Affiliation:
1. Department of Applied Sciences , Gauhati University , Guwahati , India
Abstract
Abstract
In this article, we use a particular case of convolution as an
operator to discuss a number of problems concerning multiplier
results between function spaces such as Hardy and
B
p
{B^{p}}
-spaces. As
a consequence, we extend certain well-known results on fractional
derivatives and fractional integrals. Also, we find condition on the
parameters
b
,
c
{b,c}
such that
𝒫
b
,
c
{{\mathcal{P}}^{b,c}}
in
B
p
{B^{p}}
.
Subject
Applied Mathematics,Computational Theory and Mathematics,Statistics, Probability and Uncertainty,Mathematical Physics
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