Krushkal, in handbook of complex analysis, 2005 1.2 sketch of the proof of theorem 1.1. Putting the value of z in equation which is to be determined. A mapping defined by analytic functions is conformal.
Solved:given Conformal Mapping W = U + Iv =F(Z) = E = Exp(Z) Where Z =X +Iy= 2+Iy (X=2, 0 <Y<T) Show That U = E2 #Cos(Y), V= E2 Sin(Y) Now For from www.numerade.com
(a) d is the plane c and f (∞) = ∞;
Conformal Mapping Of Cos Z Krushkal, In Handbook Of Complex Analysis, 2005 1.2 Sketch Of The Proof Of Theorem 1.1.
) is harmonic in the unit disk u(x;y) = u(˘(x;y); For our purposes it is sufficient to characterize conformal mapping as a map φ: Putting the value of z in equation which is to be determined.
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