Breakup of Shearless Meanders and "Outer" Tori in the Standard Nontwist Map
Abstract
The breakup of shearless invariant tori with winding number ω=[0,1,11,1,1,...] (in continued fraction representation) of the standard nontwist map is studied numerically using Greene's residue criterion. Tori of this winding number can assume the shape of meanders (folded-over invariant tori which are not graphs over the x-axis in (x,y) phase space), whose breakup is the first point of focus here. Secondly, multiple shearless orbits of this winding number can exist, leading to a new type of breakup scenario. Results are discussed within the framework of the renormalization group for area-preserving maps. Regularity of the critical tori is also investigated.
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