The Iterative Properties for Positive Solutions of a Tempered Fractional Equation

Abstract: In this article, we investigate the iterative properties of positive solutions for a tempered fractional equation under the case where the boundary conditions and nonlinearity all involve tempered fractional derivatives of unknown functions. By weakening a basic growth condition, some new and complete results on the iterative properties of the positive solutions to the equation are established, which include the uniqueness and existence of positive solutions, the iterative sequence converging to the unique sol… Show more

“…For instance, in the field of mathematical biology, certain models incorporate oscillation and/or delay effects through the utilization of cross-diffusion terms. For further exploration of this topic, please refer to the papers [28][29][30][31][32][33][34][35]. This work encompasses the examination of differential equations due to their relevance in addressing various real-world phenomena, such as non-Newtonian fluid theory and the turbulent flow of a polytrophic gas in a porous media.…”

Iterative Hille‐type oscillation criteria of half‐linear advanced dynamic equations of second order

“…For instance, in the field of mathematical biology, certain models incorporate oscillation and/or delay effects through the utilization of cross-diffusion terms. For further exploration of this topic, please refer to the papers [28][29][30][31][32][33][34][35]. This work encompasses the examination of differential equations due to their relevance in addressing various real-world phenomena, such as non-Newtonian fluid theory and the turbulent flow of a polytrophic gas in a porous media.…”

Iterative Hille‐type oscillation criteria of half‐linear advanced dynamic equations of second order

“…where 0 < α ≤ 1, 1 < β ≤ 2. In the past twenty years, there has been a growing interest in the profit derived from advancing space theories [18][19][20], regular theories [21][22][23][24][25], operator methods [26][27][28][29][30], iterative techniques [31][32][33], the moving sphere method [34], critical point theories [35][36][37][38], and tempered fractional calculus. This surge in attention has not only propelled the rapid progress of these disciplines, but has also spurred corresponding contributions across various fields.…”

A Singular Tempered Sub-Diffusion Fractional Model Involving a Non-Symmetrically Quasi-Homogeneous Operator

“…There are usually three definitions of fractional calculus: Riemann-Liouville fractional calculus, Grünwald-Letnikov's fractional calculus, and Caputo fractional calculus. In recent years, many studies have focused on the existence, regularity, and convergence of solutions to fractional differential equations [3][4][5][6]. However, it is difficult to obtain analytical solutions for fractional differential equations or fractional integral differential equations.…”

An Efficient Numerical Method Based on Bell Wavelets for Solving the Fractional Integro-Differential Equations with Weakly Singular Kernels