Tohoku Mathematical Journal, Second Series Volume 26, Issue 2

APPROXIMATION OPERATORS ON BANACH SPACES OF DISTRIBUTIONS

An approximation process {\left{ {{Γ _n}} \ ight}_{n \in P}} on a Banach subspace X of A [Zemanian A. H. [36]], satisfying either a Jackson type inequality or a Bernstein type inequality of order ρ (n) on X with respect to Y of X, is being related to a class of Banach subspaces {\left{ {{X_λ }} \ ight}_{λ \in J}} of A, on each of which, {\left{ {{X_n}} \ ight}_{n \in P}} defines a sequence of multiplier type operators, satisfying the same inequality with same order. Sufficient conditions for {X_λ } \subset A', λ \in J are given. Results are illustrated by examples.

THE INVERSION FORMULAE FOR SOME HYPERGEOMETRIC TRANSFORMS

By means of Laplace transform and their inverses we have obtained three inversion formulae for some hypergeometric transforms whose kernels are Whittaker's function {W_{k, m}} confluent hypergeometric function _1{F_1} and Gauss hypergeometric function _2{F_1} respectively. Corresponding inversion formulae derived from Erdélyi's work are also mentioned.