Period Doubling in Four-Dimensional Volume-Preserving Maps
Abstract
We numerically study the scaling behavior of period doublings at the zero-coupling critical point in a four-dimensional volume-preserving map consisting of two coupled area-preserving maps. In order to see the fine structure of period doublings, we extend the simple one-term scaling law to a two-term scaling law. Thus we find a new scaling factor δ3 (=1.8505…) associated with scaling of the coupling parameter, in addition to the previously known scaling factors δ1 (=-8.7210…) and δ2 (=-4.4038…). These numerical results confirm the renormalization results reported by Mao and Greene [Phys. Rev. A 35, 3911 (1987)].
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