The boundary-volume integral equation numerical technique can be a powerful tool for piecewise heterogeneous media,but it is limited to small problems or low frequencies because of great computational cost. Therefore,a restarted GMRES method is applied to solve large-scale boundary-volume scattering problems in this paper to overcome the computational barrier.The iterative method is firstly applied to responses of dimen-sionless frequency to a semicircular alluvial valley filled with sediments,compared with the standard Gaussian elimination method.Then the method is tested by a heterogeneous multilayered model to show its applicability. Numerical experiments indicate that the preconditioned GMRES method can significantly improve computational efficiency especially for large Earth models and high frequencies,but with a faster convergence for the left diagonal preconditioning. The boundary-volume integral equation numerical technique can be a powerful tool for piecewise heterogeneous media, but it is limited to small problems or low frequencies because of great computational cost. Therefore, a restarted GMRES method is applied to solve large-scale boundary-volume scattering problems in this paper to overcome the computational barrier. The iterative method is first applied to respond of dimen-sionless frequency to a semicircular alluvial valley filled with sediments, compared with the standard Gaussian elimination method. The method is tested by a heterogeneous multilayered model to show its applicability. Numerical experiments indicate that the preconditioned GMRES method can significantly improve computational efficiency especially for large Earth models and high frequencies, but with a faster convergence for the left diagonal preconditioning.