Abstract
In this paper, we rigorously prove the existence of a non-trivial periodic orbit for the nonlinear DDE: $x'(t) = - K \sin(x(t-1))$ for $K=1.6$. We show that the equations for the Fourier coefficients have a solution by computing the local Brouwer degree. This degree can be computed by using a homotopy, and its validity can be proved by checking a finite number of inequalities. Checking these inequalities is done by a computer program.
Citation
Mikołaj Zalewski. "Computer-assisted proof of a periodic solution in a nonlinear feedback DDE." Topol. Methods Nonlinear Anal. 33 (2) 373 - 393, 2009.
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