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چکیده
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In this paper, we present a theoretical framework of an interior-point method for solving
linear optimization problems over symmetric cones. First, we de�ne a new neighborhood of the central
path and show that the de�ned neighborhood is wider than the neighborhoods that are available. Then,
the convergence of the algorithm is investigated and, using an elegant analysis and Euclidean Jordan
algebra as a tool is shown that the iteration complexity coincides with the best-known one obtained
by any feasible interior-point method that uses the Nesterov-Todd direction. Finally, numerical results
show that the proposed algorithm is efficient and promising.
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