Partial regularity of weak solutions and life-span of smooth solutions to a biological network formulation model

Abstract

In this paper we first study partial regularity of weak solutions to the initial boundary value problem for the system -div[(I+m m)∇ p]=S(x),\ \ ∂tm-D2 m-E2(m·∇ p)∇ p+|m|2(γ-1)m=0, where S(x) is a given function and D, E, γ are given numbers. This problem has been proposed as a PDE model for biological transportation networks. Mathematically, it seems to have a connection to a conjecture by De Giorgi DE. Then we investigate the life-span of classical solutions. Our results show that local existence of a classical solution can always be obtained and the life-span of such a solution can be extended as far away as one wishes as long as the term \| m(x,0)\|∞, +\|S(x)\|2N3, is made suitably small, where N is the space dimension and \|·\|q, denotes the norm in Lq().