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Lang, Jan - Department of Mathematics, Ohio State University
BOUNDEDNESS AND COMPACTNESS OF GENERAL KERNEL INTEGRAL OPERATORS FROM
Behaviour of the approximation numbers of a Sobolev embedding in the onedimensional
exterior2d.tex; 29/03/2003; 11:13; p.1 Potential Techniques and Regularity of Boundary Value
ASYMPTOTIC BEHAVIOR OF THE APPROXIMATION NUMBERS OF THE HARDY-TYPE OPERATOR
Behaviour of the approximation numbers of a Sobolev embedding in the one-dimensional
Remainder estimates for the approximation numbers of weighted Hardy operators
The approximation numbers of Hardy{type operators on trees.
Improved estimates for the approximation numbers of Hardy-type operators
On L p(x) norms D. E. Edmunds, J. Lang and A. Nekvinda
ASYMPTOTIC BEHAVIOR OF THE APPROXIMATION NUMBERS OF THE HARDY-TYPE OPERATOR
APPROXIMATION NUMBERS OF HARDY-TYPE OPERATORS ON TREES
A DIFFERENCE BETWEEN CONTINUOUS AND ABSOLUTELY CONTINUOUS NORMS IN BANACH FUNCTION SPACES
Remainder estimates for the approximation numbers of weighted Hardy operators
BOUNDEDNESS AND COMPACTNESS OF GENERAL KERNEL INTEGRAL OPERATORS FROM
Generalizing trigonometric functions from different points of view
exterior2d.tex; 31/03/2003; 13:32; p.1 Potential Techniques and Regularity of Boundary Value
1 exterior2d.tex; 29/03/2003; 10:55; p.1
Improved estimates for the approximation numbers of Hardy-type operators
Two-sided estimates for the approximation numbers of Hardy-type operators in L1 and L1.
1 A DIFFERENCE BETWEEN CONTINUOUS AND ABSOLUTELY
Behaviour of the approximation numbers of a Sobolev embedding in the one-dimensional
The generalized Hardy operator with kernel and variable integral limits in Banach function spaces
THE HARDY OPERATOR AND THE GAP BETWEEN L 1 AND BMO
A re so m e op t i m a l sh ap e prob l em s convex ? by B . K aw oh l (C o l ogn e ) an d J . Lan g (P ragu e )
CONTINUOUS NORM AND ABSOLUTELY CONTINUOUS NORM IN BANACH FUNCTION SPACES ARE NOT THE SAME
THE HARDY OPERATOR AND THE GAP BETWEEN L1 AND BMO
On Lp(x) norms D. E. Edmunds, J. Lang and A. Nekvinda
Two{sided estimates for the approximation numbers of Hardy{type operators in L 1 and L 1 .
The generalized Hardy operator with kernel and variable integral limits in Banach function spaces
ASYMPTOTIC BEHAVIOR OF THE APPROXIMATION NUMBERS OF THE HARDY-TYPE OPERATOR
The approximation numbers of Hardy-type operators on trees.
Remainder estimates for the approximation numbers of weighted Hardy operators
APPROXIMATION NUMBERS OF HARDY-TYPE OPERATORS ON TREES
CONTINUOUS NORM AND ABSOLUTELY CONTINUOUS NORM IN BANACH FUNCTION SPACES ARE NOT THE SAME
