Ch 2: Analytic functions, Sec 15-16: Limits Flashcards
Formal definition of a limit for a complex valued function
FIX
f has a limit $w_0$ at $z_0$ if $\forall \epsilon > 0 \ \exists \delta > 0 $ st if
$z \in D_f $ and
$0< |z-z_0|$ then
Uniqueness of complex limits
If the limit of a complex valued function f exsists, then it is unique
Limits of complex numbers means what for ‘components’
if $f(z) = u(x,y) + v(x,y)$ where $z = x+iy, \quad z_0 = x_0 +i y_0 \quad w_0 = u _0 + iv_0$ then…
the limit as $(x,y) \rightarrow (x_0,y_0)$ of $u(x,y) =u_0$
and
the limit as $(x,y) \rightarrow (x_0,y_0)$ of $v(x,y) =v_0$
iff
the limit as $z \rightarrow z_0$ of $f(z) =w_0$
Limit rules hold as in the real case for
addition, ,ultiplication, division (given that deno limit not 0)