Semestr Zimowy 2019/2020
Seminarium odbywa się we wtorki w sali 118 w godzinach 10:15 — 11:45
| TERMIN | WYKŁADOWCA | TEMAT |
|---|---|---|
| 8 października 2019 | Evelia Rosa García Barroso (La Laguna) | Contact exponent and the Milnor number of plane curve singularities (Abstrakt) |
| 22 października 2019 | Justyna Szpond | Hiperpowierzchnie i osobliwości |
| 29 października 2019 | Halszka Tutaj-Gasińska | Obwiednie algebraiczne i polarność |
| 5 listopada 2019 | Grzegorz Malara | Hiperpowierzchnie stopnia 2 i polarność |
| 26 listopada 2019 | Tomasz Szemberg | Hiperpowierzchnie w $P^2$ i $P^3$ |
| 3 grudnia 2019 | Iman Bahmani Jafarloo | On the containment problem for fat points (Abstrakt) |
| 17 grudnia 2019 | Marcin Dumnicki | Systemy liniowe I |
| 14 stycznia 2020 | Marcin Dumnicki | Systemy liniowe II |
| 21 stycznia 2020 | Janusz Gwoździewicz | Przekształcenia Cremony I |
| 28 stycznia 2020 | Janusz Gwoździewicz | Przekształcenia Cremony II |
- Abstract of Prof. Barroso talk:
We investigate properties of the contact exponent (in the sense of Hironaka) of plane algebroid curve singularities over algebraically closed fields of arbitrary characteristic. We prove that the contact exponent is an equisingularity invariant and give a new proof of the stability of the maximal contact. Then we prove a bound for the Milnor number and determine the equisingularity class of algebroid curves for which this bound is attained. We do not use the method of Newton’s diagrams. Our tool is the logarithmic distance developed in [Garcia Barroso, E. and A. Ploski. An approach to plane algebroid branches. Rev. Mat. Complut., 28 (1) (2015), 227-252.]. This is a joint work with Arkadiusz Płoski. - Abstract of Iman Jafarloo talk:
Given an ideal I, the containment problem is concerned about finding the values m and r such that the m-th symbolic power of I is contained in its r-th ordinary power. In order to study this problem, it is useful, given an ideal I, to introduce an asymptotic quantity, known as resurgence and denoted by $r(I)$, defined as $r(I)=sup\{m/r: I^(m)$ is not contained in $I^r\}$. In this talk I consider the containment problem focusing on the ideals of fat points and I show how to compute the resurgence for two particular classes of sub-schemes. Specifically, we study the fat points sub-schemes whose supports are n collinear points and any three distinct points in $P^N$ for all $N\geq 2$.