Generalization of certain well-known inequalities for rational functions

Let $P_m$ be a class of all polynomials of degree at most m and let $R_{m,n}=R_{m,n}(d_{1}, ..., d_{n})=\{p(z)/w(z);p\in P_{m}, w(z)=\prod_{j={1}}^n(z-d_{j})~ $where$ ~ \vert d_{j}\vert\ >1, j=1, ..., n$ and $m\leq n\}$ denote the class of rational functions. It is proved that if the rational function $r(z)$ having all its zeros in $\vert z\vert\leq1$, then for $\vert z\vert=1$ $\vert r^{'}(z)\vert\geq \frac{1}{2}\{\vert B^{'}(z)\vert-(n-m)\} \vert r(z)\vert$. The main purpose of this paper is to improve the above inequality for rational functions $r(z)$ having all its zeros in $\vert z\vert\leq k\leq1$ with $t$-fold zeros at the origin and some other related inequalities. The obtained results sharpen some well-known estimates for the derivative and polar derivative of polynomials.