A collocation method to compute one-dimensional flow models in intake and exhaust systems of internal combustion engines

In this paper, a new iterative method to find analytical approximate solution with a priori error bounds of Euler equations is constructed. This method is an improvement of the one presented in [l] and lets using the temporal domain get a bigger Chebyshev polynomial to approach the initial value in

In this paper, a polynomial approximate solution with a priori error bounds of Euler equations is constructed by means of the Cauchy-Kovalevskaya method. Then, this solution has been compared with that obtained with a numerical method based on the MacCormack algorithm to find a better error bound.

A computer code called TurboKIVA was used to perform three-dimensional computations to investigate the effects of fuel spray formation on the combustion and emission characteristics of direct and indirect injection diesel engines. As the first step, the code was modified to facilitate quantitative p