Toward Resolution of Singularities over a Field of Positive Characteristic (The Idealistic Filtration Program)&lt;br&gt;Part II. Basic invariants associated to the idealistic ﬁltration and their properties

Kawanoue, Hiraku; Matsuki, Kenji

doi:10.2977/prims/12

Cited by 25 publications

(30 citation statements)

References 7 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…The nonsingularity of C is guaranteed by the Nonsingularity Principle (cf. [18] [19]), while the transversality of C to the boundary E is guaranteed by the invariant s = 0. After the blow up, the singular locus becomes empty, and resolution of singularities for (W, R, E) is achieved.…”

Section: Contentsmentioning

confidence: 99%

Resolution of singularities of an idealistic filtration in dimension 3 after Benito-Villamayor

Kawanoue¹,

Matsuki²

Advanced Studies in Pure Mathematics

Self Cite

View full text Add to dashboard Cite

We establish an algorithm for resolution of singularities of an idealistic filtration in dimension 3 (a local version) in positive characteristic, incorporating the method recently developed by Benito-Villamayor into our framework. Although (a global version of) our algorithm only implies embedded resolution of surfaces in a smooth ambient space of dimension 3, a classical result known before, we introduce some new invariant which effectively measures how much the singularities are improved in the process of our algorithm and which strictly decreases after each blow up. This is in contrast to the wellknown Abhyankar-Moh pathology of the increase of the residual order under blow up and the phenomenon of the "Kangaroo" points observed by Hauser.2010 Mathematics Subject Classification. 14E15.

show abstract

Section: Contentsmentioning

confidence: 99%

Resolution of singularities of an idealistic filtration in dimension 3 after Benito-Villamayor

Kawanoue¹,

Matsuki²

Advanced Studies in Pure Mathematics

Self Cite

View full text Add to dashboard Cite

show abstract

“…In such case, K (n−e) is, necessarily, an elimination algebra of G (n) (this follows from the definition of elimination algebra, and Theorem 5. 19).…”

Section: Elimination Algebrasmentioning

confidence: 99%

Finite morphisms and simultaneous reduction of the multiplicity

Abad

Bravo

2019

Mathematische Nachrichten

View full text Add to dashboard Cite

Let X be a singular algebraic variety defined over a field k, with quotient field K(X). Let s ≥ 2 be the highest multiplicity of X and Fs(X) the set of points of multiplicity s. If Y ⊂ Fs(X) is a regular center and X ← X1 is the blow up at Y , then the highest multiplicity of X1 is less than or equal to s. A sequence of blow ups at regular centers Yi ⊂ Fs(Xi), say X ← X1 ← · · · ← Xn, is said to be a simplification of the multiplicity if the maximum multiplicity of Xn is strictly lower than that of X, that is, if Fs(Xn) is empty. In characteristic zero there is an algorithm which assigns to each X a unique simplification of the multiplicity. However, the problem remains open when the characteristic is positive.In this paper we will study finite dominant morphisms between singular varieties β : X ′ → X of generic rank r ≥ 1 (i.e., [K(X ′ ) : K(X)] = r). We will see that, when imposing suitable conditions on β, there is a strong link between the strata of maximum multiplicity of X and X ′ , say Fs(X) and Frs(X ′ ) respectively. In such case, we will say that the morphism is strongly transversal. When β : X ′ → X is strongly transversal one can obtain information about the simplification of the multiplicity of X from that of X ′ and vice versa. Finally, we will see that given a singular variety X and a finite field extension L of K(X) of rank r ≥ 1, one can construct (at least locally, inétale topology) a strongly transversal morphism β : X ′ → X, where X ′ has quotient field L.2010 Mathematics Subject Classification. 14E15.

show abstract

“…The problem of resolution of singularities of a basic object is further reformulated into the problem of resolution of singularities of an idealistic filtration according to the I.F.P. (See [19] [20] [21] [22] for the detail. ): Given an triplet (W, R, E), where the pair (I, a) in a basic object (W, (I, a), E) in the classical setting is replaced by an idealistic filtration R, construct a sequence of transformations…”

Section: Solution In Characteristic Zeromentioning

confidence: 99%

A new strategy for resolution of singularities in the monomial case in positive characteristic

Kawanoue

Matsuki

2018

Rev. Mat. Iberoam.

Self Cite

View full text Add to dashboard Cite

According to our approach for resolution of singularities in positive characteristic (called the Idealistic Filtration Program, alias the I.F.P. for short) the algorithm is divided into the following two steps:Step 1. Reduction of the general case to the monomial case.Step 2. Solution in the monomial case. While we have established Step 1 in arbitrary dimension, Step 2 becomes very subtle and difficult in positive characteristic. This is in clear contrast to the classical setting in characteristic zero, where the solution in the monomial case is quite easy. In dimension 3, we provided an invariant, inspired by the work of Benito-Villamayor, which establishes Step 2. In this paper, we propose a new strategy to approach Step 2, and provide a different invariant in dimension 3 based upon this strategy. The new invariant increases from time to time (the well-known Moh-Hauser jumping phenomenon), while it is then shown to eventually decrease. Since the old invariant strictly decreases after each transformation, this may look like a step backward rather than forward. However, the construction of the new invariant is more faithful to the original philosophy of Villamayor, and we believe that the new strategy has a better fighting chance in higher dimensions.

show abstract

Toward Resolution of Singularities over a Field of Positive Characteristic (The Idealistic Filtration Program)<br>Part II. Basic invariants associated to the idealistic ﬁltration and their properties

Cited by 25 publications

References 7 publications

Resolution of singularities of an idealistic filtration in dimension 3 after Benito-Villamayor

Resolution of singularities of an idealistic filtration in dimension 3 after Benito-Villamayor

Finite morphisms and simultaneous reduction of the multiplicity

A new strategy for resolution of singularities in the monomial case in positive characteristic

Contact Info

Product

Resources

About