Permutation entropy revisited

Abstract

Time-series analysis in terms of ordinal patterns is revisited by introducing a generalized permutation entropy Hp(w,L), which depends on two different window lengths: w, implicitly defining the resolution of the underlying partition; L, playing the role of an embedding dimension, analogously to standard nonlinear time-series analysis. The w-dependence provides information on the structure of the corresponding invariant measure, while the L-dependence helps determining the Kolmogorov-Sinai entropy. We finally investigate the structure of the partition with the help of principal component analysis, finding that, upon increasing w, the single atoms become increasingly elongated.