An Introduction to Complex Analysis, 2011
Auteurs : Agarwal Ravi P., Perera Kanishka, Pinelas Sandra
Preface.-Complex Numbers.-Complex Numbers II .- Complex Numbers III.-Set Theory in the Complex Plane.-Complex Functions.-Analytic Functions I.-Analytic Functions II.-Elementary Functions I.- Elementary Functions II.- Mappings by Functions.- Mappings by Functions II.- Curves, Contours, and Simply Connected Domains.- Complex Integration.- Independence of Path.- Cauchy–Goursat Theorem.- Deformation Theorem.- Cauchy’s Integral Formula.- Cauchy’s Integral Formula for Derivatives.- Fundamental Theorem of Algebra.- Maximum Modulus Principle.- Sequences and Series of Numbers.- Sequences and Series of Functions.- Power Series.- Taylor’s Series.- Laurent’s Series.- Zeros of Analytic Functions.- Analytic Continuation.- Symmetry and Reflection.- Singularities and Poles I.- Singularities and Poles II.- Cauchy’s Residue Theorem.- Evaluation of Real Integrals by Contour Integration I.- Evaluation of Real Integrals by Contour Integration II.- Indented Contour Integrals.- Contour Integrals Involving Multi–valued Functions .- Summation of Series. Argument Principle and Rouch´e and Hurwitz Theorems.- Behavior of Analytic Mappings.- Conformal Mappings.- Harmonic Functions.- The Schwarz–Christoffel Transformation.- Infinite Products.- Weierstrass’s Factorization Theorem.- Mittag–Leffler’s Theorem.- Periodic Functions.- The Riemann Zeta Function.- Bieberbach’s Conjecture.- The Riemann Surface.- Julia and Mandelbrot Sets.- History of Complex Numbers.- References for Further Reading.- Index.
Date de parution : 10-2014
Ouvrage de 331 p.
15.5x23.5 cm
Date de parution : 07-2011
Ouvrage de 331 p.
15.5x23.5 cm
Thème d’An Introduction to Complex Analysis :
Mots-clés :
analytic function; complex function; complex variables; series