Second-Order Parameterizations for the Complexity Theory of Integrable Functions
Abstract
We develop a unified second-order parameterized complexity theory for spaces of integrable functions. This generalizes the well-established case of second-order parameterized complexity theory for spaces of continuous functions. Specifically we prove the mutual linear equivalence of three natural parameterizations of the space p of p-integrable complex functions on the real unit interval: (binary) p-modulus, rate of convergence of Fourier series, and rate of approximation by step functions.
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