On some results for meromorphic univalent functions having quasiconformal extension

We consider the class $\Sigma(p)$ of univalent meromorphic functions $f$ on $\ID$ having simple pole at $z=p\in[0,1)$ with residue 1. Let $\Sigma_k(p)$ be the class of functions in $\Sigma(p)$ which have $k$-quasiconformal extension to the extended complex plane $\sphere$ %with $q=\frac{1+k}{1-k}$ where $0\leq k < 1$. We first give a representation formula for functions in this class and using this formula we derive an asymptotic estimate of the Laurent coefficients for the functions in the class $\Sigma_k(p)$. Thereafter we give a sufficient condition for functions in $\Sigma(p)$ to belong in the class $\Sigma_k(p).$ Finally we obtain a sharp distortion result for functions in $\Sigma(p)$ and as a consequence, we get a distortion estimate for functions in $\Sigma_k(p).$