Abstract
We study changes of variable, called time transformations, which reduce a delay differential equation (DDE) with a variable non-vanishing delay and an unbounded lag function to another DDE with a constant delay. By using this reduction, we can easily obtain a superconvergent integration of the original equation, even in the case of a non-strictly-increasing lag function, and study the type of decay to zero of solutions of scalar linear non-autonomous equations with a strictly increasing lag function.
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Brunner, H., & Maset, S. (2009). Time transformations for delay differential equations. Discrete and Continuous Dynamical Systems, 25(3), 751–775. https://doi.org/10.3934/dcds.2009.25.751
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