You can treat this as a least-squares problem with 6 parameters: a0, b0, k1, t, l1, and l2. Then make your objective function the total square error ((y1 - f1(x))^2 + (y2 - f2(x))^2). So something like
function err = myerrorfun(c,x1,y1,x2,y2)
f1 = c(1) + [function of c(3) and c(4)]*exp(-c(5)*x1) + ...;
f2 = c(2) + [function of c(3) and c(4)]*exp(-c(5)*x2) + ...;
err = (y1-f1).^2 + (y2-f2).^2;
Then in your main program, call a minimization routine like fmincon:
x1 = ... % enter/load
x2 = ... % all
y1 = ... % the
y2 = ... % data
% make a function handle of one variable (the parameters), with the data embedded
objective = @(c) myerrorfun(c,x1,y1,x2,y2);
% do the fitting
c_fit = fmincon(objective,...);
