On mutual arrangements of a plane real curve relative to an M-quartic with an oval-snake
Abstract
An oval O of a plane real algebraic quartic curve S is called a snake coiling around a real curve Ck of degree k if Ok is isotopic to O'k, where O' is the boundary of a thickening of the embedded segment that transversally intersects RCk at 2k points. In this article we prove that in this case RCk is isotopic to RCk, where Q is a perturbation of the doubled conic. We prove analogs of this statement for real pseudoholomorphic curves under some additional assumptions.
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