Algebraic formulation for modeling hop-by-hop multi-constrained routing algorithms. / Formulação algébrica para a modelagem de algoritmos de roteamento multi-restritivo hop-by-hop.

AUTOR(ES)
DATA DE PUBLICAÇÃO

2008

RESUMO

This work presents a new mathematical structure for paths algebra that allows the convergence analysis of hop-by-hop multi-constrained routing algorithms and, under the traffic engineering and quality of service perspectives in the Generalized Multiprotocol Label Switching (GMPLS) architecture, trustily ensures the aggregation of new routing metrics in a constrained-based routing. Based on this new paths algebra, we analyze the monotonicity, isotonicity and freeness properties, known as ensuring routing algorithms convergence, and despite of what has been indicated in the literature, we verified that the monotonicity property is not sufficient to ensure the hop-by-hop routing convergence. Therefore, this work proposes a new property, called coherence, as a necessary and sufficient condition to ensure it, as well as, a new multi-constrained hop-by-hop routing algorithm with ensured convergence. In order to evaluate the theoretical results obtained, two study cases of the hop-by-hop multi-constrained routing applications are analyzed in the present thesis by using the Eliminação de Loop pelo Nó de Destino (ELND) simulation tool, developed in MATLAB and also presented as a product of this work. As result of these study cases simulations, we verified that different optimization strategies, requested by the (GMPLS) networks, compel the use of routing algorithms that allow the specification of more than two routing metrics with different optimization criteria for each one of them, thus proving the necessity of this work and its continuation.

ASSUNTO(S)

roteamento com múltiplas restrições multi-constrained routing teoria dos grafos Álgebra algorithms theory of graphs algebra algoritmos

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