Initial-boundary value problems to semilinear multi-term fractional differential equations

Abstract

For ,i,μj∈(0,1), we analyze the semilinear integro-differential equation on the one-dimensional domain =(a,b) in the unknown u=u(x,t) \[ Dt(0u)+Σi=1MDti(iu) -Σj=1NDtμj(γju) -L1u-K*L2u+f(u)=g(x,t), \] where Dt,Dti, Dtμj are Caputo fractional derivatives, 0=0(t)>0, i=i(t), γj=γj(t), Lk are uniform elliptic operators with time-dependent smooth coefficients, K is a summable convolution kernel. Particular cases of this equation are the recently proposed advanced models of oxygen transport through capillaries. Under certain structural conditions on the nonlinearity f and orders ,i,μj, the global existence and uniqueness of classical and strong solutions to the related initial-boundary value problems are established via the so-called continuation arguments method. The crucial point is searching suitable a priori estimates of the solution in the fractional H\"older and Sobolev spaces. The problems are also studied from the numerical point of view.