Asymptotic behavior of orthogonal polynomials on the circle, with respect to a weight having a fractional zero on the torus. Applications to the eigenvalues of certain unitary random matrices. }\\ This paper is devoted to the orthogonal polynomial on the circle, with respect to a weight of type $ f=(1-\cos \theta )^\alpha c$ where $c$ is a sufficiently smooth function and $\alpha \in ]-\frac{1}{2}, \frac{1}{2}[$. We obtain an asymptotic expansion of the coefficients of this polynomial and of $\Phi^{(p)}_{N}(1)$ for all integer $p$. These results allow us to obtain an asymptotic expansion of the associated Christofel-Darboux kernel, and to compute the distribution of the eigenvalues of a family of random unitary matrices. The proof of the resuts related with the orthogonal polynomials are essentialy based on the inversion of Toeplitz matice associated to the symbol $f$.