Synopses & Reviews
Review
From the reviews: "The uniqueness theory of transcendental meromorphic functions goes back to R. Nevanlinna who proved that any non-constant meromorphic function can be determined by five values applying the value distribution theory established by himself. ... This book is the first exposition systematically summarizing recent results, and also presenting useful skills in this field." (Katsuya Ishizaki, Zentralblatt MATH, Vol. 1070 (21), 2005)
Review
From the reviews:
"The uniqueness theory of transcendental meromorphic functions goes back to R. Nevanlinna who proved that any non-constant meromorphic function can be determined by five values applying the value distribution theory established by himself. ... This book is the first exposition systematically summarizing recent results, and also presenting useful skills in this field." (Katsuya Ishizaki, Zentralblatt MATH, Vol. 1070 (21), 2005)
Table of Contents
Preface. 1. Basic Nevanlinna Theory. 2. Unicity of functions of finite (lower) order. 3. Five-Value, Multiple Value and Uniqueness. 4. The Four-Value Theorem. 5. Functions Sharing Three Common Values. 6. Three-Value Sets of Meromorphic Functions. 7. Functions Sharing One or Two Values. 8. Functions Sharing Values with Their Derivatives. 9. Two Functions whose derivatives share values. 10. Meromorphic Functions Sharing Sets. Bibliography. Index.