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From the reviews of the second edition: This volume is the second and substantially enlarged edition of the book that appeared for the first time in 1984. a ] The bibliography has been substantially extended, covering new developments. Already a classic in the field, this book is recommended both to mathematicians interested in this mathematical topic and physicists working in the modern theoretical physics. (EMS Newsletter, September, 2005) The book under review is the second, substantially enlarged edition a ] with K. Hulek as fourth co-author. a ] the bibliography has been updated and tremendously enlarged, thereby reflecting the vast activity in the field during the past twenty years. Now as before, the text is enriched by numerous instructive examples. a ] No doubt, this book remains a must for everyone dealing with complex algebraic surfaces, be it a student, an active researcher in complex geometry, or a mathematically ambitioned (quantum) physicist. (Werner Kleinert, Zentralblatt MATH, Vol. 1036 (11), 2004) From the reviews of the second edition: This volume is the second and substantially enlarged edition of the book that appeared for the first time in 1984. ??? The bibliography has been substantially extended, covering new developments. Already a classic in the field, this book is recommended both to mathematicians interested in this mathematical topic and physicists working in the modern theoretical physics. (EMS Newsletter, September, 2005) The book under review is the second, substantially enlarged edition ??? with K. Hulek as fourth co-author. ??? the bibliography has been updated and tremendously enlarged, thereby reflecting the vast activity in the field during the past twenty years. Now as before, the text is enriched by numerous instructive examples. ??? No doubt, this book remains a must for everyone dealing with complex algebraic surfaces, be it a student, an active researcher in complex geometry, or a mathematically ambitioned (quantum) physicist. (Werner Kleinert, Zentralblatt MATH, Vol. 1036 (11), 2004)

From the reviews of the second edition: This volume is the second and substantially enlarged edition of the book that appeared for the first time in 1984. ??? The bibliography has been substantially extended, covering new developments. Already a classic in the field, this book is recommended both to mathematicians interested in this mathematical topic and physicists working in the modern theoretical physics. (EMS Newsletter, September, 2005) The book under review is the second, substantially enlarged edition ??? with K. Hulek as fourth co-author. ??? the bibliography has been updated and tremendously enlarged, thereby reflecting the vast activity in the field during the past twenty years. Now as before, the text is enriched by numerous instructive examples. ??? No doubt, this book remains a must for everyone dealing with complex algebraic surfaces, be it a student, an active researcher in complex geometry, or a mathematically ambitioned (quantum) physicist. (Werner Kleinert, Zentralblatt MATH, Vol. 1036 (11), 2004) From the reviews of the second edition: This volume is the second and substantially enlarged edition of the book that appeared for the first time in 1984. a ] The bibliography has been substantially extended, covering new developments. Already a classic in the field, this book is recommended both to mathematicians interested in this mathematical topic and physicists working in the modern theoretical physics. (EMS Newsletter, September, 2005) The book under review is the second, substantially enlarged edition a ] with K. Hulek as fourth co-author. a ] the bibliography has been updated and tremendously enlarged, thereby reflecting the vast activity in the field during the past twenty years. Now as before, the text is enriched by numerous instructive examples. a ] No doubt, this book remains a must for everyone dealing with complex algebraic surfaces, be it a student, an active researcher in complex geometry, or a mathematically ambitioned (quantum) physicist. (Werner Kleinert, Zentralblatt MATH, Vol. 1036 (11), 2004)

From the reviews of the second edition: <p> This volume is the second and substantially enlarged edition of the book that appeared for the first time in 1984. a ] The bibliography has been substantially extended, covering new developments. Already a classic in the field, this book is recommended both to mathematicians interested in this mathematical topic and physicists working in the modern theoretical physics. (EMS Newsletter, September, 2005) <p> The book under review is the second, substantially enlarged edition a ] with K. Hulek as fourth co-author. a ] the bibliography has been updated and tremendously enlarged, thereby reflecting the vast activity in the field during the past twenty years. Now as before, the text is enriched by numerous instructive examples. a ] No doubt, this book remains a must for everyone dealing with complex algebraic surfaces, be it a student, an active researcher in complex geometry, or a mathematically ambitioned (quantum) physicist. (Werner Kleinert, Zentralblatt MATH, Vol. 1036 (11), 2004)

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