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http://dx.doi.org/10.4134/CKMS.c170135

STABILITY OF HAHN DIFFERENCE EQUATIONS IN BANACH ALGEBRAS  

Abdelkhaliq, Marwa M. (Basic Science Department Pyramids Higher Institute for Engineering and Technology)
Hamza, Alaa E. (Department of Mathematics Faculty of Science University of Jeddah)
Publication Information
Communications of the Korean Mathematical Society / v.33, no.4, 2018 , pp. 1141-1158 More about this Journal
Abstract
Hahn difference operator $D_{q,{\omega}}$ which is defined by $$D_{q,{\omega}}g(t)=\{{\frac{g(gt+{\omega})-g(t)}{t(g-1)+{\omega}}},{\hfill{20}}\text{if }t{\neq}{\theta}:={\frac{\omega}{1-q}},\\g^{\prime}({\theta}),{\hfill{83}}\text{if }t={\theta}$$ received a lot of interest from many researchers due to its applications in constructing families of orthogonal polynomials and in some approximation problems. In this paper, we investigate sufficient conditions for stability of the abstract linear Hahn difference equations of the form $$D_{q,{\omega}}x(t)=A(t)x(t)+f(t),\;t{\in}I$$, and $$D^2{q,{\omega}}x(t)+A(t)D_{q,{\omega}}x(t)+R(t)x(t)=f(t),\;t{\in}I$$, where $A,R:I{\rightarrow}{\mathbb{X}}$, and $f:I{\rightarrow}{\mathbb{X}}$. Here ${\mathbb{X}}$ is a Banach algebra with a unit element e and I is an interval of ${\mathbb{R}}$ containing ${\theta}$.
Keywords
Hahn difference operator; Jackson q-difference operator; stability theory;
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