Pages that link to "Item:Q1946708"
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The following pages link to Characterization of ergodicity of \(T\)-adic maps on \(\mathbb F_2[[ T ]]\) using digit derivatives basis (Q1946708):
Displaying 7 items.
- Measure-preservation criteria for a certain class of 1-Lipschitz functions on \(\mathbb Z_p\) in Mahler's expansion (Q524521) (← links)
- Toward the ergodicity of \(p\)-adic 1-Lipschitz functions represented by the van der Put series (Q740840) (← links)
- Criteria of measure-preservation for 1-Lipschitz functions on \(\mathbb F_q[[T]]\) in terms of the van der Put basis and its applications (Q897329) (← links)
- Shift operators and two applications to \(\mathbb{F}_q[[T]]\) (Q2017207) (← links)
- Characterization of the ergodicity of 1-Lipschitz functions on \(\mathbb{Z}_2\) using the \(q\)-Mahler basis (Q2257317) (← links)
- Measure-preservation criteria for 1-Lipschitz functions on \(\mathbb F_{q}[[T]]\) in terms of the three bases of Carlitz polynomials, digit derivatives, and digit shifts (Q2363333) (← links)
- (Q4576511) (← links)