Symmetric Decompositions of f∈ L2(R) Via Fractional Riemann-Liouville Operators
Abstract
It is proved that given -1/2<s<1/2, for any f∈ L2(R), there is a unique u∈ H|s|(R) such that f=D-su+Ds*u\,, where D-s, Ds* are fractional Riemann-Liouville operators and the fractional derivatives are understood in the weak sense. Furthermore, the regularity of u is discussed, and other versions of the results are established. As an interesting consequence, the Fourier transform of elements of L2(R) is characterized.
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