%0 Journal Article %1 WOS:000242316000067 %A Ferraz, Carlos Handrey A %A Herrmann, Hans J %C PO BOX 211, 1000 AE AMSTERDAM, NETHERLANDS %D 2007 %I ELSEVIER SCIENCE BV %J PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS %K automata; dimension} fractal small-world topology; {Kauffman's %P 770-776 %R 10.1016/j.physa.2006.04.063 %T The Kauffman model on small-world topology %V 373 %X We apply Kauffman's automata on small-world networks to study the crossover between the short-range and the infinite-range case. We perform accurate calculations on square lattices to obtain both critical exponents and fractal dimensions. Particularly, we find an increase of the damage propagation and a decrease in the fractal dimensions when adding long-range connections. (c) 2006 Elsevier B.V. All rights reserved.

@article{WOS:000242316000067, abstract = {We apply Kauffman's automata on small-world networks to study the crossover between the short-range and the infinite-range case. We perform accurate calculations on square lattices to obtain both critical exponents and fractal dimensions. Particularly, we find an increase of the damage propagation and a decrease in the fractal dimensions when adding long-range connections. (c) 2006 Elsevier B.V. All rights reserved.}, added-at = {2022-05-23T20:00:14.000+0200}, address = {PO BOX 211, 1000 AE AMSTERDAM, NETHERLANDS}, author = {Ferraz, Carlos Handrey A and Herrmann, Hans J}, biburl = {https://www.bibsonomy.org/bibtex/2d0290f9be3077d4bf32d626fda9961ed/ppgfis_ufc_br}, doi = {10.1016/j.physa.2006.04.063}, interhash = {d43aeafc630af43fa6f27ad1293e218d}, intrahash = {d0290f9be3077d4bf32d626fda9961ed}, issn = {0378-4371}, journal = {PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS}, keywords = {automata; dimension} fractal small-world topology; {Kauffman's}, pages = {770-776}, publisher = {ELSEVIER SCIENCE BV}, pubstate = {published}, timestamp = {2022-05-23T20:00:14.000+0200}, title = {The Kauffman model on small-world topology}, tppubtype = {article}, volume = 373, year = 2007 }