%0 Book Section %B Recent Advances in Matrix and Operator Theory. Operator Theory: Advances and Applications, 179 %D 2008 %T Higher order asymptotic formulas for traces of Toeplitz matrices with symbols in Hölder-Zygmund spaces %A Karlovich, Alexei Yu. %E Joseph A. Ball %E Yuli Eidelman %E J. William Helton %E Vadim Olshevsky %E James Rovnyak %C Basel %I Bikhäuser %P 185-196 %U http://link.springer.com/chapter/10.1007/978-3-7643-8539-2_11 %X

We prove a higher order asymptotic formula for traces of finite block Toeplitz matrices with symbols belonging to Hölder-Zygmund spaces. The remainder in this formula goes to zero very rapidly for very smooth symbols. This formula refines previous asymptotic trace formulas by Szegő and Widom and complement higher order asymptotic formulas for determinants of finite block Toeplitz matrices due to Böttcher and Silbermann.