Monodromy and Dulac's Problem for Piecewise analytical planar vector fields

Abstract

Consider an analytical function f:V⊂ R2→ R having 0 as its regular value, a switching manifold =f-1(0) and a piecewise analytical vector field X=(X+,X-), i.e. X are analytical vector fields defined on =\p∈ V: f(p)>0\. We characterize when the vector field X has a monodromic singular point in , called -monodromic singular point. Moreover, under certain conditions, we show that a -monodromic singular point of X has a neighborhood free of limit cycles.

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