Modified One-Leg $\theta$-Methods for Linear Neutral Pantograph Equations with Multiple Delay Terms
DOI:
https://doi.org/10.4208/aamm.OA-2025-0002Keywords:
Neutral pantograph equations, multiple proportional delays, modified one-leg $\theta$-methods, geometric grid, asymptotic stabilityAbstract
In this paper, by combining the modified one-leg $\theta$-methods with linear interpolation, a new class of one-leg $\theta$-methods for solving initial value problems of neutral pantograph equations with multiple delay terms is presented. Our new approach, which is based on a geometric grid, exhibits better asymptotic stability compared to traditional $\theta$-methods. Under appropriate conditions, we prove, using the joint spectral radius method, that the proposed methods are asymptotically stable if and only if $0 < \theta \leq 1$. This indicates that the new methods overcome the limitation of the traditional $\theta$-methods, which require $\frac{1}{2} \leq \theta \leq 1$ to ensure asymptotic stability. Furthermore, several numerical experiments are provided to validate our theoretical results.
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