 |
| circle |
 |
| disk and neighborhood |
 |
| limits of real functions |
 |
| graphic representation of limits |
 |
| criteria for non-existance of limit |
 |
| limit don't exist |
 |
| limit exist and unique |
 |
| real and imaginary part of limit |
 |
| compute limit |
 |
| compute limit |
 |
| Properties of complex limits |
 |
| theorems of limits |
 |
| limits theorems |
 |
| continuity |
 |
| example of continuity |
 |
| differenbility |
 |
| if f(z) is differentiable then f(x) is continuous |
 |
| analytic function at a point ,analytic in a domain |
 |
| entire function, singular points |
 |
| conjugate of function is not analytic,cauchy-Riemann equations or CR's equations |
 |
| criteria for non-analytically |
 |
| importants point about analyticty |
 |
| sufficient condition for differentability |
 |
| function is analytic at origin |
 |
| harmonic function/potential function,harmonic conjugate function |
 |
| obtain conjugate and the original function |
 |
| example of harmonic function |
 |
| cr equation in polar form |
 |
| analytical function with constant modulus is constant |
 |
| function is analytic and its derivative is zero ,is this constant? |
 |
| analytic test |
 |
| complex exponential function |
 |
| derivative,conjugate,argument of complex function |
 |
| modulus ,algebraic properties of complex exponential function,periodic function |
 |
| exponential function is periodic |
 |
| theorems related to periodicity of complex exponential function |
 |
| complex logarithmic function |
 |
| algebraic properties and principal value of complex logarithmic function |
 |
| logarithmic function is inverse of exponential function |
 |
| analyticity of principal branch of complex logarithmic function |
 |
| complex powers ,principal value of complex powers |
 |
| complex trigonometric functions |
 |
| periodicity |
No comments:
Post a Comment