New global a priori estimates for the third-grade fluid equations

## Abstract In our recent papers, we suggested a new two‐stage time‐integration procedure for linear elastodynamics problems and showed that for long‐term integration, time‐integration methods with zero numerical dissipation are very effective for all linear elastodynamics problems, including struc

## Abstract A new objective function for estimating parameters in differential equations, based upon a weighted least squares criterion for the residuals of these equations, is presented. The use of Lobatto quadrature in combination with the collocation technique reduces the original problem to one

A new computational algorithm for the estimation of parameters in ordinary differential equations from noisy data is presented. The algorithm is computationally faster than quasilinearization because of the reduction of the number of ordinary differential equations that must be solved a t each itera