Wide-sense nonblocking WDM cross-connects

Abstract

We consider the problem of minimizing the number of wavelength interchangers in the design of wide-sense nonblocking cross-connects for wavelength division multiplexed (WDM) optical networks. The problem is modeled as a graph theoretic problem that we call dynamic edge coloring. In dynamic edge coloring the nodes of a graph are fixed but edges appear and disappear, and must be colored at the time of appearance without assigning the same color to adjacent edges. For wide-sense nonblocking WDMcross-connects with k input and k output fibers, it is straightforward to show that 2k — 1 wavelength interchangers are always sufficient. We show that there is a constant c> 0 such that if there are at least ck2 wavelengths then 2k—1 wavelength inter-changers are also necessary. This improves previous exponential bounds. When there are only 2 or 3 wavelengths available, we show that far fewer than 2k— 1 wavelength interchangers are needed. However we also prove that for any ε > 0and k> 1/2ε, if the number of wavelengths is at least 1/ε2 then 2(1 — ε)k wavelength interchangers are needed.