Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by
Crossref.
Lang, J.
2003.
Improved estimates for the approximation numbers of Hardy-type operators.
Journal of Approximation Theory,
Vol. 121,
Issue. 1,
p.
61.
Solomyak, Michael
2003.
Function Spaces, Differential Operators and Nonlinear Analysis.
p.
161.
Solomyak, Michael
2003.
On approximation of functions from Sobolev spaces on metric graphs.
Journal of Approximation Theory,
Vol. 121,
Issue. 2,
p.
199.
Solomyak, Michael
2004.
On the spectrum of the Laplacian on regular metric trees.
Waves in Random Media,
Vol. 14,
Issue. 1,
p.
S155.
Williams, F. W.
Howson, W. P.
and
Watson, A.
2004.
Application of the Wittrick—Williams algorithm to the Sturm—Liouville problem on homogeneous trees: a structural mechanics analogy.
Proceedings of the Royal Society of London. Series A: Mathematical, Physical and Engineering Sciences,
Vol. 460,
Issue. 2045,
p.
1243.
Brown, B.M
and
Weikard, R
2005.
A Borg–Levinson theorem for trees.
Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences,
Vol. 461,
Issue. 2062,
p.
3231.
Edmunds, D. E.
and
Lang, J.
2006.
Approximation numbers and Kolmogorov widths of Hardy‐type operators in a non‐homogeneous case.
Mathematische Nachrichten,
Vol. 279,
Issue. 7,
p.
727.
Edmunds, D.E.
and
Lang, J.
2007.
Operators of Hardy type.
Journal of Computational and Applied Mathematics,
Vol. 208,
Issue. 1,
p.
20.
Edmunds, D.E.
and
Lang, J.
2007.
Bernstein widths of Hardy-type operators in a non-homogeneous case.
Journal of Mathematical Analysis and Applications,
Vol. 325,
Issue. 2,
p.
1060.
Edmunds, David E.
and
Evans, W. Desmond
2009.
Sobolev Spaces In Mathematics I.
Vol. 8,
Issue. ,
p.
153.
Edmunds, D. E.
2010.
Embeddings, Hardy operators and nonlinear problems.
Revista Matemática Complutense,
Vol. 23,
Issue. 2,
p.
267.
Howson, W.Paul
and
Watson, Andrew
2012.
Homogeneous trees of second order Sturm–Liouville equations: A general theory and program.
Computers & Structures,
Vol. 104-105,
Issue. ,
p.
13.
Vasil’eva, A. A.
2013.
Embedding theorem for weighted Sobolev classes on a John domain with weights that are functions of the distance to some h-set.
Russian Journal of Mathematical Physics,
Vol. 20,
Issue. 3,
p.
360.
Vasil’eva, A. A.
2013.
Widths of weighted sobolev classes on a John domain.
Proceedings of the Steklov Institute of Mathematics,
Vol. 280,
Issue. 1,
p.
91.
Vasil’eva, A. A.
2014.
Widths of weighted Sobolev classes on a John domain: strong singularity at a point.
Revista Matemática Complutense,
Vol. 27,
Issue. 1,
p.
167.
Vasil’eva, A. A.
2014.
Embedding theorem for weighted Sobolev classes with weights that are functions of the distance to some h-set.
Russian Journal of Mathematical Physics,
Vol. 21,
Issue. 1,
p.
112.
Vasil’eva, A. A.
2015.
Widths of weighted Sobolev classes with weights that are functions of the distance to some h-set: Some limit cases.
Russian Journal of Mathematical Physics,
Vol. 22,
Issue. 1,
p.
127.
Vasil'eva, A. A.
2015.
Estimates for norms of two‐weighted summation operators on a tree under some restrictions on weights.
Mathematische Nachrichten,
Vol. 288,
Issue. 10,
p.
1179.
Edmunds, David
Gogatishvili, Amiran
Kopaliani, Tengiz
and
Samashvili, Nino
2016.
Some s-numbers of an integral operator of Hardy type in Banach function spaces.
Journal of Approximation Theory,
Vol. 207,
Issue. ,
p.
76.
Vasil’eva, A. A.
2016.
Estimates for the widths of discrete function classes generated by a two-weight summation operator.
Proceedings of the Steklov Institute of Mathematics,
Vol. 294,
Issue. 1,
p.
291.