Complex variables and applications = 复变函数及应用 / 8th ed.

preface .

1 complex numbers

sums and products

basic algebraic properties

further properties

vectors and moduli

complex conjugates

exponential form

products and powers in exponential form

arguments of products and quotients

roots of complex numbers

examples

regions in the complex plane

2 analytic functions

functions of a complex variable

mappings

mappings by the exponential function

limits

theorems on limits

limits involving the point at infinity

.continuity

derivatives

differentiation formulas

cauchy-riemann equations

sufficient conditions for differentiability

polar coordinates

analytic functions

examples

harmonic functions

uniquely determined analytic functions

reflection principle

3 elementary functions

the exponential function

the logarithmic function

branches and derivatives of logarithms

some identities involving logarithms

complex exponents

trigonometric functions

hyperbolic functions

inverse trigonometric and hyperbolic functions

4 integrals

derivatives of funcfons w(t)

definite integrals of functions w(t)

contours

contour integrals

some examples

examples with branch cuts

upper bounds for moduli of contour integrals

antiderivatives

proof of the theorem

cauchy-goursat theorem

proof of the theorem

simply connected domains

multiply connected domains

cauchy integral formula

an extension of the cauchy integral formula

some consequences of the extension

liouville's theorem and the fundamental theorem of algebra

maximum modulus principle

5 series

convergence of sequences

convergence of series

taylor series

proof of taylor's theorem ..

examples

laurent series

proof of laurent's theorem

examples

absolute and uniform convergence of power series

continuity of sums of power series

integration and differentiation of power series

uniqueness of series representations

multiplication and division of power series

6 residues and poles

isolated singular points

residues

cauchy's residue theorem

residue at infinity

the three types of isolated singular points

residues at poles

examples

zeros of analytic functions

zeros and poles

behavior of functions near isolated singular points

7 applications of residues

evaluation of improper integrals

example

improper integrals from fourier analysis

jordan's i.emma

indented paths

an indentation around a branch point

integration along a branch cut

definite integrals involving sines and cosines

argument principle

roucht's theorem

inverse laplace transforms

examples

8 mapping by elementary functions

linear transformations

the transformation w = 1/z

mappings by 1/z

linear fractional transformations

an implicit form

mappings of the upper half plane

the transformation w = sin z

mappings by z2 and branches of z1/2

square roots of polynomials

riemann surfaces

surfaces for related functions

9 conformal mapping

preservation of angles

scale factors

local inverses

harmonic conjugates

transformations of harmonic functions

transformations of boundary conditions

10 applications of conformal mapping

steady temperatures

steady temperatures in a half plane

a related problem

temperatures in a quadrant

electrostatic potential

potential in a cylindrical space

two-dimensional fluid flow

the stream function

flows around a comer and around a cylinder

11 the schwarz-christoffel transformation

mapping the real axis onto a polygon

schwarz-christoffel transformation

triangles and rectangles

degenerate polygons

fluid flow in a channel through a slit

flow in a channel with an offset

electrostatic potential about an edge of a conducting plate

12 integral formulas of the poisson type

poisson integral formula

dirichlet problem for a disk

related boundary value problems

schwarz integral formula

dirichlet problem for a half plane

neumann problems

appendixes

bibliography

table of transformations of regions

index ...