We prove that every self-homeomorphism $h : K_s \to K_s$ on the inverse limit space $K_s$ of tent map $T_s$ with slope $s \in (\sqrt 2, 2]$ is isotopic to a power of the shift-homeomorphism $\sigma^R : K_s \to K_s$.
Entropy of homeomorphisms on unimodal inverse limit spaces
Homeomorphisms of unimodal inverse limit spaces with a non-recurrent postcritical point
Folding points of unimodal inverse limit spaces
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