
Most conformal invariants can be described in terms of extremal properties. Conformal invariants and extremal problems are therefore intimately linked and form together the central theme of this classic book which is primarily intended for students with approximately a year's background in complex variable theory. The book emphasizes the geometric approach as well as classical and semi-classical results which Lars Ahlfors felt every student of complex analysis should know before embarking on independent research. At the time of the book's original appearance, much of this material had never appeared in book form, particularly the discussion of the theory of extremal length. Schiffer's variational method also receives special attention, and a proof of $ ert a_4 ert leq 4$ is included which was new at the time of publication. The last two chapters give an introduction to Riemann surfaces, with topological and analytical background supplied to support a proof of the uniformization theorem. Included in this new reprint is a Foreword by Peter Duren, F. W. Gehring, and Brad Osgood, as well as an extensive errata.
This text investigates the relationship between conformal invariants and extremal properties within the field of complex variable theory. Lars Valerian Ahlfors, a preeminent mathematician, synthesizes classical and semi-classical results to provide a geometric framework for complex analysis. The book serves as a pedagogical bridge for students who possess a foundational year of study in complex variables, aiming to prepare them for independent research through rigorous proofs and conceptual development.
What You Will Find
Scope Limits
Experts and mathematicians consistently identify this work as a foundational text for students specializing in geometric function theory. Readers frequently note the high level of mathematical rigor and the clarity with which Ahlfors presents complex geometric concepts.
Page Count:
157
Publication Date:
1973-01-01
Publisher:
McGraw-Hill Companies
ISBN-10:
0070006598
ISBN-13:
9780070006591
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