Let $f$ be an entire function such that $|f(z)|\leq A+B|z|^k$ for all $z$, where $A$, $B$, $k$ are positive numbers.
Prove that $f$ is polynomial.
Let $f$ be an entire function such that $|f(z)|\leq A+B|z|^k$ for all $z$, where $A$, $B$, $k$ are positive numbers.
Prove that $f$ is polynomial.
Since $f(z)$ is entire, from Cauchy integral formula, we have $f^{(n)}(0) = \dfrac{n!}{2 \pi i}\oint_{C_r} \dfrac{f(z)}{z^{n+1}} dz$ On $C_r$, the integrand is bounded by $\left \vert \dfrac{f(z)}{z^{n+1}} \right \vert \leq \dfrac{A}{\left \vert z^{n+1} \right \vert} + \dfrac{B}{\left \vert z^{n+1-k} \right \vert} = \dfrac{A}{r^{n+1}} + \dfrac{B}{r^{n+1-k}}$ Now argue out why $f^{(n)}(0) = 0$ for $n > k$ by letting $r \to \infty$ and looking at what happens to the integral.
Hint: start with $f(z)/z^k$ (assuming $k$ is an integer) and subtract the principal part of the pole at $0$. What could be left?
Show that $f$ has (at worst) a pole at infinity.