dc.contributor.author
Cano Torres, Felipe
dc.contributor.author
Molina-Samper, Beatriz
dc.identifier
https://ddd.uab.cat/record/238034
dc.identifier
urn:10.5565/PUBLMAT6512109
dc.identifier
urn:oai:ddd.uab.cat:238034
dc.identifier
urn:10.5565/publicacionsmatematiques.v65i1.383986
dc.identifier
urn:oai:raco.cat:article/383986
dc.identifier
urn:articleid:20144350v65n1p291
dc.description.abstract
A foliation is of toric type when it has a combinatorial reduction of singularities. We show that every toric type foliation on (C3, 0) without saddle-nodes has invariant surface. We extend the argument of Cano-Cerveau for the nondicritical case to the compact dicritical components of the exceptional divisor. These components are projective toric surfaces and the isolated invariant branches of the induced foliation extend to closed irreducible curves. We build the invariant surface as a germ along the singular locus and those closed irreducible invariant curves. The result of OrtizBobadilla-Rosales-Gonzalez-Voronin about the distribution of invariant branches in dimension two is a key argument in our proof.
dc.format
application/pdf
dc.relation
Ministerio de Economía y Competitividad MTM2016-77642-C2-1-P
dc.relation
Ministerio de Educación, Cultura y Deporte FPU14/02653
dc.relation
Publicacions matemàtiques ; Vol. 65 Núm. 1 (2021), p. 291-307
dc.rights
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dc.rights
https://rightsstatements.org/vocab/InC/1.0/
dc.subject
Singular foliations
dc.subject
Invariant surfaces
dc.subject
Toric varieties
dc.subject
Combinatorial blowing-ups
dc.title
Invariant surfaces for toric type foliations in dimension three
