See also Applied algebraic geometry in Algebraic geometry. --------------------------------------- 18704 Bruno Buchberger: Gröbner bases and systems theory. Multidim. Systems Signal Proc. 12 (2001), 223-251. 18694 Krister Forsman: Construction of Lyapunov functions using Gröbner bases. Internet 1991, 5p. 18700 Krister Forsman: Polycon - computer algebra software for polynomial control systems. Internet 1993, 11p. 18701 Krister Forsman: Some generic results on algebraic observability and connections with realization theory. Internet 1993, 10p. 18702 Krister Forsman: Hybrid control systems and comprehensive Gröbner bases. Internet 1994, 12p. 18703 Krister Forsman: Robot kinematics - a computer exercise in the course "Algebraic methods for systems theory". Internet 1994, 18p. 18695 Ioannis Fotiou/Philipp Rostalski/Pablo Parrilo/Manfred Morari: Parametric optimization and optimal control using algebraic geometry methods. Int. J. Control ... (2006), 25p. Karin Gatermann: Computer algebra methods for equivariant dynamical systems. Springer LN Math. 1728 (2000), 180p. 18879 Johan Gunnarsson: Symbolic methods and tools for discrete event dynamic systems. Thesis Linköping Univ. 1997, 264p. 23273 Zhiping Lin/Li Xu/Qinghe Wu: Applications of Gröbner bases to signal and image processing - a survey. Lin. Alg. Appl. 391 (2004), 169-202. 17566 H. Marchand/M. Le Borgne: Partial order control of discrete event systems modeled as polynomial dynamical systems over Galois fields. INRIA 1997, 37p. Ulrich Oberst: Multidimensional constant linear systems. Acta Appl. Math. 20 (1990), 1-175. 18881 Yves Rouchaleau/Bostwick Wyman/R. Kalman: Algebraic structure of linear dynamical systems III. Realization theory over a commutative ring. Proc. Nat. Ac. Sci. USA 69/11 (1972), 3404-3406. 19589 Uli Walther/Tryphon Georgiou/Allen Tannenbaum: Computational algebraic geometry and switching surfaces in optimal control. Internet 1999, 12p. 19588 Uli Walther/Tryphon Georgiou/Allen Tannenbaum: On the computation of switching surfaces in optimal control - a Gröbner basis approach. IEEE Trans. Autom. Control 46/4 (2001), 534-540.