Space of Lipschitz Functions is Banach Space/Shift of Finite Type
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Theorem
Let $\struct {X _\mathbf A, \sigma_\mathbf A}$ be a shift of finite type.
Let $\theta \in \openint 0 1$.
Let $F_\theta$ be the Lipschitz space on $X _\mathbf A$.
Let $\norm \cdot_\theta$ be the Lipschitz norm on $F_\theta$.
Then $\struct {F_\theta, \norm \cdot_\theta}$ is a Banach space.
Proof
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Sources
- 1990: William Parry and Mark Pollicott: Zeta Functions and the Periodic Orbit Structure of Hyperbolic Dynamics: Chapter $1$: Subshifts of Finite Type and Function Spaces