Abstract:
The aim of this paper was to solve the third order viscous wave equa tion: utt = vuxx + c
2uxxt, which is a PDE. It occurs in many real-life
situations such as water waves, sound waves, radio waves, light waves
and seismic waves. This equation has been solved before using analyti cal methods but not yet been exhaustively nor conclusively done. Two
schemes, namely CD-FD and CN-FD were developed and the equation
discretised by FDM. We used each scheme respectively to obtain so lution algorithms. Stability of the schemes was analysed, consistency
of the numerical solutions with the original equation was tested, and
Mathematica software used to generate solutions. The numerical com putational results obtained for solutions of third order viscous wave
equation obtained for varying the mesh ratio showed that the schemes
were both conditionally stable and consistency noted. We found that
as the mesh ratio reduces, the solution tends towards the exact solu tion. The solution algorithm showed consistency with the original vis cous equation when tested. In addition, the equation simulates many
physical situations which include designing of bridges, acoustics, gas
dynamics, seismology, meteorology among many other natural phenom ena. This work contributes to mathematical knowledge in research and
innovations which apply PDEs.
