On the Boundedness solutions of the difference equation xn+1=a xαn+bxαn-1,0<α ≤2 and its application in medicine

Abstract

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 xn+1=ax2n+bx2n-1 with a and b are two parameters and we shall show its application to medicine.