Purely Real-valued Analytic Functions?

  • Thread starter Thread starter jtleafs33
  • Start date Start date
  • Tags Tags
    Functions
Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
3 replies · 3K views
jtleafs33
Messages
28
Reaction score
0

Homework Statement


Can a function which is purely real-valued be analytic? Describe the behavior of such functions?


Homework Equations


The Cauchy-Riemann conditions
ux=vy, vx=-uy

The Attempt at a Solution



I can't think of any pure real-valued equations off the top of my head which satisfy the CR conditions. However, could any function like sin(x), cos(x), e^x, which is infinitely differentiable be considered analytic? Doesn't infinite differentiability imply that the CR conditions are already satisfied?
 
Physics news on Phys.org
jtleafs33 said:

Homework Statement


Can a function which is purely real-valued be analytic? Describe the behavior of such functions?


Homework Equations


The Cauchy-Riemann conditions
ux=vy, vx=-uy

The Attempt at a Solution



I can't think of any pure real-valued equations off the top of my head which satisfy the CR conditions. However, could any function like sin(x), cos(x), e^x, which is infinitely differentiable be considered analytic? Doesn't infinite differentiability imply that the CR conditions are already satisfied?

No. If your function is real valued then v=0. What does that tell you about u?
 
If v=0, then vx=vy=0. So then, u must be constant, so that it's derivative will also be zero, and thus satisfy the CR conditions?
 
jtleafs33 said:
If v=0, then vx=vy=0. So then, u must be constant, so that it's derivative will also be zero, and thus satisfy the CR conditions?

Yes, that's it. The only purely real analytic functions are constant.