G. J. Rodgers, Dafang Zheng
Published 2001-10-09, updated 2001-11-23Version 2
We introduce and solve a model that mimics the herding effect in financial markets when groups of agents share information. The number of agents in the model is growing and at each time step either (i) with probability $p$ an incoming agent joins an existing group, or (ii) with probability $1-p$ a group is fragmented into individual agents. The group size distribution is found to be power-law with an exponent that depends continuously on $p$. A number of variants of our basic model are discussed. Comparisons are made between these models and other models of herding and random growing networks.
Comments: 8 pages, Latex, Corrected typos, to be published in Physica A
Asset-asset interactions and clustering in financial markets
Non-universal scaling and dynamical feedback in generalized models of financial markets
Fragmentation of shells
