Hirsch meets Fibonacci and Narayana type variants

Abstract

For functions f of a continuous variable in R+ we show that the Hirsch function hf equals f iff (f(f(x)) = x f(x)) on R+, leading for continuous f to f = or the power function f(x) = xα, α= 5 +1)/2. For functions of a discrete positive variable in R+, we show that hf = f implies that only the trivial function f = (1,1) satisfies this. We also study the problem hf = f f and for f = g g, hf = g leading to the zero function or another power law in the continuous variable case and again to f = (1,1) in the discrete variable case. Both problems involve the study of variants of the Fibonacci sequence for which non-trivial identities are proved and applied in the solution of the above problems.