The usual procedure is to define a grid
0 = X(1) < X(2) < ... < X(n) = 1
approximate the spatial derivative dA/dX in grid point i by
dA(i)/dx ~ (A(i)-A(i-1))/(X(i)-X(i-1)),
keep the time derivatives in their continuous form,
write the PDE system as a system of 2*n ordinary differential equations
A(1) = A_in
dA(i)/dt = - (A(i)-A(i-1))/(X(i)-X(i-1)) - q0/A_in * s(q(i),A(i)) 2<=i<=n
dq(i)/dt = s(q(i),A(i)) 1<=i<=n
and use ode15s to solve the system.
If you need further details, look up "method-of-lines".
