TY - JOUR
T1 - Piecewise linear maps, Liapunov exponents and entropy
AU - Juang, Jonq
AU - Shieh, Shih Feng
PY - 2008/2/1
Y1 - 2008/2/1
N2 - Let LA = {fA, x : x is a partition of [0, 1]} be a class of piecewise linear maps associated with a transition matrix A. In this paper, we prove that if fA, x ∈ LA, then the Liapunov exponent λ (x) of fA, x is equal to a measure theoretic entropy hmA, x of fA, x, where mA, x is a Markov measure associated with A and x. The Liapunov exponent and the entropy are computable by solving an eigenvalue problem and can be explicitly calculated when the transition matrix A is symmetric. Moreover, we also show that maxx λ (x) = maxx hmA, x = log (λ1), where λ1 is the maximal eigenvalue of A.
AB - Let LA = {fA, x : x is a partition of [0, 1]} be a class of piecewise linear maps associated with a transition matrix A. In this paper, we prove that if fA, x ∈ LA, then the Liapunov exponent λ (x) of fA, x is equal to a measure theoretic entropy hmA, x of fA, x, where mA, x is a Markov measure associated with A and x. The Liapunov exponent and the entropy are computable by solving an eigenvalue problem and can be explicitly calculated when the transition matrix A is symmetric. Moreover, we also show that maxx λ (x) = maxx hmA, x = log (λ1), where λ1 is the maximal eigenvalue of A.
KW - Entropy
KW - Ergodic theory
KW - Liapunov exponents
KW - Piecewise linear map
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U2 - 10.1016/j.jmaa.2007.05.035
DO - 10.1016/j.jmaa.2007.05.035
M3 - Article
AN - SCOPUS:34548835002
SN - 0022-247X
VL - 338
SP - 358
EP - 364
JO - Journal of Mathematical Analysis and Applications
JF - Journal of Mathematical Analysis and Applications
IS - 1
ER -