear systems , 2007, Acta Informatica.

[11]  J. Lygeros,et al.  Neural approximation of PDE solutions: An application to reachability computations , 2006, Proceedings of the 45th IEEE Conference on Decision and Control.

[12]  Nedialko S. Nedialkov,et al.  On Taylor Model Based Integration of ODEs , 2007, SIAM J. Numer. Anal..

[13]  Jan Albert Mulder,et al.  Nonlinear Aircraft Trim Using Interval Analysis , 2007 .

[14]  Jan Albert Mulder,et al.  New Approach for Integer Ambiguity Resolution using Interval Analysis , 2008 .

[15]  Sanjiv Sharma,et al.  AIAA Guidance Navigation and Control Conference, Chicago , 2009 .

[16]  R. Baker Kearfott,et al.  Introduction to Interval Analysis , 2009 .

[17]  Peter J Seiler,et al.  Quantitative local analysis of nonlinear systems using sum-of-squares decompositions (T-1) , 2009 .

[18]  Nacim Meslem,et al.  A Hybrid Bounding Method for Computing an Over-Approximation for the Reachable Set of Uncertain Nonlinear Systems , 2009, IEEE Transactions on Automatic Control.

[19]  E. Weerdt,et al.  Aircraft Attitude Determination Using GPS and an Interval Integer Ambiguity Resolution Algorithm , 2009 .

[20]  Jan Albert Mulder,et al.  Global Fuel Optimization for Constrained Spacecraft Formation Rotations , 2009 .

[21]  E. Weerdt,et al.  Optimization of Human Perception Modeling Using Interval Analysis , 2010 .

[22]  Y. Candau,et al.  Computing reachable sets for uncertain nonlinear monotone systems , 2010 .

[23]  L. Jaulin,et al.  Capture basin approximation using interval analysis , 2011 .

[24]  S. Shankar Sastry,et al.  Reachability Calculations for Vehicle Safety During Manned/Unmanned Vehicle Interaction , 2012 .

[25]  John Lygeros,et al.  Toward 4-D Trajectory Management in Air Traffic Control: A Study Based on Monte Carlo Simulation and Reachability Analysis , 2013, IEEE Transactions on Control Systems Technology.