Title :
Computing semi-algebraic invariants for polynomial dynamical systems
Author :
Liu, Jiang ; Zhan, Naijun ; Zhao, Hengjun
Author_Institution :
State Key Lab. of Comp. Sci., China
Abstract :
In this paper, we consider an extended concept of invariant for polynomial dynamical systems (PDSs) with domain and initial condition, and establish a sound and complete criterion for checking semi-algebraic invariants (SAIs) for such PDSs. The main idea is encoding relevant dynamical properties as conditions on the high order Lie derivatives of polynomials occurring in the SAI. A direct consequence of this criterion is a relatively complete method of SAI generation based on template assumption and semi-algebraic constraint solving. Relative completeness means if there is an SAI in the form of a predefined template, then our method can indeed find one.
Keywords :
Lie algebras; encoding; formal verification; polynomials; PDS; SAI generation; encoding; high order Lie derivatives; polynomial dynamical systems; semialgebraic constraint solving; semialgebraic invariants; template assumption; Mathematical model; Polynomials; Safety; Software; Trajectory; Vectors; Invariant; Polynomial dynamical system; Semi-algebraic set;
Conference_Titel :
Embedded Software (EMSOFT), 2011 Proceedings of the International Conference on
Conference_Location :
Taipei
Print_ISBN :
978-1-4503-0714-7
