🎉 Up to 70% Off Selected ItemsShop Sale
Complex Variables
A caution to mathematics professors: Complex Variables does not follow conventional outlines of course material. One reviewer noting its originality wrote: "A standard text is often preferred [to a superior text like this] because the professor knows the order of topics and the problems, and doesn't really have to pay attention to the text. He can go to class without preparation." Not so here — Dr. Flanigan treats this most important field of contemporary mathematics in a most unusual way. While all the material for an advanced undergraduate or first-year graduate course is covered, discussion of complex algebra is delayed for 100 pages, until harmonic functions have been analyzed from a real variable viewpoint. Students who have forgotten or never dealt with this material will find it useful for the subsequent functions. In addition, analytic functions are defined in a way which simplifies the subsequent theory. Contents include: Calculus in the Plane, Harmonic Functions in the Plane, Complex Numbers and Complex Functions, Integrals of Analytic Functions, Analytic Functions and Power Series, Singular Points and Laurent Series, The Residue Theorem and the Argument Principle, and Analytic Functions as Conformal Mappings.
Those familiar with mathematics texts will note the fine illustrations throughout and large number of problems offered at the chapter ends. An answer section is provided. Students weary of plodding mathematical prose will find Professor Flanigan's style as refreshing and stimulating as his approach.
Those familiar with mathematics texts will note the fine illustrations throughout and large number of problems offered at the chapter ends. An answer section is provided. Students weary of plodding mathematical prose will find Professor Flanigan's style as refreshing and stimulating as his approach.
Reprint of the Allyn and Bacon, Inc., Boston, 1972 edition.
math;mathematics;physics;textbook;teacher;student;graduate student;science;calculus in the plane;harmonic functions in the plane;complex numbers and complex functions;integrals of analytic functions;analytic functions and power series;singular points and laurent series;the residue theorem and the argument principle;and analytic functions as conformal mappings;harmonic functions;illustrations;answer section;Â graph theory;pure mathematics;math students;differential equations;functional analysis;mathematical thinking;math history;algebra text;complex functions;ordinary differential;theory stands;applied math;beginning graduate;galois theory;advanced calculus;numerical methods;cauchy-riemann equations;level math;abstract algebra;self study;partial differential;assigned textbook;mathematical rigor;pure math;math text;algebra class;complex analysis;linear algebra;mathematical background;advanced math;highly disorganized;intuitive understanding;undergraduate students;introductory text;coddington;zill;chapra;saff;coburn;berge;crc;algebraic;hamming;bostock;greenberg;springer;fourier;tiles;krantz;dover;conformal;topology;chartrand;tenenbaum;generating;bartle;pinter;modulus;harmonic;boyce;combinatorial;bundle;cauchy;laplace;hamiltonian;edwards;integrals;quadratic;marsden;topological;handbook;fisher;mendelson;churchill;buck;compactness;self-study;hardy;cambridge;proofs;discrete;outlines;stewart;manual;cole;theorems;odes;trudeau;solutions;taylor;analytic;metric;graphs;textbooks;applications;rigorous;spaces;suggestion;exercises;flanigan;books on differential equations;books on self studies;books on numerical methods;books on math students;books on complex functions;books on theory stands;books on applied maths;books on functional analysis;books on graph theories;books on math histories;books on mathematical thinkings;books on algebra texts;books on pure mathematics;books on level maths$19.95
Complex Variables—
$19.95
Product Information
Product Information
Shipping & Returns
Shipping & Returns
Description
A caution to mathematics professors: Complex Variables does not follow conventional outlines of course material. One reviewer noting its originality wrote: "A standard text is often preferred [to a superior text like this] because the professor knows the order of topics and the problems, and doesn't really have to pay attention to the text. He can go to class without preparation." Not so here — Dr. Flanigan treats this most important field of contemporary mathematics in a most unusual way. While all the material for an advanced undergraduate or first-year graduate course is covered, discussion of complex algebra is delayed for 100 pages, until harmonic functions have been analyzed from a real variable viewpoint. Students who have forgotten or never dealt with this material will find it useful for the subsequent functions. In addition, analytic functions are defined in a way which simplifies the subsequent theory. Contents include: Calculus in the Plane, Harmonic Functions in the Plane, Complex Numbers and Complex Functions, Integrals of Analytic Functions, Analytic Functions and Power Series, Singular Points and Laurent Series, The Residue Theorem and the Argument Principle, and Analytic Functions as Conformal Mappings.
Those familiar with mathematics texts will note the fine illustrations throughout and large number of problems offered at the chapter ends. An answer section is provided. Students weary of plodding mathematical prose will find Professor Flanigan's style as refreshing and stimulating as his approach.
Those familiar with mathematics texts will note the fine illustrations throughout and large number of problems offered at the chapter ends. An answer section is provided. Students weary of plodding mathematical prose will find Professor Flanigan's style as refreshing and stimulating as his approach.
Reprint of the Allyn and Bacon, Inc., Boston, 1972 edition.
math;mathematics;physics;textbook;teacher;student;graduate student;science;calculus in the plane;harmonic functions in the plane;complex numbers and complex functions;integrals of analytic functions;analytic functions and power series;singular points and laurent series;the residue theorem and the argument principle;and analytic functions as conformal mappings;harmonic functions;illustrations;answer section;Â graph theory;pure mathematics;math students;differential equations;functional analysis;mathematical thinking;math history;algebra text;complex functions;ordinary differential;theory stands;applied math;beginning graduate;galois theory;advanced calculus;numerical methods;cauchy-riemann equations;level math;abstract algebra;self study;partial differential;assigned textbook;mathematical rigor;pure math;math text;algebra class;complex analysis;linear algebra;mathematical background;advanced math;highly disorganized;intuitive understanding;undergraduate students;introductory text;coddington;zill;chapra;saff;coburn;berge;crc;algebraic;hamming;bostock;greenberg;springer;fourier;tiles;krantz;dover;conformal;topology;chartrand;tenenbaum;generating;bartle;pinter;modulus;harmonic;boyce;combinatorial;bundle;cauchy;laplace;hamiltonian;edwards;integrals;quadratic;marsden;topological;handbook;fisher;mendelson;churchill;buck;compactness;self-study;hardy;cambridge;proofs;discrete;outlines;stewart;manual;cole;theorems;odes;trudeau;solutions;taylor;analytic;metric;graphs;textbooks;applications;rigorous;spaces;suggestion;exercises;flanigan;books on differential equations;books on self studies;books on numerical methods;books on math students;books on complex functions;books on theory stands;books on applied maths;books on functional analysis;books on graph theories;books on math histories;books on mathematical thinkings;books on algebra texts;books on pure mathematics;books on level maths
