Fourier transform inversion in the Alexiewicz norm
Abstract
If f∈ L1( R) it is proved that S∞ f-f DS=0, where DS(x)=(Sx)/(π x) is the Dirichlet kernel and f = α<β|∫αβf(x)\,dx| is the Alexiewicz norm. This gives a symmetric inversion of the Fourier transform on the real line. An asymmetric inversion is also proved. The results also hold for a measure given by dF where F is a continuous function of bounded variation. Such measures need not be absolutely continuous with respect to Lebesgue measure. An example shows there is f∈ L1( R) such that S∞ f-f DS1≠ 0.
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