A hybrid asymptotic and augmented compact finite volume method for nonlinear singular two point boundary value problems

Highlights：

• A hybrid asymptotic and augmented high order compact finite volume method is designed for nonlinear singular two point boundary value problems.

• The convergence of the proposed scheme in the whole interval is analyzed and proved.

• By reconstructing the Puiseux series of the solution, it is shown that the high order of convergence of the solution near the singularity is obtained with respect to 2 L norms, 1H semi-norm and L norm.

• An parameter that is related to the singularity of the solution is regarded as an augmented variable. By using this augmented variable, we construct a numerical scheme and simultaneously obtain the values of the augmented variable and the solution.