Estimates of the derivatives of rational functions in \(L_ p[-1,1]\) (Q1078720)

Let r be a rational function of degree n (n\(\geq 1)\) with all poles outside of the interval [-1,1], \(s\in {\mathbb{N}}\), \(1<p<\infty\) and \(\sigma =(s+p)^{-1}\). Then \(\| r^{(s)}\|_{\sigma}\leq c(s,p)n^ s\| r\|_ p.\) This result lies in the field of the author's earlier investigations. For details we have to refer to the paper.