论文标题
关于差方程的有界解决方案$ x_ {n+1} = a x^α_{n}+bx^α_{n-1},0 <α\ leq2 $及其在医学中的应用
On the Boundedness solutions of the difference equation $x_{n+1}=a x^α_{n}+bx^α_{n-1},0<α\leq2$ and its application in medicine
论文作者
论文摘要
最近,数学家对研究离散动态系统(特别是差异方程式)的研究感兴趣,因此在许多数学领域中讨论并发布了有关讨论其解决方案的行为属性(界限和无限制)的可观工作,这些领域涉及几个有趣的成果和应用在应用程序和物理学中的几个有趣的动作,这是对最重要的动态学的兴趣,该领域成为了该领域的兴趣,这些兴趣是该领域的兴趣,这些兴趣成为了该领域的兴趣。我们可能会讨论差异方程的定性行为和属性$ x_ {n+1} = ax^2_ {n}+bx^2_ {n-1} $与$ a $和$ a $和$ b $是两个参数,我们将显示其对医学的应用。
Recently, mathematicians have been interested in studying the theory of discrete dynamical system, specifically difference equation, such that considerable works about discussing the behavior properties of its solutions (boundedness and unboundedness) are discussed and published in many areas of mathematics which involves several interesting results and applications in applied mathematics and physics ,One of the most important discrete dynamics which is become of interest for researchers in the field is the rational dynamical system .In this paper we may discuss qualitative behavior and properties of the difference equation $x_{n+1}=ax^2_{n}+bx^2_{n-1}$ with $a$ and $b$ are two parameters and we shall show its application to medicine.
