Superslow relaxation in identical phase oscillators with random and frustrated interactions.

This paper is concerned with the relaxation dynamics of a large population of identical phase oscillators, each of which interacts with all the others through random couplings whose parameters obey the same Gaussian distribution with the average equal to zero and are mutually independent. The results obtained by numerical simulation suggest that for the infinite-size system, the absolute value of Kuramoto's order parameter exhibits <italic>superslow relaxation</italic>, i.e., 1/ln <italic>t</italic> as time <italic>t</italic> increases. Moreover, the statistics on both the transient time <italic>T</italic> for the system to reach a fixed point and the absolute value of Kuramoto's order parameter at <italic>t</italic> = <italic>T</italic> are also presented together with their distribution densities over many realizations of the coupling parameters. [ABSTRACT FROM AUTHOR]