“Renate Tobies’ Felix Klein is meticulously researched. … Renate Tobies has written an authoritative biography of Felix Klein. It is informative, detailed, and marks an important addition to the scholarly literature. I recommend it enthusiastically.” (Benjamin Linowitz, MAA Reviews, January 29, 2023)
“Renate Tobies has given us in this book an exhaustive and authoritative survey of the life and works of one of the most remarkable mathematicians of the late nineteenth and early twentieth century, Felix Klein.” (Eduard Glas, Mathematical Reviews, May, 2022)
“Pursuing Klein’s life takes the reader on a journey through the history of the important German mathematical community in the 19thcentury and their connections to foreign mathematicians. … The book is very readable and leaves nothing to be desired. It will certainly become the standard reference on Klein.” (Thomas Sonar, zbMATH 1480.01002, 2022)
Preface.- 1 Introduction.- 2 Influencing groups.- 3 Professorship at the University of Erlangen.- 4 Professorship at the Polytechnikum Munich.- 5 Professorship of Geometry in Leipzig.- 6 Start as Professor in Göttingen, 1886-1892.- Setting the course.- 8 Fruits of the efforts, 1895-1913.- 9 World War I and post-war period.- 10 Concluding remarks.- Appendix: Selection of documents.
Renate Tobies is a historian of mathematics and science at the Friedrich Schiller University in Jena (Germany). After completing her academic degrees at the University of Leipzig, she served as the managing editor of NTM: Journal for the History of Science, Technology, and Medicine for twenty years. She was a visiting professor at the University of Kaiserslautern and an interim professor of the history of science and technology at the University of Stuttgart. Throughout her career, she has held additional visiting professorships in Braunschweig, Saarbrücken, Jena, Linz, and Graz. Her main research fields are the history of mathematics and its applications, and women in mathematics, science, and technology. She has published more than ten books and hundreds of articles. She is a full member of the Académie Internationale d’Histoire des Sciences (Paris) and a foreign member of the Agder Academy of Sciences and Letters (Kristiansand, Norway).
About Felix Klein, the famous Greek mathematician Constantin Carathéodory once said: “It is only by illuminating him from all angles that one can come to understand his significance.” The author of this biography has done just this. A detailed study of original sources has made it possible to uncover new connections; to create a more precise representation of this important mathematician, scientific organizer, and educational reformer; and to identify misconceptions.
Because of his edition of Julius Plücker’s work on line geometry and due to his own contributions to non-Euclidean geometry, Klein was already well known abroad before he received his first full professorship at the age of 23. By exchanging ideas with his most important cooperation partner, the Norwegian Sophus Lie, Klein formulated his Erlangen Program. Various other visionary programs followed, in which Klein involved mathematicians from Germany and abroad. Klein was the most active promoter of Riemann’s geometric-physical approach to function theory, but he also integrated the analytical approaches of the Weierstrass school into his arsenal of methods.
Klein was a citizen of the world who repeatedly travelled to France, Great Britain, Italy, the United States, and elsewhere. Despite what has often been claimed, it must be emphasized that Klein expressly opposed national chauvinism. He promoted mathematically gifted individuals regardless of their nationality, religion, or gender. Many of his works have been translated into English, French, Italian, Russian, and other languages; more than 300 supporters from around the world made it possible for his portrait to be painted by the prominent impressionist Max Liebermann.
Inspired by international developments, Klein paved the way for women to work in the field of mathematics. He was instrumental in reforming mathematical education, and he endorsed an understanding of mathematics that affirmed its cultural importance as well as its fundamental significance to scientific and technological progress.