Call Number (LC) Title Results
QA329.6 .G6415 Einführung in die Theorie der eindimensionalen singulären Integraloperatoren / 1
QA329.6 .H35 Bounded integral operators on L℗
Bounded integral operators on L² spaces / 		2
QA329.6 .I58 2016 v.1 Integral operators in non-standard function spaces. 1
QA329.6 .I58 2016 v.2 Integral operators in non-standard function spaces. 1
QA329.6 .J6313 1982 Linear integral operators / 1
QA329.6 .K65 1996 Distortion theorems in relation to linear integral operators / 1
QA329.6 .K73 1994 Introduction to the theory of singular integral operators with shift / 1
QA329.6 N344 2019 Algebras of Singular Integral Operators with Kernels Controlled by Multiple Norms. 1
QA329.6 .P37 1988 An introduction to Hankel operators / 1
QA329.6 .P45 2003 Hankel operators and their applications / 1
QA329.6 .P45 2003eb Hankel operators and their applications / 1
QA329.6 .R89 2001 Regularity theory of Fourier integral operators with complex phases and singularities of affine fibrations / 1
QA329.6 .S38 2002 Hankel norm approximation for infinite-dimensional systems / 2
QA329.6 .S44 2019 Multilinear singular integral forms of Christ-Journé type / 3
QA329.6 .S77 2014 Multi-parameter singular integrals / 1
QA329.6 .S77 2014eb Multi-parameter singular integrals / 1
QA329.7 Pseudodifferential equations over non-Archimedean spaces /
Pseudodifferential operators and wavelets over real and p-Adic fields /
Solvable algebras of pseudodifferential operators /
Pseudo-differential operators : groups, geometry and applications /
Pseudodifferential methods in number theory /
Analytic Pseudo-Differential Operators and their Applications /
Analysis of pseudo-differential operators /
Pseudodifferential operators with automorphic symbols / 		8
QA329.7 .A24 2012 Pseudodifferential and Singular Integral Operators : an Introduction with Applications.
Pseudodifferential and singular integral operators : an introduction with applications / 		2
QA329.7 .A38 2004 Advances in pseudo-differential operators / 1
QA329.7 .A4513 2007 Pseudo-differential operators and the Nash-Moser theorem / 1