Hardy's theorem

In mathematics, Hardy's theorem is a result in complex analysis describing the behavior of holomorphic functions.

Let f {\displaystyle f} be a holomorphic function on the open ball centered at zero and radius R {\displaystyle R} in the complex plane, and assume that f {\displaystyle f} is not a constant function. If one defines

I ( r ) = 1 2 π 0 2 π | f ( r e i θ ) | d θ {\displaystyle I(r)={\frac {1}{2\pi }}\int _{0}^{2\pi }\!\left|f(re^{i\theta })\right|\,d\theta }

for 0 < r < R , {\displaystyle 0<r<R,} then this function is strictly increasing and is a convex function of log r {\displaystyle \log r} .

See also

  • Maximum principle
  • Hadamard three-circle theorem

References

  • John B. Conway. (1978) Functions of One Complex Variable I. Springer-Verlag, New York, New York.

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