In this report, we study decentralized stochastic optimization to minimize a sum of smooth and strongly convex cost functions when the functions are distributed over a directed network of nodes. In contrast to the existing work, we use gradient tracking to improve certain aspects of the resulting algorithm. In particular, we propose the~textbf{texttt{S-ADDOPT}} algorithm that assumes a stochastic first-order oracle at each node and show that for a constant step-size~$alpha$, each node converges linearly inside an error ball around the optimal solution, the size of which is controlled by~$alpha$. For decaying step-sizes~$mathcal{O}(1/k)$, we show that~textbf{texttt{S-ADDOPT}} reaches the exact solution sublinearly at~$mathcal{O}(1/k)$ and its convergence is asymptotically network-independent. Thus the asymptotic behavior of~textbf{texttt{S-ADDOPT}} is comparable to the centralized stochastic gradient descent. Numerical experiments over both strongly convex and non-convex problems illustrate the convergence behavior and the performance comparison of the proposed algorithm.
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