Tekijä: Friedrich Hirzebruch; Joachim Schwermer; Silke Wimmer-Zagier; Don Zagier Kustantaja: Springer Nature Switzerland AG (2019) Saatavuus: Noin 17-20 arkipäivää
Tekijä: Heinz-Dieter Ebbinghaus; Hans Hermes; Friedrich Hirzebruch; Max Koecher; Klaus Mainzer; Jürgen Neukirch; Alexande Prestel Kustantaja: Springer-Verlag Berlin and Heidelberg GmbH & Co. KG (1992) Saatavuus: Noin 17-20 arkipäivää
Tekijä: Heinz-Dieter Ebbinghaus; John H. Ewing; Hans Hermes; Friedrich Hirzebruch; Max Koecher; Klaus Mainzer; Jürgen Neukirch Kustantaja: Springer-Verlag New York Inc. (1990) Saatavuus: Noin 17-20 arkipäivää
Tekijä: Ciro Ciliberto; Friedrich Hirzebruch; Rick Miranda; Mina Teicher Kustantaja: Springer-Verlag New York Inc. (2001) Saatavuus: Noin 17-20 arkipäivää
Tekijä: Ciro Ciliberto; Friedrich Hirzebruch; Rick Miranda; Mina Teicher Kustantaja: Springer-Verlag New York Inc. (2001) Saatavuus: Noin 17-20 arkipäivää
Tekijä: Peter Hilton; Friedrich Hirzebruch; Reinhold Remmert Kustantaja: Springer-Verlag Berlin and Heidelberg GmbH & Co. KG (2011) Saatavuus: Noin 17-20 arkipäivää
Tekijä: Friedrich Hirzebruch; Lars Hörmander; John Milnor; Jean-Pierre Serre; I. M. Singer Kustantaja: Princeton University Press (1971) Saatavuus: Noin 14-17 arkipäivää
Springer Sivumäärä: 234 sivua Asu: Kovakantinen kirja Painos: 1st Corrected ed. 19 Julkaisuvuosi: 1978, 01.09.1978 (lisätietoa) Kieli: Englanti
In recent years new topological methods, especially the theory of sheaves founded by J. LERAY, have been applied successfully to algebraic geometry and to the theory of functions of several complex variables. H. CARTAN and J. -P. SERRE have shown how fundamental theorems on holomorphically complete manifolds (STEIN manifolds) can be for mulated in terms of sheaf theory. These theorems imply many facts of function theory because the domains of holomorphy are holomorphically complete. They can also be applied to algebraic geometry because the complement of a hyperplane section of an algebraic manifold is holo morphically complete. J. -P. SERRE has obtained important results on algebraic manifolds by these and other methods. Recently many of his results have been proved for algebraic varieties defined over a field of arbitrary characteristic. K. KODAIRA and D. C. SPENCER have also applied sheaf theory to algebraic geometry with great success. Their methods differ from those of SERRE in that they use techniques from differential geometry (harmonic integrals etc. ) but do not make any use of the theory of STEIN manifolds. M. F. ATIYAH and W. V. D. HODGE have dealt successfully with problems on integrals of the second kind on algebraic manifolds with the help of sheaf theory. I was able to work together with K. KODAIRA and D. C. SPENCER during a stay at the Institute for Advanced Study at Princeton from 1952 to 1954.