Complex Variable: Schwarz's Theorem Show that if f(z) is analytic for ∣z∣≤R, f(0)=0 and M ∣f(z)∣≤M...

(1) Find all functions f(z) that are analytic in the entire complex plane and satisfy 2|sin(z)|...

(1) Find all functions f(z) that are analytic in the entire complex plane and satisfy 2|sin(z)| ≥ |f(z)|. (2) Find all functions f(z) that are analytic in the entire complex plane and satisfy 2|f(z)| ≥ |sin(z)|.

Consider a function F=u+iv which is analytic on the set D={z|Rez>1} and that u_x+v_y=0 on D....

Consider a function F=u+iv which is analytic on the set D={z|Rez>1} and that u_x+v_y=0 on D. Show that there exists a real constant p and a complex constant q such that F(z)=-ipz+q on D. Notation: Here u_x denotes the partial derivative of u with respect to x and v_y denotes the partial derivative of v with respect to y.

suppose f is analytic on a domain g and the area of f(g) is 0. show...

suppose f is analytic on a domain g and the area of f(g) is 0. show f is constant on g

(Complex integration) ~ Integrate f(z) counterclockwise around the unit circle. Indicate whether Cauchy's integral theorem applies....

(Complex integration) ~ Integrate f(z) counterclockwise around the unit circle. Indicate whether Cauchy's integral theorem applies. Show the details. f(z) = (z^3)*(cot(z))

13. Show that an analytic function f(z) in a domain D cannot have a constant modulus...

13. Show that an analytic function f(z) in a domain D cannot have a constant modulus unless f is a constant function.

Please show all steps, thank you: Problem C: Does there exist an analytic function f(z) in...

Please show all steps, thank you: Problem C: Does there exist an analytic function f(z) in some domain D with the real part u(x,y)=x^2+y^2? Problem D: Is the function f(z)=(x-iy)^2 analytic in any domain in C? Are the real part u(x,y) and the imaginary pary v(x,y) harmonic in C? Are u and v harmonic conjugates of each other in any domain?

Assume set A={z1,z2,....,zm) is a m-point set in C. If f(z) is analytic and bounded on...

Assume set A={z1,z2,....,zm) is a m-point set in C. If f(z) is analytic and bounded on C\A, prove that f(z) always equal to a constant

a) If F(x) is an analytic function and either Re(F(z)) or Im(F(z)) is a constant, then...

a) If F(x) is an analytic function and either Re(F(z)) or Im(F(z)) is a constant, then F (z) is a constant function.

Complex Analysis Proof - Prove: if f = u + iv is analytic in a domain...

Complex Analysis Proof - Prove: if f = u + iv is analytic in a domain D, then u and v satisfy the Cauchy-Riemann equations in D.

Use Stoke’s Theorem to evaluate Z C F~ · d~r where F~ = 2y~i+ 6z~j +...

Use Stoke’s Theorem to evaluate Z C F~ · d~r where F~ = 2y~i+ 6z~j + 5x~k and C is the triangle with vertices (corners) at (5, 0, 0), (0, 5, 0), and (0, 0, 5) oriented clockwise when viewed from above