[HTML][HTML] Segmented Tau approximation for a forward–backward functional differential equation
C Da Silva, R Escalante - Computers & Mathematics with Applications, 2011 - Elsevier
A new approach to numerically solve the forward–backward functional differential equation
is presented, where a, b, and c are constant parameters. The step by step version of the Tau …
is presented, where a, b, and c are constant parameters. The step by step version of the Tau …
Segmented tau approximation for test neutral functional differential equations
LF Cordero, R Escalante - Applied mathematics and computation, 2007 - Elsevier
We use the segmented formulation of the Tau method to approximate the solutions of the
neutral delay differential equationwhich represents, for different values of a, b, c and τ, a …
neutral delay differential equationwhich represents, for different values of a, b, c and τ, a …
Improving the accuracy of chebyshev tau method for nonlinear differential problems
The spectral properties convergence of the Tau method allow to obtain good approximate
solutions for linear differential problems advantageously. However, for nonlinear differential …
solutions for linear differential problems advantageously. However, for nonlinear differential …
[PDF][PDF] El método Tau de Lanczos para aproximaciones segmentadas
R Escalante - researchgate.net
Muchas funciones se encuentran definidas en términos de un desarrollo en serie infinito, o
bien, por un operador diferencial o integral. Tales definiciones resultan útiles al establecer …
bien, por un operador diferencial o integral. Tales definiciones resultan útiles al establecer …
Segmented Tau Approximation for a Non-Autonomous Functional Differential Equation of Mixed Type
C Da Silva, R Escalante - arXiv preprint arXiv:1608.00330, 2016 - arxiv.org
The segmented formulation of the Tau method is used to numerically solve the non-
autonomous forward-backward functional differential equation x'(t)= a (t) x (t)+ b (t) x (t-1)+ c …
autonomous forward-backward functional differential equation x'(t)= a (t) x (t)+ b (t) x (t-1)+ c …