A5024143180- Holomorphic and Operator Theory
- Functional Equations Stability Results
- graph theory and CDMA systems
- Composite Structure Analysis and Optimization
- Approximation Theory and Sequence Spaces
- Structural Analysis and Optimization
- Fuzzy and Soft Set Theory
- Meromorphic and Entire Functions
- Topology Optimization in Engineering
- Advanced Topics in Algebra
- Mathematics and Applications
- Advanced Differential Equations and Dynamical Systems
- Nonlinear Partial Differential Equations
- Mathematical Approximation and Integration
- Fixed Point Theorems Analysis
- Algebraic and Geometric Analysis
- Spectral Theory in Mathematical Physics
- Mathematical Dynamics and Fractals
- Advanced Mathematical Theories
- semigroups and automata theory
- Advanced Harmonic Analysis Research
Tafila Technical University
2015-2025
Zarqa University
2024
Jordan University of Science and Technology
2024
Along the surface of revolution, this article gives appropriate Lp estimates for generalized Marcinkiewicz integral operators with kernels in Lq(Sn-1), q > 1. Through an extrapolation argument, we establish boundedness to these bounds under weaker kernel assumptions. This not only enlarges applicability but also indicates functional relationships among various transforms. Finally, our findings are a contribution ongoing research on harmonic analysis and applications partial differential equations.
This paper introduces a novel numerical approach for solving fractional stochastic differential equations (FSDEs) using bilinear time-series models, driven by the Caputo–Katugampola (C-K) derivative. The C-K operator generalizes classical derivatives incorporating an additional parameter, enabling enhanced modeling of memory effects and hereditary properties in systems. primary contribution this work is development efficient framework that combines discretization with derivative to...
This paper presents the stress resultants of hyperbolic paraboloidal shells using higher order shear deformation theory recently developed by Zannon [1]-[3]. The equilibrium equations motion use Hamilton’s minimum energy principle for a simply supported cross-ply structure (TSDTZ) [2] [3]. results are calculated orthotropic, two-ply unsymmetrical [90/0] shells. extensional, bending and coupling stiffness parameters MATLAB algorithm laminated composite A comparison present study with other...
<p>In this paper, specific $ L^p estimates for generalized Marcinkiewicz operators correlated to surfaces of revolution are proved. These and the extrapolation procedure Yano employed confirm boundedness above-mentioned integrals under weaker assumptions on singular kernels. Our findings generalize improve several known results.</p>
We consider convergence sets of formal power series the form $f(z,t)=\sum_{n=0}^{\infty} f_n(z)t^n$, where $f_n(z)$ are holomorphic functions on a domain $Ω$ in $\mathbb{C}$. A subset $E$ is said to be set if there $f(z,t)$ such that exactly points $z$ for which converges as single variable $t$ some neighborhood origin. $σ$-convex defined union countable collection polynomially convex compact subsets. prove $\mathbb{C}$ and only it $σ$-convex.
A quadratic stochastic operator (QSO) describes the time evolution of different species in biology.The main problem with regard to a nonlinear is study its behavior.This has not been studied depth; even QSOs, which are simplest operators, have thoroughly.This paper investigates global behavior an taken from ξ (s) -QSO when parameter = 1 2 .Moreover, we local this at each value a, where 0 < 1.
In this paper the quadratic stochastic operators (QSO) were considered, these describe population dynamic system.Some studied by Lotka and Volterra.Moreover, we discuss of some parametric from class ζ (as) -QSO.