Characterising small solutions in delay differential equations through numerical approximations
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[1] L. Collatz. The numerical treatment of differential equations , 1961 .
[2] S. M. Verduyn Lljnel. Series Expansions and Small Solutions for Volterra Equations of Convolution Type , 1990 .
[3] Christopher T. H. Baker,et al. A Bibliography on the Numerical Solution of Delay Differential Equations , 2000 .
[4] Dirk Roose,et al. Numerical bifurcation analysis of delay differential equations with state-dependent delay , 2001 .
[5] Yulin Cao,et al. The discrete Lyapunov function for scalar differential delay equations , 1990 .
[6] M. N. Spijker,et al. The stability of the θ-methods in the numerical solution of delay differential equations , 1990 .
[7] Daniel B. Henry,et al. Small solutions of linear autonomous functional differential equations , 1970 .
[8] Dirk Roose,et al. Numerical bifurcation Analysis of differential equations with State-Dependent Delay , 2001, Int. J. Bifurc. Chaos.
[9] Jack K. Hale,et al. Introduction to Functional Differential Equations , 1993, Applied Mathematical Sciences.
[10] S. M. Verduyn Lunel. A sharp version of Henry's theorem on small solutions , 1986 .
[11] G. M.,et al. Partial Differential Equations I , 2023, Applied Mathematical Sciences.
[12] M. Ainsworth. Theory and numerics of ordinary and partial differential equations , 1995 .
[13] S. M. Verduyn Lunel. About Completeness for a Class of Unbounded Operators , 1995 .