Uniform difference method for singularly pertubated delay Sobolev problems

“…A. B. Chiyaneh and H. Duru [17,18] have formulated difference schemes to resolve singularly perturbed Sobolev initial-boundary value problems with time-delay parameter. S. Elango et.…”

A second-order numerical method for pseudo-parabolic equations having both layer behavior and delay argument

“…A. B. Chiyaneh and H. Duru [17,18] have formulated difference schemes to resolve singularly perturbed Sobolev initial-boundary value problems with time-delay parameter. S. Elango et.…”

A second-order numerical method for pseudo-parabolic equations having both layer behavior and delay argument

“…This fact has aroused the interest of researchers to construct numerical methods for solving DSEs. For example, Okcu and Amiraliyev [20] derived a fourth‐order differential‐difference scheme for DSEs and obtained the error estimate of the scheme, Amiraliyev et al [21] considered a finite difference method for solving linear DSEs, Chiyaneh and Duru [22, 23] dealt with two finite difference methods based on the adaptive and uniform meshes, respectively, for solving linear singularly perturbed DSEs, Amirali [24] gave the error estimate of a higher order difference method for a class of linear DSEs, and Zhang and Tan [25] studied linearized compact difference methods (LCDMs) combined with Richardson extrapolation for solving one‐dimensional (1D) and two‐dimensional (2D) nonlinear DSEs.…”

“…This fact has aroused the interest of researchers to construct numerical methods for solving DSEs. For example, Okcu and Amiraliyev [20] derived a fourth-order differential-difference scheme for DSEs and obtained the error estimate of the scheme, Amiraliyev et al [21] considered a finite difference method for solving linear DSEs, Chiyaneh and Duru [22,23] Numer Methods Partial Differential Eq. 2023;39:2141-2162. wileyonlinelibrary.com/journal/num © 2022 Wiley Periodicals LLC.…”

Linearized compact difference methods for solving nonlinear Sobolev equations with distributed delay

“…The authors proposed a finite difference scheme, which is proved to be ε -uniformly convergent of order two. The singularly perturbed time delay problems have been extensively studied in Ansari et al (2007), Chiyaneh and Durus (2019), Chiyaneh and Duru (2020), Das and Natesan (2015), Das and Natesan (2018), Govindarao et al (2019), Govindarao and Mohapatra (2019), Gowrisankar and Natesan (2017), Kaushik and Sharma (2012), Kumar and Kumar (2014), Kumar and Kumari (2019) and Rai and Yadav (2020). The differential equation arisen in modeling a furnace, which is used for processing metal sheets, is a striking example of singularly perturbed problems with a time delay (Ansari et al , 2007): For wide range of examples of time delay partial differential equation models, one can refer (Wu, 1996).…”

“…The authors also proved that the proposed method was better than the existing methods. Chiyaneh and Durus (2019) approximated the singularly perturbed delay Sobolov equations using a finite difference scheme on a B-mesh. The proposed method has ε -uniform convergence of order two in both space and time variable.…”

A higher order scheme for singularly perturbed delay parabolic turning point problem