Math, asked by mahrukhrukhi99, 10 months ago

prove that the unit circle in the complex plane is homomorphism​

Answers

Answered by Anonymous
3

Answer:

For every real number r, the function

f(x)=eirx

is a continuous homomorphism.

If g is any continuous homomorphism, show that there is a unique real number p such that for all real numbers x,

g(x)=eipx

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