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15 results on '"Pełka, Tomasz"'

1. Fibrations by Lagrangian tori for maximal Calabi-Yau degenerations and beyond

Author

de Bobadilla, Javier Fernández and Pełka, Tomasz

Subjects
Mathematics - Algebraic Geometry, Mathematics - Symplectic Geometry, 14D06 (Primary) 14J32, 32Q25, 53C23, 53D12 (Secondary)
Abstract

We introduce a general technique to construct Lagrangian torus fibrations in degenerations of K\"ahler manifolds. We show that such torus fibrations naturally occur at the boundary of the A'Campo space. This space extends a degeneration over a punctured disc to a hybrid space involving its real oriented blowup and the dual complex of the special fiber; equipped with an exact modification of a given K\"ahler form which becomes fiberwise symplectic at the boundary. Therefore, it allows to move Lagrangian tori from the "radius zero" fibers at the boundary to the nearby fibers of the original generation using the symplectic connection. As a consequence, for any maximal Calabi-Yau degeneration we prove that a generic region of each nearby fiber admits a Lagrangian torus fibration with asymptotic properties expected from the (conjectural) Strominger--Yau--Zaslow fibration., Comment: 35 pages, 4 figures; slightly improved exposition

Published
2023

3. On the embedded Nash problem

Author

Budur, Nero, de la Bodega, Javier, Poza, Eduardo de Lorenzo, de Bobadilla, Javier Fernández, and Pełka, Tomasz

Subjects
Mathematics - Algebraic Geometry
Abstract

The embedded Nash problem for a hypersurface in a smooth algebraic variety, is to characterize geometrically the maximal irreducible families of arcs with fixed order of contact along the hypersurface. We show that divisors on minimal models of the pair contribute with such families. We solve the problem for unibranch plane curve germs, in terms of the resolution graph. These are embedded analogs of known results for the classical Nash problem on singular varieties., Comment: v2: The main change is in the proof of Thm 7.4. To appear in Forum Math. Pi

Published
2022

4. Symplectic monodromy at radius zero and equimultiplicity of $\mu$-constant families

Author

de Bobadilla, Javier Fernández and Pełka, Tomasz

Subjects
Mathematics - Algebraic Geometry, Mathematics - Symplectic Geometry, 14B05, 14J17, 32S25, 32S30, 32S55, 53D40
Abstract

We show that every family of isolated hypersurface singularity with constant Milnor number has constant multiplicity. To achieve this, we endow the A'Campo model of "radius zero" monodromy with a symplectic structure. This new approach allows to generalize a spectral sequence of McLean converging to fixed point Floer homology of iterates of the monodromy to a more general setting which is well suited to study $\mu$-constant families., Comment: 87 pages, 7 figures, to appear in Annals of Mathematics

Published
2022
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5. Smooth $\mathbb{Q}$-homology planes satisfying the Negativity Conjecture

Author

Pełka, Tomasz

Subjects
Mathematics - Algebraic Geometry, 14R05 (Primary) 14J26, 14J50 (Secondary)
Abstract

A complex algebraic surface $S$ is a $\mathbb{Q}$-homology plane if $H_{i}(S,\mathbb{Q})=0$ for $i>0$. The Negativity Conjecture of Palka asserts that $\kappa(K_{X}+\tfrac{1}{2}D)=-\infty$, where $(X,D)$ is a log smooth completion of $S$. We give a complete description of smooth $\mathbb{Q}$-homology planes satisfying the Negativity Conjecture. We restrict our attention to those of log general type, as otherwise their geometry is well understood. We show that, as conjectured by tom Dieck and Petrie, they can be arranged in finitely many discrete series, each obtained in a uniform way from an arrangement of lines and conics on $\mathbb{P}^{2}$. We infer that these surfaces satisfy the Rigidity Conjecture of Flenner and Zaidenberg; and a conjecture of Koras, which asserts that $\#\operatorname{Aut}(S)\leq 6$., Comment: 53 pages, 44 figures, to appear in J. London Math. Soc

Published
2021
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6. Linearization of holomorphic families of algebraic automorphisms of the affine plane

Author

Kuroda, Shigeru, Kutzschebauch, Frank, and Pełka, Tomasz

Subjects
Mathematics - Algebraic Geometry, Mathematics - Complex Variables, 14R20, 32M05 (Primary) 14R10, 32M17, 32Q56 (Secondary)
Abstract

Let $G$ be a reductive group. We prove that a family of polynomial actions of $G$ on $\mathbb{C}^2$, holomorphically parametrized by an open Riemann surface, is linearizable. As an application, we show that a particular class of reductive group actions on $\mathbb{C}^3$ is linearizable. The main step of our proof is to establish a certain restrictive Oka property for groups of equivariant algebraic automorphisms of $\mathbb{C}^2$., Comment: 14 pages, to appear in Transformation Groups

Published
2020
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7. Classification of smooth factorial affine surfaces of Kodaira dimension zero with trivial units

Author

Pełka, Tomasz and Raźny, Paweł

Subjects
Mathematics - Algebraic Geometry, 14R05 (Primary) 14J26, 57R65, 57M99 (Secondary)
Abstract

We give a corrected statement of the theorem of Gurjar and Miyanishi, which classifies smooth affine surfaces of Kodaira dimension zero, whose coordinate ring is factorial and has trivial units. Denote the class of such surfaces by $\mathcal{S}_{0}$. An infinite series of surfaces in $\mathcal{S}_{0}$, not listed by Gurjar and Miyanishi, was recently obtained by Freudenburg, Kojima and Nagamine as affine modifications of the plane. We complete their list to a series containing arbitrarily high-dimensional families of pairwise non-isomorphic surfaces in $\mathcal{S}_{0}$. Moreover, we classify them up to a diffeomorphism, showing that each occurs as an interior of a 4-manifold whose boundary is an exceptional surgery on a 2-bridge knot. In particular, we show that $\mathcal{S}_{0}$ contains countably many pairwise non-homeomorphic surfaces., Comment: 21 pages, 16 figures

Published
2020
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8. Classification of planar rational cuspidal curves. II. Log del Pezzo models

Author

Palka, Karol and Pełka, Tomasz

Subjects
Mathematics - Algebraic Geometry, Mathematics - Complex Variables, 14H50, 14J17, 14R25
Abstract

Let $E\subseteq \mathbb{P}^2$ be a complex curve homeomorphic to the projective line. The Negativity Conjecture asserts that the Kodaira-Iitaka dimension of $K_X+\frac{1}{2}D$, where $(X,D)\to (\mathbb{P}^{2},E)$ is a minimal log resolution, is negative. We prove structure theorems for curves satisfying this conjecture and we finish their classification up to a projective equivalence by describing the ones whose complement admits no $\mathbb{C}^{**}$-fibration. As a consequence, we show that they satisfy the Strong Rigidity Conjecture of Flenner-Zaidenberg. The proofs are based on the almost minimal model program. The obtained list contains one new series of bicuspidal curves., Comment: 50 pages

Published
2018
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9. On the embedded Nash problem.

Author

Budur, Nero, de la Bodega, Javier, de Lorenzo Poza, Eduardo, Fernández de Bobadilla, Javier, and Pełka, Tomasz

Subjects
ALGEBRAIC varieties, PROBLEM solving, FAMILIES, MICROORGANISMS
Abstract

The embedded Nash problem for a hypersurface in a smooth algebraic variety is to characterize geometrically the maximal irreducible families of arcs with fixed order of contact along the hypersurface. We show that divisors on minimal models of the pair contribute with such families. We solve the problem for unibranch plane curve germs, in terms of the resolution graph. These are embedded analogs of known results for the classical Nash problem on singular varieties. [ABSTRACT FROM AUTHOR]

Published
2024
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10. Classification of planar rational cuspidal curves. I. C**-fibrations

Author

Palka, Karol and Pełka, Tomasz

Subjects
Mathematics - Algebraic Geometry, 14H50, 14J17, 14R25
Abstract

To classify complex rational cuspidal curves $E\subseteq \mathbb{P}^2$ it remains to classify the ones with complement of log general type, i.e. the ones for which $\kappa(K_X+D)=2$, where $(X,D)$ is a log resolution of $(\mathbb{P}^2,E)$. It is conjectured that $\kappa(K_X+\frac{1}{2}D)=-\infty$ and hence $\mathbb{P}^2\setminus E$ is $\mathbb{C}^{**}$-fibered, where $\mathbb{C}^{**}=\mathbb{C}^1\setminus\{0,1\}$, or $-(K_X+\frac{1}{2}D)$ is ample on some minimal model of $(X,\frac{1}{2}D)$. Here we classify, up to a projective equivalence, those rational cuspidal curves for which the complement is $\mathbb{C}^{**}$-fibered. From the rich list of known examples only very few are not of this type. We also discover a new infinite family of bicuspidal curves with unusual properties., Comment: 50 pages

Published
2016
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