1549312215-Complex_Analysis_for_Mathematics_and_Engineering_5th_edition__Mathews

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11.3 • POISSON'S INTEGRAL FOR.MULA FOR THE UPPER HALF-PLANE 439


  1. Find the function <fi (x, y) that is harmonic in the quarter-disk x > 0, y > 0, lzl < 1
    and has the boundary values


<P(x, y) = 3,
<P (x, 0) = -3,
<P (0, y) = -3,

forx+iy= z=e'^9 , 0<11<~;
for 0 ~ x < l;
forO<y<l.


  1. Find the function t/> (x, y) that is harmonic in the unit disk lzl < 1 and has the
    boundary values


t/>(x, y) = 1,

tf>(x, y) = 0,

for x + iy = z = e•^6 ,

for x + iy = z = e^19 ,

11.3 Poisson's Integral Formula for the Upper Half-Plane

The Dirichlet problem for the upper half-plane Im(z) > 0 is to find a function


(x, y) that is harmonic in the upper half-plane and has the boundary values
</> (x,O) = U (x), where U (x) is a real-valued function of the real variable x.
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