Accuracy of kinematic wave and diffusion wave approximations for space independent flows

Error equations for the kinematic wave and diffusion wave approximations were derived under simplified conditions for space-independent flows occurring on infiltrating planes or channels. These equations specify error as a function of time in the flow hydrograph. The kinematic wave, diffusion wave a

Error equations for the kinematic wave and diffusion wave approximations with lateral inflow neglected in the momentum equation are derived under simplified conditions for space-independent flows. These equations specify error as a function of time in the flow hydrograph. The kinematic wave, diffusi

Error equations for the kinematic wave and diffusion wave approximations with lateral inflow neglected in the momentum equation are derived under simplified conditions for space-independent flows. These equations specify error as a function of time in the flow hydrograph. The kinematic wave, diffusi

Error equations for the kinematic-wave and diffusion-wave approximations were derived under simplified conditions for space-independent flows occurring on infiltrating planes or channels. These equations specify error as a function of time in the flow hydrograph. The kinematic-wave, diffusion wave a

Errors in the kinematic wave and diusion wave approximation for time-independent (or steady-state) cases of channel ¯ow with in®ltration were derived for three types of boundary conditions: zero ¯ow at the upstream end, and critical ¯ow depth and zero depth gradient at the downstream end. The diusio

Errors in the kinematic wave and diusion wave approximation for time-independent (or steady-state) cases of channel ¯ow with momentum exchange included were derived for three types of boundary conditions: zero ¯ow at the upstream end, and critical ¯ow depth and zero depth gradient at the downstream