It is shown that if S is a positively expansive endomorphism on a one-sided mixing SFT (X,T), then (X,S) is conjugate to a one-sided mixing SFT, and the Parry measures of (X,T) and (X,S) are identical.
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https://www.riss.kr/link?id=A100986156
1997
English
SCOPUS,KCI등재,ESCI
학술저널
257-267(11쪽)
0
상세조회0
다운로드다국어 초록 (Multilingual Abstract)
It is shown that if S is a positively expansive endomorphism on a one-sided mixing SFT (X,T), then (X,S) is conjugate to a one-sided mixing SFT, and the Parry measures of (X,T) and (X,S) are identical.
It is shown that if S is a positively expansive endomorphism on a one-sided mixing SFT (X,T), then (X,S) is conjugate to a one-sided mixing SFT, and the Parry measures of (X,T) and (X,S) are identical.
UNIFORM Lp-APPROXIMATION FOR THE SOLUTIONS OF FUNCTIONAL STOCHASTIC DIFFERENTIAL EQUATIONS
CONVERGENCE OF APPROXIMATING FIXED POINTS FOR NONEXPANSIVE NONSELF-MAPPINGS IN BANACH SPACES
COSYMPLECTIC CONFORMAL CURVATURE TENSOR AND SPECTRUM OF THE LAPLACIAN IN COSYSMPLECTIC MANIFOLDS