The logarithmic integral
Author(s)
Bibliographic Information
The logarithmic integral
(Cambridge studies in advanced mathematics, 12,
Cambridge University Press, 1988-1992
- 1
- 2
Available at / 72 libraries
-
v. 1413.5:Koo:1118808495,118813455,118906232,
v. 2413.5:Koo:2119208110 -
Science and Technology Library, Kyushu University
1104/KOO068252188008216,
2104/KOO068252192007196, V. 1.068222194005303, 2.068222193000833 -
Library, Research Institute for Mathematical Sciences, Kyoto University数研
1S||CSAM||1288047122,
2S||CSAM||2192037118 -
1413.7-Ko78-1,
2413.7-Ko78-2//413.5//413.1923028225//,10092302823 -
1413.5||Ko78||105424968,
2413.5||Ko78||206082532, v. 1413.5h036455*, v. 2413.5h103942 -
University of Teacher Education Fukuoka Library図
v. 1413.7||Ko 78||1064032188014550,
v. 2413.7||Ko 78||22193007590 -
Hokkaido University, Library, Graduate School of Science, Faculty of Science and School of Science図書
v. 1dc19:515.4/K8372070098602,
v. 2dc20:515.4/k8372070230145 -
No Libraries matched.
- Remove all filters.
Note
Mathematical symbol for integral from negative to positive infinity appears at head of title
Includes bibliographical references and indexes
Description and Table of Contents
- Volume
-
1 ISBN 9780521309066
Description
Table of Contents
- Preface
- Introduction
- 1. Jensen's formula
- 2. Szego's theorem
- 3. Entire functions of exponential type
- 4. Quasianalyticity
- 5. The moment problem on the real line
- 6. Weighted approximation on the real line
- 7. How small can the Fourier transform of a rapidly decreasing non-zero function be?
- 8. Persistence of the form dx/(1+x^2)
- Addendum
- Bibliography for volume I
- Index
- Contents of volume II.
- Volume
-
2 ISBN 9780521309073
Description
Table of Contents
- 9. Jensen's formula again
- 10. Why we want to have multiplier theorems
- 11. Multiplier theorems.
by "Nielsen BookData"