On minimizing the number of ADMs in a general topology optical network

摘要

Minimizing the number of electronic switches in optical networks has been a main research topic in some recent studies. In such networks, we assign colors to a given set of lightpaths. and they are partitioned into unicolor cycles and paths; the switching cost is minimized when the number of paths is minimized. Most approximation and heuristic algorithms for this problem have a preprocessing stage, in which possible cycles are found. Among them, the basic algorithm eliminates cycles of size at most l, and has a performance guarantee of OPT + 1/2 (1+epsilon)N, where OPT is the cost of an optimal solution, N is the number of light paths and 0 <= epsilon <= 1/l+2, for any odd l. The time complexity of the algorithm is exponential in l. We improve the analysis of this algorithm, by showing that epsilon <= 1/3/2(l+2), which implies a reduction of the exponent in the time complexity. We also improve the lower bound by showing that epsilon >= 1/2l+3. The results shed more light on the structure of this basic algorithm. In addition, in our analysis we suggest a novel technique - including a new combinatorial lemma - to deal with this problem.