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3. Let f be an entire function whose modulus is contant on a circle centred at...
Let f: C→C be an entire, one-to-one function. (a) Explain why g()-f() f(0) is an entire 1-1 function (b) Explain why there exists0 such that B(O,e) C g(B(O, 1)). Hint: Open Mapping thm.] (c) Explain why Ig(z)2є if 221 . [Hint: g is 1-1.] (d) Since g(0)=0, g(z)=2h(z) for some entire function h(z). Explain why h(z) is never 0 (e) Show that there is a constant C>0 such that 1/h2)l C if21 (f) Deduce that 1/h (z) is a constant...
question3 3. * Let f be an entire function which restricts to a real function f:R R on the real axis. Show that for all z e C, f(z) = f(z). (Hint: refer to Problem set 2 Qn 1.)
7. Let f be an entire function. Suppose there exists € >0 such that f(2) > € for every 2 E C. Show that f is constant. (Hint: Apply Liouville's theorem to the function g(2) = 1/f().)
Let f(z) be entire and such that Im f(z)S cfor all z. By considering the function ee show that f(z) is a constant. -if (z)
3. Suppose f is an entire function. Show that any of the two criteria below imply that f is a constant function. (a) Imf(z) #0 for all z E C and Ref (2) is an entire function. Imf (2) [10] (b) -1 < Ref(x) < 1 for all 2 € C. [8]
3. Suppose f is an entire function. Show that any of the two criteria below imply that f is a constant function. (a) Imf(x) #0 for all 2 € C and Ref(is an entire function. [10] (b) -1 < Ref(x) < 1 for all z e C. [8]
10 points Suppose f is an entire function and there is a constant c such that Ref(z) < c for all z. Show that f is constant. (Hint: Consider exp(f(z)).]
4. Let p(u, v) be a non-zero Cl function of two real variables whose gradient is non-zero on the set fp 0, and let f u+ iv be holomorphic on region 2 C C and satisfy p(Re (f), Im (f))-0. Prove that f is constant on Ω. Conclude as special cases that if f is holomorphic on a connected open set and f is real valued, then f is constant, or if the modulus off is constant on Ω, then...
12. Let D = {2E C | 너く1} denote the open unit disc and let f : D → C be a holomorphic function. Suppose that for any integer n>1 we have that f(1/n)-1/n3. Show that f(z)3. 12. Let D = {2E C | 너く1} denote the open unit disc and let f : D → C be a holomorphic function. Suppose that for any integer n>1 we have that f(1/n)-1/n3. Show that f(z)3.
Complex Analysis Need it ASAP Suppose f is an entire function. Show that any of the two criteria below imply that f is a constant function. (a) Imf(z) #0 for all z EC and Ref(z) is an entire function. [10] (b) -1 < Ref (2) <1 for all z E C. [8]