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Abstract
Gel'fand and Shilov in [3; pp. 151-54] have extended the Hilbert transform to generalized functions of the space Φ' and proved the inversion formula where the elements of the testing function space Φ belong to the dual space of a testing function space Ψ equipped with the topology generated by a countable set of norms. They claimed that a locally integrable function f(χ) satisfying the asymptotic order
and 0<ε<1, is Hilbert transformable according to their theory. As it stands their this claim is incorrect: in this paper we have modified their technique and have extended the Hilbert transform and its inversion formula to the space of tempered distributions on
. We have given very simple examples to illustrate the applications of our results in solving some singular differential and integro-differential equations.
AMS Subject Classification (1980) Primary 46F12 Secondary 44A15