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Results:
1-10
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Results: 10
Authors:
Camilli, F
Grune, L
Wirth, F
Citation: F. Camilli et al., A generalization of Zubov's method to perturbed systems, SIAM J CON, 40(2), 2001, pp. 496-515
Authors:
Grune, L
Citation: L. Grune, Persistence of attractors for one-step discretization of ordinary differential equations, IMA J NUM A, 21(3), 2001, pp. 751-767
Authors:
Grune, L
Kloeden, PE
Citation: L. Grune et Pe. Kloeden, Higher order numerical schemes for affinely controlled nonlinear systems, NUMER MATH, 89(4), 2001, pp. 669-690
Authors:
Grune, L
Kloeden, PE
Citation: L. Grune et Pe. Kloeden, Discretization, inflation and perturbation of attractors, ERGODIC THEORY, ANALYSIS, AND EFFICIENT SIMULATION OF DYNAMICAL SYSTEMS, 2001, pp. 399-416
Authors:
Grune, L
Citation: L. Grune, Homogeneous state feedback stabilization of homogenous systems, SIAM J CON, 38(4), 2000, pp. 1288-1308
Authors:
Camilli, F
Grune, L
Citation: F. Camilli et L. Grune, Numerical approximation of the maximal solutions for a class of degenerateHamilton-Jacobi equations, SIAM J NUM, 38(5), 2000, pp. 1540-1560
Authors:
Grune, L
Citation: L. Grune, Convergence rates of perturbed attracting sets with vanishing perturbation, J MATH ANAL, 244(2), 2000, pp. 369-392
Authors:
Grune, L
Sontag, ED
Wirth, FR
Citation: L. Grune et al., Asymptotic stability equals exponential stability, and ISS equals finite energy gain - if you twist your eyes, SYST CONTR, 38(2), 1999, pp. 127-134
Authors:
Grune, L
Citation: L. Grune, Input-to-state stability of exponentially stabilized semilinear control systems with inhomogeneous perturbations, SYST CONTR, 38(1), 1999, pp. 27-35
Authors:
Grune, L
Wirth, F
Citation: L. Grune et F. Wirth, Feedback stabilization of discrete-time homogeneous semi-linear systems, SYST CONTR, 37(1), 1999, pp. 19-30
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