* Preface * Auxiliary Facts * Zero Distribution of Polynomials * Discrepancy Theorems via Two-Sided Bounds for Potentials * Discrepancy Thoerems via One-Sided Bounds for Potentials * Discrepancy Theorems via Energy Integrals * Applications of Jentzsch-Szegö and Erdös-Turán Type Theorems * Applications of Discrepancy Theorems * Special Topics * Appendix A: Conformally INvariant Characteristics of Curve Families * Appendix B: Basics in the Theory of Quasiconformal Mappings * Appendix C: Constructive Theory of Functions of a Complex Variable * Appendix D: Miscellaneous Topics * Bibliography * Glossary of Notation * Index *
A concise outline of the basic facts of potential theory and quasiconformal mappings makes this book an ideal introduction for non-experts who want to get an idea of applications of potential theory and geometric function theory in various fields of construction analysis.
Analysis is the branch of mathematics concerned with limits of functions, sequences and series. Potential theory is the study of potential functions. This book is an authoritative and up-to-date introduction to both fields.