Intermittency and Regularized Fredholm Determinants
arXiv:chao-dyn/9610011
Abstract
We consider real-analytic maps of the interval $I=[0,1]$ which are expanding everywhere except for a neutral fixed point at 0. We show that on a certain function space the spectrum of the associated Perron-Frobenius operator ${\cal M}$ has a decomposition $Sp ({\cal M}) = Ï_c \cup Ï_p$ where $Ï_c=[0,1]$ is the continuous spectrum of ${\cal M}$ and $Ï_p$ is the pure point spectrum with no points of accumulation outside 0 and 1. We construct a regularized Fredholm determinant $d(λ)$ which has a holomorphic extension to $λ\in C-Ï_c$ and can be analytically continued from each side of $Ï_c$ to an open neighborhood of $Ï_c-{0,1}$ (on different Riemann sheets). In $C-Ï_c$ the zero-set of $d(λ)$ is in one-to-one correspondence with the point spectrum of ${\cal M}$. Through the conformal transformation $λ(z) = 1/(4z) (1+z)^2$ the function $d \circ λ(z)$ extends to a holomorphic function in a domain which contains the unit disc.
22 pages, LaTeX