Bernstein's theorem (polynomials)

Bernstein's theorem is an inequality relating the maximum modulus of a complex polynomial function on the unit disk with the maximum modulus of it's derivative on the unit disk. It was proven by Sergei Bernstein while he was working on approximation theory.^[1]

Let ${\displaystyle max_{|z|=1}|f(z)|}$ denote the maximum modulus of an arbitrary function f(z) on |z| = 1, and let f'(z) denote it's derivative. Then for every polynomial P(z) of degree n we have ${\displaystyle max_{|z|=1}|P'(z)|\leq n\ max_{|z|=1}|P(z)|}$.

The inequality is best possible with equality holding if and only if ${\displaystyle P(z)=\alpha z^{n},\ |\alpha |=max_{|z|=1}|P(z)|}$. ^[2]

Let P(z) be a polynomial of degree ${\displaystyle n}$. and let Q(z) be another polynomial of the same degree with no zeros in ${\displaystyle |z|\geq 1}$ We show that if ${\displaystyle |P(z)|<|Q(z)|\ on\ |z|=1}$, then ${\displaystyle |P'(z)|\leq |Q'(z)|\ on\ |z|\geq 1}$.

From Rouché's theorem we have ${\displaystyle P(z)+\epsilon \ Q(z)}$, with ${\displaystyle |\epsilon |>1}$ has all it's zeros in |z| < 1. By virtue of Gauss-Lucas theorem, ${\displaystyle P'(z)+\epsilon \ Q'(z)}$ has all it's zeros in ${\displaystyle |z|\leq 1}$. It follow's that ${\displaystyle |P'(z)|\leq |Q'(z)|}$ on ${\displaystyle |z|>1}$, otherwise it would have been possible to choose ${\displaystyle \epsilon }$ such that ${\displaystyle P(z)+\epsilon \ Q(z)}$ had a zero in |z| > 1, with ${\displaystyle |\epsilon |>1}$. Since P'(z) and Q'(z) are both continuous, we have ${\displaystyle |P'(z)|\leq |Q'(z)|\ {\text{on }}|z|\geq 1}$.

For an arbitrary polynomial P(z) of degree n, choosing ${\displaystyle Q(z)=(max_{|z|=1}|P(z)|)z^{n}}$ proves Bernstein's Theorem.

Paul Erdos had conjectured that if P(z) has no zeros in |z| < 1, then ${\displaystyle max_{|z|=1}|P'(z)|\leq {\frac {n}{2}}\ max_{|z|=1}|P(z)|}$, and was proven by Peter Lax. ^[3]

Prof M.A. Malik showed that if P(z) has no zeros in ${\displaystyle |z|\geq k,\ k\geq 1}$, then ${\displaystyle max_{|z|=1}|P'(z)|\leq {\frac {n}{1+k^{n}}}\ max_{|z|=1}|P(z)|}$ ^[4]