FRACTIONAL INTEGRAL OPERATOR WITH ROUGH KERNEL ON MORREY SPACES
In 1969, Spanne proved boundedness of fractional integral operator T1; in Morrey spaces which are more general than Lebesgue spaces. Adams then proved a stronger result than Spanne’s. Adams inequality is the strongest boundedness property of T1; in Morrey spaces. Meanwhile, Spanne type inequality...
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id-itb.:417612019-08-30T15:41:00ZFRACTIONAL INTEGRAL OPERATOR WITH ROUGH KERNEL ON MORREY SPACES Salim, Daniel Indonesia Dissertations Fractional integral operator, rough kernel, Morrey spaces, Boundedness of operator. INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/41761 In 1969, Spanne proved boundedness of fractional integral operator T1; in Morrey spaces which are more general than Lebesgue spaces. Adams then proved a stronger result than Spanne’s. Adams inequality is the strongest boundedness property of T1; in Morrey spaces. Meanwhile, Spanne type inequality is the strongest boundedness property of T1; in local Morrey spaces. Morrey spaces is generalized to '-generalized Morrey spaces and -generalized Morrey spaces. In 2009, Guliyev proved boundedness of T1; on '-generalized Morrey spaces. In 2009, Burenkov and Guliyev proved the boundedness of T1; on -generalized Morrey spaces. In this study, we consider fractional integral operator with rough kernel T ;. This operator is a generalization of T1;. We aim to prove boundedness of T ; on Morrey space, local Morrey space, '-generalized Morrey space, and -generalized Morrey space. With restricted domain of T ; to class of radial function, we prove stronger results than Spanne type inequality of T ; on local Morrey spaces. With restricted domain of T ; to some clasess of function, we also prove stronger results than Adams type inequality of T ; on Morrey spaces. In 2014, Iida proved Adams type inequality of T ; on Morrey space. In this dissertation the sufficient condition for boundedness on Iida’s result can be weakened. We also consider vector-valued inequality of maximal operator with rough kernel as the application of boundededness of T ;. Our results generalize Fefferman–Stein’s results which play an important role on atom decomposition theory of Morrey spaces. text |
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In 1969, Spanne proved boundedness of fractional integral operator T1; in Morrey
spaces which are more general than Lebesgue spaces. Adams then proved a
stronger result than Spanne’s. Adams inequality is the strongest boundedness
property of T1; in Morrey spaces. Meanwhile, Spanne type inequality is the
strongest boundedness property of T1; in local Morrey spaces.
Morrey spaces is generalized to '-generalized Morrey spaces and -generalized
Morrey spaces. In 2009, Guliyev proved boundedness of T1; on '-generalized
Morrey spaces. In 2009, Burenkov and Guliyev proved the boundedness of T1; on
-generalized Morrey spaces.
In this study, we consider fractional integral operator with rough kernel T
;. This
operator is a generalization of T1;. We aim to prove boundedness of T
; on Morrey
space, local Morrey space, '-generalized Morrey space, and -generalized Morrey
space.
With restricted domain of T
; to class of radial function, we prove stronger results
than Spanne type inequality of T
; on local Morrey spaces. With restricted domain
of T
; to some clasess of function, we also prove stronger results than Adams type
inequality of T
; on Morrey spaces.
In 2014, Iida proved Adams type inequality of T
; on Morrey space. In this dissertation
the sufficient condition for boundedness on Iida’s result can be weakened.
We also consider vector-valued inequality of maximal operator with rough kernel as
the application of boundededness of T
;. Our results generalize Fefferman–Stein’s
results which play an important role on atom decomposition theory of Morrey
spaces. |
| format |
Dissertations |
| author |
Salim, Daniel |
| spellingShingle |
Salim, Daniel FRACTIONAL INTEGRAL OPERATOR WITH ROUGH KERNEL ON MORREY SPACES |
| author_facet |
Salim, Daniel |
| author_sort |
Salim, Daniel |
| title |
FRACTIONAL INTEGRAL OPERATOR WITH ROUGH KERNEL ON MORREY SPACES |
| title_short |
FRACTIONAL INTEGRAL OPERATOR WITH ROUGH KERNEL ON MORREY SPACES |
| title_full |
FRACTIONAL INTEGRAL OPERATOR WITH ROUGH KERNEL ON MORREY SPACES |
| title_fullStr |
FRACTIONAL INTEGRAL OPERATOR WITH ROUGH KERNEL ON MORREY SPACES |
| title_full_unstemmed |
FRACTIONAL INTEGRAL OPERATOR WITH ROUGH KERNEL ON MORREY SPACES |
| title_sort |
fractional integral operator with rough kernel on morrey spaces |
| url |
https://digilib.itb.ac.id/gdl/view/41761 |
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1822926075388231680 |