ON BOUNDEDNESS OF LITTLEWOOD{PALEY SQUARE OPERATOR ON MORREY SPACE VIA EXTRAPOLATION AND DUALITY
Littlewood{Paley Square (LPS) operator is an operator maps a measurable function f to P1 j=????1 jj(f)j2 1 2 , where j is Littlewood{Paley operator. Littlewood{Paley operator is an operator maps a measurable function f via convolution relation j(f) = 2????j f, where 2????j (x) = 2jn (2jx) wi...
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| Format: | Theses |
| Language: | Indonesia |
| Online Access: | https://digilib.itb.ac.id/gdl/view/36151 |
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| Institution: | Institut Teknologi Bandung |
| Language: | Indonesia |
| Summary: | Littlewood{Paley Square (LPS) operator is an operator maps a measurable
function f to
P1
j=????1 jj(f)j2
1
2 , where j is Littlewood{Paley operator.
Littlewood{Paley operator is an operator maps a measurable function
f via convolution relation j(f) = 2????j f, where 2????j (x) = 2jn (2jx) with
: Rn ! C. With some sucient condition of , Littlewood and Paley
proved boundedness of LPS operators on the classical Lebesgue spaces. Via
Marcinkiewicz interpolation we obtain a weaker sucient condition to than
Littlewood-Paley for boundedness of LPS operators on the Lebesgue spaces
still hold.
We further extend the boundedness of the LPS operator on Morrey spaces
with adapting the extrapolation strategy and duality devised by Rosenthal
and Schemeisser. The extrapolation strategy and duality for vector valued
operators. To be able to devise the strategy we need to dene `2-Morrey
spaces is set of sequence measurable function ~ f = ffjg1
j=????1 where k ~ f()k`2 in
Morrey spaces. Furthermore, we construct the bipredual of `2-Morrey spaces,
as the case of by Triebel in (regular) Morrey spaces. Using these tools, we are
able to show boundedness of vector-valued LPS operators from regular Morrey
spaces to `2-Morrey spaces. |
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