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(b) Suppose f is analytic in a neighborhood of the closed and bounded nonempty domain D....
8. Let f be analytic on a bounded domain D and continuous on Du B, where B is the boundary of D. Show that if f is never zero on D, then the minimum of lfl is assumed on B. You will need to use the fact that lfl does, indeed, assume a minimum somewhere on D B 8. Let f be analytic on a bounded domain D and continuous on Du B, where B is the boundary of D....
6. Let D be a bounded domain with boundary B. Suppose that f and g are both analytic on D and continuous on Du B, and suppose further that Re /(z)- Re g(z) for all z e B. Show that J-g + ία in D, where α is a real constant. 6. Let D be a bounded domain with boundary B. Suppose that f and g are both analytic on D and continuous on Du B, and suppose further that...
11. (8)(a) Suppose that f and g are analytic branches of zt on a domain D such that 0 g D Show that there is a fifth root, wo, of 1 such that f(z)-wog(2) for all E D. I suggest considering h(z) f (z)/g(z) (b) Now suppose that D D C(-,0]. Let f be an analytic branch of zt in D such that f (1) 1. Show that f(z) expLog(2)) for all z ED. 11. (8)(a) Suppose that f and...
D. (a) Show that if f is Let f be complex differentiable on a bounded domain D and is continuous on the closure D = DU non-zero on D the modulus $(2) attains it's minimum on the boundary aD. Hint: Consider FT2) (b) Give an example that shows that the assumption that f is non-zero on D is necessary.
12. Suppose that fis analytic on a convex domain D and that Re(f ,(z)) > 0 for all z E D. Show that f is one-to-one on D. (Hint: /(z2) - sz) J,f'(w) dw, where is the line segment joining z1 to z2.) 12. Suppose that fis analytic on a convex domain D and that Re(f ,(z)) > 0 for all z E D. Show that f is one-to-one on D. (Hint: /(z2) - sz) J,f'(w) dw, where is the...
Problem 4. (5 points) Suppose f is analytic on and inside a simple closed curve C. Assume f(x) = 0 for z on C. Show f(2)=0 for all z inside C.
Applied Complex Analysis Exercise. Show all work. PLEASE ANSWER IN A LEGIBLE MANNER. IF YOU HAVE BAD HANDWRITING, DO NOT ANSWER. Problem 2. Suppose that f is continuous in a closed bounded region R and it is analytic, non-constant and non-zero in the interior of R. Then prove that the minimum value of If(2) in R occurs somewhere on the boundary of R and never in the interior. Hint: Apply the Marimum Principle to the unction g(z)-1/f(z) (why can it...
Problem 5. Suppose that f: +C is analytic on an open set 12 containing the closed half plane H = {2€ C: Im(x) > 0} and that there is a finite constant M with f() < M for all z H. 1. Show that da = f(i) x² +1 +00 2. Show that if o is a point in C with Im(a) > 0, then I (a) Im(a)' 22-2Re(a)x+ lajar (3) deduce sin (Bx) where 870
Exercise 3 Let f be an analytic function on D(0,1). Suppose that f(z) < 1 for all z € C and f() = 0. Show that G) . (Hint: use the function g(z) = f(2).)
8) This is essentially p.221, #15a), but using more clarified notation. Let D be a closed, bounded interval and f : D → R. Suppose that for each c E D there exists δ = and M = Mc both depending on c where If(x)| < M if |x-c| < δ and x E D. Prove that in fact f is bounded on D. That is, there exists M>0 with If (x)S M for all x E D. Also, find...