Paper detail

On the Skewed Fractional Diffusion Advection Reaction Equation on the Interval

This article provides techniques of raising the regularity of fractional order equations and resolves fundamental questions on the one-dimensional homogeneous boundary-value problem of skewed (double-sided) fractional diffusion advection reaction equation (FDARE) with variable coefficients on the bounded interval. The existence of the true (classical) solution together with norm estimation is established and the precise regularity bound is found; also, the structure of the solution is unraveled, capturing the essence of regularity, singularity, and other features of the solution. The key analysis lies in exploring the properties of Gauss hypergeometric functions, solving coupled Abel integral equations and dominant singular integral equations, and connecting the functions from fractional Sobolev spaces to the ones from H$\ddot{\text{o}}$lderian spaces that admit integrable singularities at the endpoints.