Functions of One Complex Variable I

Name: Functions of One Complex Variable I
Author: John B. Conway

John B. Conway

Bibliography · Foundations and Logic

Functions of One Complex Variable I

1978 Book Formal Antecedent Foundations and Logic

Citation

John B. Conway. (1978). Functions of One Complex Variable I. 11. Springer-Verlag.

Publisher

Why this reference is included

Conway’s Functions of One Complex Variable I (1978), published by Springer-Verlag, sits in the program’s reference corpus as a standing technical source. Cited in Book II (Categorical Holomorphy), Part 6, Chapter Laurent Series and Residues, where the program draws on it in the context of “Laurent Series and Residues Classical Laurent theory expands a holomorphic function in an annulus r_1 <

z

< r_2 as a doubly-infinite power series _n=-∞^∞ a_n z^n, with the….”

Cited in

Book II — Categorical Holomorphy Part 6

Chapter Laurent Series and Residues

Laurent Series and Residues Classical Laurent theory expands a holomorphic function in an annulus r_1 < |z| < r_2 as a doubly-infinite power series _n=-∞^∞ a_n z^n, with the residue a_-1 computed by contour integration around the singularity

Bibliographic Details

BibTeX KeyConway1978

AuthorsJohn B. Conway

Year1978

TypeBook

PublisherSpringer-Verlag

Volume11

SeriesGraduate Texts in Mathematics