We establish the $L^1$ well-posedness theory for a system of nonlinear hyperbolic conservation laws with relaxation arising in traffic flows. In particular, we obtain the continuous dependence of the solution on its initial data in $L^1$ topology. We construct a functional for two solutions which is equivalent to the $L^1$ distance between the solutions. We prove that the functional decreases in time which yields the $L^1$ well-posedness of the Cauchy problem. We thus obtain the $L^1$-convergence to and the uniqueness of the zero relaxation limit. We then study the large-time behavior of the entropy solutions. We show that the equilibrium shock waves are nonlinearly stable in $L^1$ norm. That is, the entropy solution with initial data as certain $L^1$-bounded perturbations of an equilibrium shock wave exists globally and tends to a shifted equilibrium shock wave in $L^1$ norm as $t\to \infty$. We also show that if the initial data $\rho_0$ is bounded and of compact support, the entropy solution converges in $L^1$ to an equilibrium $N$-wave as $t\to \infty$.