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The Lagrangian Whitney Trick and The Area Condition;@l200708\ՑYPxhttps://repository.hanyang.ac.kr/handle/20.500.11754/148950;
http://hanyang.dcollection.net/common/orgView/200000407189;Let $ be an open disk in R and consider the open subset $R>(n1)R>(n1) of R>(2n) with the standard symplectic structure. Also let l_(0), l be two open arcs in $ which are closed as subsets of $ meeting each other transversely at exactly two points.
We construct a Hamiltonian flow with compact support, _(u) : $2>(n1)2>(n1)!$2>(n1)2>(n1), 0 d" u d" 1 such that _(0) = 1 and . (l_(0)2>(n1)0))"(l 02>(n1)) = .
Construction of such _(u), 0 d" u d" 1, deserves called a Lagrangian Whitney trick. We will show that the condition is needed involving the areas of the regions $ in divided by l_(0) and l for the construction.&HQsj&)KLng9 B)K,N=_Jl=_

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