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Denjoy–Koksma inequality

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In mathematics, the Denjoy–Koksma inequality, introduced by Herman (1979, p.73) as a combination of work of Arnaud Denjoy and the Koksma–Hlawka inequality of Jurjen Ferdinand Koksma, is a bound for Weyl sums k = 0 m 1 f ( x + k ω ) {\displaystyle \sum _{k=0}^{m-1}f(x+k\omega )} of functions f of bounded variation.

Statement

Suppose that a map f from the circle T to itself has irrational rotation number α, and p/q is a rational approximation to α with p and q coprime, |α – p/q| < 1/q. Suppose that φ is a function of bounded variation, and μ a probability measure on the circle invariant under f. Then

| i = 0 q 1 ϕ f i ( x ) q T ϕ d μ | Var ( ϕ ) {\displaystyle \left|\sum _{i=0}^{q-1}\phi \circ f^{i}(x)-q\int _{T}\phi \,d\mu \right|\leqslant \operatorname {Var} (\phi )}

(Herman 1979, p.73)

References

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