On two invariants of divisorial valuations at infinity

Borisov, Alexander

doi:10.1007/s10801-013-0462-9

Cited by 3 publications

(26 citation statements)

References 10 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…In particular, on Y allK labels are non-positive, and all determinant labels are positive (cf. [4] for the definitions). This is how all our frameworks were constructed, by hand.…”

Section: Wherer =mentioning

confidence: 99%

“…Note that the self-intersection numbers change under blowups and contractions, so they are not the invariants of the divisorial valuations defined by the curves at infinity. To get around that, two other labels for these curves were introduced in [3] and [4]: theK label and the determinant label. These labels are invariant under polynomial automorphisms of A 2 .…”

Section: Preliminaries Notation and First Frameworkmentioning

confidence: 99%

“…Modulo that, the valuations with given labels form finitely many families (cf. [4]). We will not use the determinant labels until section 6, and will define and discuss them there.…”

Section: Preliminaries Notation and First Frameworkmentioning

confidence: 99%

“…Note that this map is polynomial, and the polynomials have the correct degrees. It has a rather simple Jacobian, a constant multiple of x 4 1 x 12 2 . It is generically 16:1.…”

Section: Fig 19mentioning

confidence: 99%

“…So I will first describe where they came from, and then briefly discuss some open questions that may help us resolve the Jacobian Conjecture in dimension 2. Some of the proofs in this section are only sketched, and certain degree of familiarity with the papers [3] and [4] is highly recommended.…”

Section: Explanations and Commentsmentioning

confidence: 99%

See 4 more Smart Citations

Frameworks for Two-Dimensional Keller Maps

Borisov

2020

Electron. J. Combin.

Self Cite

View full text Add to dashboard Cite

The classical Jacobian Conjecture asserts that every locally invertible polynomial self-map of the complex affine space is globally invertible. A Keller map is a (hypothetical) counterexample to the Jacobian Conjecture. In dimension two every such map, if exists, leads to a map between the Picard groups of suitable compactifications of the affine plane, that satisfy a complicated set of conditions. This is essentially a combinatorial problem. Several solutions to it ("frameworks") are described in detail. Each framework corresponds to a large system of equations, whose solution would lead to a Keller map.

show abstract

“…In particular, on Y allK labels are non-positive, and all determinant labels are positive (cf. [4] for the definitions). This is how all our frameworks were constructed, by hand.…”

Section: Wherer =mentioning

confidence: 99%

Section: Preliminaries Notation and First Frameworkmentioning

confidence: 99%

“…Modulo that, the valuations with given labels form finitely many families (cf. [4]). We will not use the determinant labels until section 6, and will define and discuss them there.…”

Section: Preliminaries Notation and First Frameworkmentioning

confidence: 99%

“…Note that this map is polynomial, and the polynomials have the correct degrees. It has a rather simple Jacobian, a constant multiple of x 4 1 x 12 2 . It is generically 16:1.…”

Section: Fig 19mentioning

confidence: 99%

Section: Explanations and Commentsmentioning

confidence: 99%

See 3 more Smart Citations

Frameworks for Two-Dimensional Keller Maps

Borisov

2020

Electron. J. Combin.

Self Cite

View full text Add to dashboard Cite

show abstract

Algebraicity of normal analytic compactifications of ℂ2 with one irreducible curve at infinity

Mondal

2016

Algebra Number Theory

View full text Add to dashboard Cite

Abstract. We present an effective criterion to determine if a normal analytic compactification of C 2 with one irreducible curve at infinity is algebraic or not. As a by product we establish a correspondence between normal algebraic compactifications of C 2 with one irreducible curve at infinity and algebraic curves contained in C 2 with one place at infinity. Using our criterion we construct pairs of homeomorphic normal analytic surfaces with minimally elliptic singularities such that one of the surfaces is algebraic and the other is not. Our main technical tool is the sequence of key forms -a 'global' variant of the sequence of key polynomials introduced by MacLane [Mac36] to study valuations in the 'local' setting -which also extends the notion of approximate roots of polynomials considered by Abhyankar-Moh [AM73].

show abstract

Frameworks for two-dimensional Keller maps

Борисов¹

2019

Preprint

Self Cite

View full text Add to dashboard Cite

A Keller map is a counterexample to the Jacobian Conjecture. In dimension two every such map, if exists, leads to a complicated set of conditions on the map between the Picard groups of suitable compactifications of the affine plane. This is essentially a combinatorial problem. Several solutions to it ("frameworks") are described in detail. Each framework corresponds to a large system of equations, whose solution would lead to a Keller map.

show abstract

On two invariants of divisorial valuations at infinity

Cited by 3 publications

References 10 publications

Frameworks for Two-Dimensional Keller Maps

Frameworks for Two-Dimensional Keller Maps

Algebraicity of normal analytic compactifications of ℂ2 with one irreducible curve at infinity

Frameworks for two-dimensional Keller maps

Contact Info

Product

Resources

About