In recent years, many new definitions of fractional derivatives have been proposed and used
to develop mathematical models for a wide variety of real-world systems containing memory …

A compartmental mathematical model of spreading COVID-19 disease in Wuhan, China is
applied to investigate the pandemic behaviour in Iran. This model is a system of seven …

This paper proposes a personalized music recommendation method based on
multidimensional time‐series analysis, which can improve the effect of music …

This paper proposes a truncated fractional-derivative constitutive model to consider the non-
locality of non-Newtonian fluids. The single relaxation time lattice Boltzmann method (SRT …

Various constitutive models have been proposed to quantify a wide range of non-Newtonian
fluids, but there is lack of a systematic classification and evaluation of these competing …

Abstract Fractional Partial Differential equations (FPDEs) are essential for modeling complex
systems across various scientific and engineering areas. However, efficiently solving FPDEs …

This study has been carried out using a novel mathematical model on the dynamics of
tuberculosis (TB) transmission considering vaccination, endogenous re-activation of the …

This work introduces a new higher-order accurate super compact (HOSC) finite difference
scheme for solving complex unsteady three-dimensional (3D) non-Newtonian fluid flow …

Applications of non-Newtonian fluids have been widespread across industries,
accompanied by theoretical developments in engineering and mathematics. This paper …

Abstract Characterization of nonlocality is an open problem in physics and engineering. This
paper conducts a detailed investigation on two nonlocal models, namely, the fractional …