On the number of parameters c for which the point x=0 is a superstable periodic point of fc(x) = 1 - cx2

Abstract

Let fc(x) = 1 - cx2 be a one-parameter family of real continuous maps with parameter c 0. For every positive integer n, let Nn denote the number of parameters c such that the point x = 0 is a (superstable) periodic point of fc(x) whose least period divides n (in particular, fcn(0) = 0). In this note, we find a recursive way to depict how some of these parameters c appear in the interval [0, 2] and show that n ∞ ( Nn)/n 2 and this result is generalized to a class of one-parameter families of continuous real-valued maps that includes the family fc(x) = 1 - cx2.