Foliaciones de codimensión uno Newton no degeneradas

Abstract: Bibliografía Lista de figuras viii a j dx j x j + j∈B a j dx j , a j ∈ O M,p , 2 Theorem 2.2 Given a polyhedra system D, there is a finite sequence of characteristic transforms

“…Roughly speaking, simple points are "presimple ones without resonances". There is a context in which presimple points coincide with logarithmically non-singular points: the case of complex hyperbolic foliations (see [9]). We recall that a foliation F on M is complex hyperbolic (see [5]) if there is no holomorphic map φ : (C 2 , 0) → M such that 0 is a saddle-node for φ −1 F .…”

“…We also get a G ρ -graded module A ρ with fibers A ρ p . (Details of these constructions can be found in [9]).…”

Newton Non-degenerate Foliations and Blowing-ups

“…Roughly speaking, simple points are "presimple ones without resonances". There is a context in which presimple points coincide with logarithmically non-singular points: the case of complex hyperbolic foliations (see [9]). We recall that a foliation F on M is complex hyperbolic (see [5]) if there is no holomorphic map φ : (C 2 , 0) → M such that 0 is a saddle-node for φ −1 F .…”

“…We also get a G ρ -graded module A ρ with fibers A ρ p . (Details of these constructions can be found in [9]).…”

Newton Non-degenerate Foliations and Blowing-ups

Newton non-degenerate foliations and blowing-ups