A multidimensional solution to additive homological equations
Abstract
In this paper we prove that for a finite-dimensional real normed space V, every bounded mean zero function f∈ L∞([0,1];V) can be written in the form f = g T - g for some g∈ L∞([0,1];V) and some ergodic invertible measure preserving transformation T of [0,1]. Our method moreover allows us to choose g, for any given >0, to be such that \|g\|∞≤ (SV+)\|f\|∞, where SV is the Steinitz constant corresponding to V.
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