On the maximum principle for a time-fractional diffusion equation

Abstract

In this paper, we discuss the maximum principle for a time-fractional diffusion equation ∂tα u(x,t) = Σi,j=1n ∂i(aij(x)∂j u(x,t)) + c(x)u(x,t) + F(x,t),\ t>0,\ x ∈ ⊂ Rn with the Caputo time-derivative of the order α ∈ (0,1) in the case of the homogeneous Dirichlet boundary condition. Compared to the already published results, our findings have two important special features. First, we derive a maximum principle for a suitably defined weak solution in the fractional Sobolev spaces, not for the strong solution. Second, for the non-negative source functions F = F(x,t) we prove the non-negativity of the weak solution to the problem under consideration without any restrictions on the sign of the coefficient c=c(x) by the derivative of order zero in the spatial differential operator. Moreover, we prove the monotonicity of the solution with respect to the coefficient c=c(x).