Rényi entropies of electrical transmission lines with Fibonacci distribution of inductances

Abstract

We study classical dual transmission lines with constant capacitances Cj=C0, ∀j, when we distribute two inductance values LA and LB according to the Fibonacci sequence. Using the electric current function Ij(ω), we study the normalized localization length Λ(ω), the Rényi entropies Rm(ω) and the normalized information length β(ω). We found three kinds of behavior of the Ij(ω) function: localized, extended and intermediate. In addition, it is found that the transmission line with Fibonacci distribution of inductances shows a behavior characteristic of quasi-periodic systems, namely, a self-similar frequency spectrum, where each subband is divided into three subbands, but the number of global subbands is greater than four.