TY - JOUR N2 - Abstract The adaptive boundary stabilization is investigated for a class of systems described by second-order hyperbolic PDEs with unknown coefficient. The proposed control scheme only utilizes measurement on top boundary and assume anti-damping dynamics on the opposite boundary which is the main feature of our work. To cope with the lack of full state measurements, we introduce Riemann variables which allow us reformulate the second-order in time hyperbolic PDE as a system with linear input-delay dynamics. Then, the infinite-dimensional time-delay tools are employed to design the controller. Simulation results which applied on mathematical model of drilling system are given to demonstrate the effectiveness of the proposed control approach. L1 - http://journals.pan.pl/Content/104463/PDF/acsc-2017-0004.pdf L2 - http://journals.pan.pl/Content/104463 PY - 2017 IS - No 1 DO - 10.1515/acsc-2017-0004 A1 - Hamed Shirinabadi Farahani A1 - Heidar Ali Talebi A1 - Mohammad Baghermenhaj PB - Committee of Automatic Control and Robotics PAS DA - 2017 T1 - An adaptive control scheme for hyperbolic partial differential equation system (drilling system) with unknown coefficient UR - http://journals.pan.pl/dlibra/publication/edition/104463 T2 - Archives of Control Sciences ER -