Code: 06822274

Weak and Strong Inequalities for Hardy Type Operators

Name: Weak and Strong Inequalities for Hardy Type Operators
Brand: VDM Verlag Dr. Müller
SKU: 06822274
Price: 68.26 EUR
Availability: BackOrder

by Tieling Chen

Language: English
Binding: Paperback
Number of pages: 172
Publisher: VDM Verlag Dr. Müller, 2009
More about this

68.26 €

RRP: 71.86 €

You save 3.60 €

Print on demand
Shipping in 3 - 5 days

Add to wishlist

Debbie Teoh's Favourite Recipes
23.96 € -4 %
Buy
Strengthening Farm -Agri Business Market Inkages
54.91 €
Buy
Ideal Gay Man
67.05 €
Buy
Regulating from the Inside
129.04 €
Buy
Chinese Economists on Economic Reform - Collected Works of Ma Hong
212.18 €
Buy
History of Gay People in Alcoholics Anonymous
76.05 € -4 %
Buy
Elliptic and Parabolic Equations
121.36 €
Buy

Give this book as a present today

Order book and choose Gift Order.
We will send you book gift voucher at once. You can give it out to anyone.
Book will be send to donee, nothing more to care about.

Book gift voucher sample Read more

More about Weak and Strong Inequalities for Hardy Type Operators

Book details
Synopsis
Trending among others

You get 171 loyalty points

Book synopsis

Strong and weak inequalities for the Hardy type§integral operator involving variable limits and a§kernel are studied. §§A characterization of the weight functions for which§the strong type inequality of the operator from a§weighted L^p to a weighted L^q holds is established§in the case of 1 q p infinity and that the§involved kernel satisfies the GHO condition of Bloom§and Kerman. The Nearly Block Diagonal Decomposition§technique and the concept of Normalizing Measures are§introduced for this purpose. §§Weak type inequalities for various instances of the§operator are studied. These include the case that the§operator has only one variable limit, the case that§the operator has a trivial kernel or a kernel§depending on only one variable, and the case the§operator has a kernel satisfying some special growth§conditions such as the GHO condition. A newly§introduced decomposition techinque, good lambda§inequalities, and the monotonicity of the kernel, are§used to characterize weak type inequalities in§different situations. §§Strong type inequalities for some other special cases§and in higher dimensional spaces are also studied. Strong and weak inequalities for the Hardy type§integral operator involving variable limits and a§kernel are studied. §A characterization of the weight functions for which§the strong type inequality of the operator from a§weighted L^p to a weighted L^q holds is established§in the case of 1 q p infinity and that the§involved kernel satisfies the GHO condition of Bloom§and Kerman. The Nearly Block Diagonal Decomposition§technique and the concept of Normalizing Measures are§introduced for this purpose. §Weak type inequalities for various instances of the§operator are studied. These include the case that the§operator has only one variable limit, the case that§the operator has a trivial kernel or a kernel§depending on only one variable, and the case the§operator has a kernel satisfying some special growth§conditions such as the GHO condition. A newly§introduced decomposition techinque, good lambda§inequalities, and the monotonicity of the kernel, are§used to characterize weak type inequalities in§different situations. §Strong type inequalities for some other special cases§and in higher dimensional spaces are also studied.