Additive combinatorics
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| 005 | 20201021195559.0 | ||
| 008 | 130818s2006 xxk 00 eng| | ||
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| 020 | |a 978-0-521-85386-6 | ||
| 020 | |a 0-521-85386-9 | ||
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| 100 | 1 | |a Tao |D Terence |d 1975- |0 (DE-588)132190370 | |
| 245 | 1 | 0 | |a Additive combinatorics |c Terence Tao, Van Vu |
| 264 | 1 | |a Cambridge |b Cambridge University Press |c 2006 | |
| 300 | |a xviii, 512 p. | ||
| 490 | 1 | |a Cambridge studies in advanced mathematics |v 105 |i 105 |w (IDSBB)000030673 |9 277979773 | |
| 504 | |a Includes bibliographical references and index | ||
| 650 | 0 | |a Combinatorial analysis | |
| 650 | 7 | |a Kombinatorik |2 idsbb | |
| 650 | 7 | |a ABZÄHLENDE KOMBINATORIK |x ger |0 (ETHUDK)000013505 |2 ethudk | |
| 650 | 7 | |a ADDITIVE ZAHLENTHEORIE |x ger |0 (ETHUDK)000012554 |2 ethudk | |
| 650 | 7 | |a ENTFERNUNG (GRAPHENTHEORIE) |x ger |0 (ETHUDK)000054487 |2 ethudk | |
| 650 | 7 | |a FOURIERREIHEN (ANALYSIS) |x ger |0 (ETHUDK)000013233 |2 ethudk | |
| 650 | 7 | |a KONVEXE MENGEN (GEOMETRIE) |x ger |0 (ETHUDK)000012907 |2 ethudk | |
| 650 | 7 | |a RAMSEY-THEORIE (KOMBINATORIK) |x ger |0 (ETHUDK)000045141 |2 ethudk | |
| 691 | 7 | |B u |a ABZÄHLENDE KOMBINATORIK |z ger |u 519.115 |2 nebis E1 | |
| 691 | 7 | |B u |a ADDITIVE ZAHLENTHEORIE |z ger |u 511.34 |2 nebis E1 | |
| 691 | 7 | |B u |a KONVEXE MENGEN (GEOMETRIE) |z ger |u 514.172 |2 nebis E1 | |
| 691 | 7 | |B u |a FOURIERREIHEN (ANALYSIS) |z ger |u 517.518.45 |2 nebis E1 | |
| 691 | 7 | |B u |a ENTFERNUNG (GRAPHENTHEORIE) |z ger |u 519.176,1 |2 nebis E1 | |
| 691 | 7 | |B u |a RAMSEY-THEORIE (KOMBINATORIK) |z ger |u 519.11,1 |2 nebis E1 | |
| 691 | 7 | |B u |a COMBINATORIAL ENUMERATION |z eng |u 519.115 |2 nebis E1 | |
| 691 | 7 | |B u |a COMBINATOIRE ÉNUMÉRATIVE |z fre |u 519.115 |2 nebis E1 | |
| 691 | 7 | |B u |a THÉORIE ADDITIVE DES NOMBRES |z fre |u 511.34 |2 nebis E1 | |
| 691 | 7 | |B u |a ADDITIVE NUMBER THEORY |z eng |u 511.34 |2 nebis E1 | |
| 691 | 7 | |B u |a CONVEX SETS (GEOMETRY) |z eng |u 514.172 |2 nebis E1 | |
| 691 | 7 | |B u |a ENSEMBLES CONVEXES (GÉOMÉTRIE) |z fre |u 514.172 |2 nebis E1 | |
| 691 | 7 | |B u |a SÉRIES DE FOURIER (ANALYSE MATHÉMATIQUE) |z fre |u 517.518.45 |2 nebis E1 | |
| 691 | 7 | |B u |a FOURIER SERIES (MATHEMATICAL ANALYSIS) |z eng |u 517.518.45 |2 nebis E1 | |
| 691 | 7 | |B u |a DISTANCE (GRAPH THEORY) |z eng |u 519.176,1 |2 nebis E1 | |
| 691 | 7 | |B u |a DISTANCE (THÉORIE DES GRAPHES) |z fre |u 519.176,1 |2 nebis E1 | |
| 691 | 7 | |B u |a THÉORIE DE RAMSEY (COMBINATOIRE) |z fre |u 519.11,1 |2 nebis E1 | |
| 691 | 7 | |B u |a RAMSEY THEORY (COMBINATORICS) |z eng |u 519.11,1 |2 nebis E1 | |
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| 950 | |B IDSBB |P 100 |E 1- |a Tao |D Terence |d 1975- |0 (DE-588)132190370 | ||
| 950 | |B IDSBB |P 490 |E 0- |a Cambridge studies in advanced mathematics |v 105 |i 105 |w (IDSBB)000030673 |9 277979773 | ||
| 950 | |B IDSBB |P 700 |E 1- |a Vu |D Van H. | ||
| 950 | |B NEBIS |P 490 |E -- |a Cambridge studies in advanced mathematics |v 105 |i 105 |w (NEBIS)000015638 |9 277979773 | ||
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| 956 | 4 | |B NEBIS |C EAD50 |D EBI01 |a E01 |u https://opac.nebis.ch/objects/pdf/000168368_e01_0521853869_02.pdf |y Abstract / Autoreninformation |x VIEW |q pdf | |
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