出版社
NATL ACAD SCIENCES INDIA
DOI: 10.1007/s40010-023-00851-x
关键词
Lebedev-Skalskaya transform; Modified Bessel function; Fractional maximal operator; Riesz potential operator
This paper investigates the boundedness of the fractional maximal function and Riesz potential for the LS transform from L-p(R+; exp(-x cos(rho))/root x dx) to L-p(R+; x(p/2) dx) and from L-1(R+; exp(-x cos(rho))/root x dx) to the weak space WL1(R+; x(1/2) dx). Importance Rating: 7/10.
In this paper, the boundedness of the fractional maximal function and Riesz potential for the LS transform from L-p(R+; exp(-x cos(rho))/root x dx) to L-p(R+; x(p/2) dx) and from L-1(R+; exp(-x cos(rho))/root x dx) to the weak space WL1(R+; x(1/2) dx) are studied. Relevance of the work In this work, we define the fractional integral and the fractional maximal operators using the translation operator associated with LS transform. The boundedness of these integral operators is investigated in the framework of Lebesgue spaces. These fractional integral operators are applied to the study of partial differential equations and Sobolev spaces.
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