LSF-Link | Veranstaltung |
Abschluss |
Lehrende |
|
|
||||
Lineare Algebra 2 | BA / MA | Prof. Dr. A. Werner |
||
Elementare Zahlentheorie |
BA/L3 | Prof. Dr. Katharina Hübner | ||
Proseminar | Algebren | BA | Prof. Dr. A. Werner | |
Vorlesung Übung |
Geometrie |
L2 / L5 | ||
Vorlesung |
Elementarmathematik 2 | L2 / L5 | Prof. Dr. M. Kreck |
|
Vorlesung Übung |
Algebraische Geometrie 2 |
MA | Prof. Dr. A. Küronya |
|
Modulformen | BA / MA /L3 | |||
Seminar |
Gitter und Kugelpackungen | BA / MA / L3 | Prof. Dr. M. Möller | |
Vorlesung Übung |
BA / MA | |||
Vorlesung |
Topologie 1a | BA | Prof. Dr. M. Kreck | |
Oberseminar | Abschlussseminar | BA/MA | Prof. Dr. Katharina Hübner Prof. Dr. M. Kreck Prof. Dr. A. Küronya Prof. Dr. M. Möller Prof. Dr. J. Stix Prof. Dr. M. Ulirsch Prof. Dr. A. Werner |
|
Oberseminar | Algebra und Geometrie (GAUS-Seminar) | MA | ||
Oberseminar |
MA |
LSF-Link | Veranstaltung |
Abschluss |
Lehrende |
|
Algebra | BA / L3 | Prof. Dr. M. Möller | ||
BA / L3 | Prof. Dr. A. Werner |
|||
Proseminar/L3-Seminar: Beweismethoden | BA | Prof. Dr. A. Werner | ||
Vorlesung Übung |
Elementarmathematik I | L2 / L5 | ||
Vorlesung Übung |
Lineare Algebra | L2 / L5 | Prof. Dr. M. Ulirsch |
|
Vorlesung |
Riemannsche Flächen II | BA / MA | Prof. Dr. M. Ulirsch |
|
Vorlesung Übung |
Algebraische Geometrie I | BA / MA | Dr. L. Battistella | |
Topologie II: Klassifikation von 4-Mannigfaltigkeiten |
BA / MA | Prof. Dr. M. Kreck |
||
Oberseminar |
Abschlussseminar |
BA / MA |
Prof. Dr. M. Kreck |
|
Oberseminar | MA | |||
Oberseminar | MA |
Lehre im Sommersemester 2022
Veranstaltung | Abschluss | Lehrende |
Lineare Algebra II | BA / L3 | Prof. Dr. M. Möller |
Elementarmathematik II | L2 / L5 | |
Geometrie | L2 / L5 | Prof. Dr. M. Kreck |
Algebraische Zahlentheorie III | MA | Prof. Dr. J. Stix |
Kommutative Algebra | BA / MA | Prof. Dr. A. Küronya |
BA / MA | ||
Tropische Geometrie | BA / MA | Dr. A. Gross |
Topologie 2 | MA | Prof. Dr. M. Kreck |
Seminar zur Zahlentheorie | BA / MA | Prof. Dr. J. Stix |
Oberseminar anabelsche Geometrie | MA | Prof. Dr. J. Stix |
BA / MA | Prof. Dr. M. Kreck | |
MA | ||
Forschungs- und Oberseminar | MA |
Veranstaltung | Abschluss |
Lehrende |
Lineare Algebra I | BA / L3 | Prof. Dr. M. Möller |
BA / L3 | Prof. Dr. M. Ulirsch | |
Proseminar |
BA | Prof. Dr. A. Werner |
Elementarmathematik I |
L2 / L5 |
Prof. Dr. A. Werner |
Lineare Algebra | L2 / L5 | Prof. Dr. A. Werner |
Kategorientheorie | BA / L3 | Prof. Dr. A. Küronya |
Algebraische Zahlentheorie II |
BA / MA |
Prof. Dr. J. Stix |
Elementare Zahlentheorie | BA / MA | Prof. Dr. J. Stix |
BA / MA |
Prof. Dr. A. Küronya |
|
BA / MA |
Prof. Dr. M. Ulirsch |
|
BA | Prof. Dr. M. Kreck | |
BA / MA |
Prof. Dr. M. Kreck |
|
MA | ||
Forschungs- und Oberseminar |
MA |
Lehre im Sommersemester 2021
Veranstaltung | Abschluss | Lehrende |
Lineare Algebra I | BA / L3 | Prof. Dr. A. Werner |
Lineare Algebra II | BA / L3 | Prof. Dr. A. Küronya |
Proseminar Konvexe Geometrie | BA / L3 | Prof. Dr. A. Küronya |
Elementarmathematik II | L2 / L5 | Dr. A. v. Pippich |
Geometrie L2/L5 | L2 / L5 | Prof. Dr. M. Kreck |
L3-Seminar | L3 | Prof. Dr. A. Werner |
Algebraische Zahlentheorie | BA / MA | Prof. Dr. J. Stix |
Komplexe Geometrie I | BA / MA | Prof. Dr. M. Ulirsch |
MA | Dr. S. Mullane | |
BA / MA | Prof. Dr. M. Kreck | |
BA / MA | Prof. Dr. J. Stix | |
BA / MA | Prof. Dr. M. Kreck | |
MA | ||
Forschungs- und Oberseminar | MA |
Lehre im Wintersemester 2020/21
Veranstaltung | Abschluss | Lehrende |
Lineare Algebra I | BA / L3 | Prof. Dr. A. Küronya |
Lineare Algebra (L2, L5) | L2 / L5 | Prof. Dr. A. Werner |
Elementarmathematik I | L2 / L5 | Prof. Dr. A. Werner |
L3-Seminar | L3 | Prof. Dr. A. Werner |
Algebra | BA / L3 | Prof. Dr. M. Möller |
Algebraische Geometrie III | BA / MA | Prof. Dr. A. Küronya |
Geometrische Gruppentheorie | BA / MA | Prof. Dr. M. Möller |
Riemannsche Flächen | BA / MA | Prof. Dr. M. Ulirsch |
BA / MA | Prof. Dr. M. Kreck | |
BA / MA | Prof. Dr. M. Kreck | |
BA / MA | Prof. Dr. M. Kreck | |
MA | ||
Forschungs- und Oberseminar | MA |
Lehre im Sommersemester 2020
Veranstaltung | Abschluss | Lehrende |
Lineare Algebra I | BA / L3 | Prof. Dr. J. Stix |
Lineare Algebra II | BA / L3 | Prof. Dr. M. Ulirsch |
Elementarmathematik II | L2 / L5 | Prof. Dr. A. Küronya |
Geometrie (L2/L5) | L2 / L5 | Prof. Dr. M. Möller |
Proseminar über Matroide | Prof. Dr. A. Werner | |
Algebraische Geometrie II | MA | Prof. Dr. A. Küronya |
Elementare Zahlentheorie | BA | Prof. Dr. M. Möller |
Kommutative Algebra | BA / MA | Prof. Dr. A. Werner |
BA / MA | Prof. Dr. M. Kreck | |
MA | Prof. Dr. A. Küronya | |
BA / MA | Prof. Dr. J. Stix | |
TGiF Seminar: Tropical Geometry in Frankfurt | Prof. Dr. M. Ulirsch | |
BA / MA | Prof. Dr. M. Kreck | |
MA | ||
Forschungs- und Oberseminar |
Lehre im Wintersemester 2019/20
Veranstaltung | Abschluss | Lehrende |
Lineare Algebra I | BA / L3 | Prof. Dr. A. Werner |
Funktionentheorie und | BA / L3 | Prof. Dr. M. Ulirsch |
Elementarmathematik I | L2 / L5 | Prof. Dr. A. Küronya |
Lineare Algebra (L2/L5) | L2 / L5 | Dr. J. Zachhuber |
Seminar Graduierte Ringe | L3 /MA | Prof. Dr. A. Küronya |
Ebene algebraische Kurven | BA / L3 | Prof. Dr. M. Ulirsch |
Algebra | BA / L3 | Prof. Dr. J. Stix |
Algebraische Geometrie I | MA | Prof. Dr. A. Küronya |
Kohomologie von Gruppen | BA / MA | Prof. Dr. M. Kreck |
Seminar über nicht-archimedische | MA | Prof. Dr. A. Werner |
Abschlussseminar | BA / MA | Prof. Dr. M. Kreck |
Algebra und Geometrie | MA | |
Forschungs- und Oberseminar | MA |
Lehre im Sommersemester 2019
Veranstaltung: | Abschluss : | Lehrende: |
Geometrie | BA / L3 | Prof. Dr. J. Stix |
Grundlagen der Algebra | BA / L3 | Prof. Dr. J. Stix |
Lineare Algebra I | BA / L3 | Prof. Dr. M. Möller |
Elementarmathematik II (L2/L5) | L2 / L5 | Prof. Dr. M. Ulirsch |
Geometrie (L2/L5) | L2 / L5 | Prof. Dr. A. Küronya |
Lineare Algebra (L2/L5) | L2 / L5 | Prof. Dr. A. Küronya |
Divisoren und Sandhaufen: Eine Einführung in das Chip-Firing | BA / L3 | Prof. Dr. M. Ulirsch |
L3 Seminar | L3 | Prof. Dr. A. Werner |
Seminar zur Algebra | L3 | Prof. Dr. A. Werner |
Kommutative Algebra | BA / MA | Prof. Dr. A. Küronya |
Nicht-archimedische Geometrie | BA / MA | Prof. Dr. A. Werner |
Komplexe Algebraische | MA | Prof. Dr. M. Möller |
Topologie II | MA | Prof. Dr. M. Kreck |
Seminar zur Topologie II | MA | Prof. Dr. M. Kreck |
Abschlussseminar | BA / MA | Prof. Dr. M. Kreck |
Algebra und Geometrie | MA | |
Forschungs- und Oberseminar | MA |
Lehre im Wintersemester 2018/19
Veranstaltung: | Abschluss : | Lehrende: |
Funktionentheorie u.gewöhnliche Differentialgleichungen | BA / L3 | Dr. A. Ivanov |
Lineare Algebra | BA / L3 | Prof. Dr. J. Stix |
Elementarmathematik I (L2/L5) | L2 / L5 | Dr. A. Ivanov |
Mathe für alle - ein Blogseminar | L3 | Prof. Dr. A. Werner |
Algebra | BA / L3 | Prof. Dr. A. Werner |
Elementare Zahlentheorie | BA / L3 | Prof. Dr. J. Wolfart |
Komplexe Algebraische Geometrie | MA | Prof. Dr. M. Möller |
Topologie | BA / MA | Prof. Dr. M. Kreck |
Seminar zur Logik | BA / MA | Prof. Dr. A. Werner |
Abschlussseminar | BA / MA | Prof. Dr. M. Kreck Prof. Dr. A. Küronya Prof. Dr. M. Möller Prof. Dr. J. Stix Prof. Dr. A. Werner |
Algebra und Geometrie | MA | |
Forschungs- und Oberseminar (Darmstadt-Frankfurt) | MA |
Lehre im Sommersemester 2018
Veranstaltung: | Abschluss: | Lehrende: |
Geometrie | BA / L3 | Prof. Dr. A. Küronya |
Grundlagen der Algebra | BA / L3 | Prof. Dr. A. Küronya |
Lineare Algebra | BA / L3 | Prof. Dr. M. Kreck |
Elementarmathematik II | L2 / L5 | Prof. Dr. J. Stix |
Geometrie (L2/L5) | L2 / L5 | Prof. Dr. M. Möller |
Lineare Algebra zur | L2 / L5 | Prof. Dr. M. Möller |
Proseminar / L3-Seminar | L3 | Prof. Dr. A. Küronya |
Algebraische Zahlentheorie | MA | Prof. Dr. J. Stix |
Fuchssche Gruppen | BA / L3 | Prof. Dr. J. Wolfart |
Kommutative Algebra | BA | Prof. Dr. M. Möller |
Abschlussseminar | BA / MA | Prof. Dr. M. Kreck |
Algebra und Geometrie | MA | |
Forschungs- und Oberseminar | MA |
Lehre im Wintersemester 2017/18
Lehre im Sommersemester 2017
Lehre im Wintersemester 2016/17
Veranstaltung: | Abschluss: | Lehrende: |
Funktionentheorie und DGL | BA / L3 | Prof. Dr. A. Werner |
Lineare Algebra | BA / L3 | Prof. Dr. M. Möller |
Proseminar Quadratische Formen | BA | Prof. Dr. J. Stix |
Elementarmathematik I | L2 / L5 | Prof. Dr. J. Wolfart |
Geometrie Seminar (L3) | L3 | Prof. Dr. A. Küronya |
Algebra | BA / L3 | Prof. Dr. J. Stix |
Algebraische Geometrie I | BA / MA | Prof. Dr. A. Küronya |
Knoten und Flächen | BA / MA / L3 | Prof. Dr. M. Kreck |
Nicht-archimedische Zahlen | BA | Prof. Dr. A. Werner |
Algebraische Geometrie III | MA | Prof. Dr. M. Möller |
Algebraische Zahlentheorie II | MA | Prof. Dr. J. Stix |
Seminar Stacks | BA | Prof. Dr. J. Stix |
Abschlussseminar | BA / MA | Prof. Dr. M. Kreck |
Algebra und Geometrie | MA | |
Forschungs- und Oberseminar: | MA |
Lehre im Sommersemester 2016
Veranstaltung: | Abschluss: | Lehrende: |
Geometrie | BA / L3 | Prof. Dr. J. Stix |
Grundlagen der Algebra | BA / L3 | Prof. Dr. J. Stix |
Lineare Algebra | L3 | Prof. Dr. J. Wolfart |
Elementarmathematik II | L2 / L5 | Prof. Dr. A. Werner |
Geometrie | L2 / L5 | Prof. Dr. A. Küronya |
Lineare Algebra zur Sekundarstufe I | L2 / L5 | Prof. Dr. A. Küronya |
Seminar zum Thema Codierungstheorie | L3 | Prof. Dr. A. Werner |
Algebraische Geometrie II | BA / L3 / MA | Prof. Dr. A. Werner |
Kommutative Algebra | BA / L3 | Prof. Dr. A. Küronya |
Proendliche Gruppen | BA / MA | Prof. Dr. J. Stix |
Seminar Kommutative Algebra | BA | Prof. Dr. A. Küronya |
Seminar zur Topologie | BA / L3 | Prof. Dr. M. Kreck |
Seminar zur Zahlentheorie | BA / MA | Prof. Dr. J. Stix |
Topologie II | BA / L3 | Prof. Dr. M. Kreck |
Abschlussseminar | BA / MA | Prof. Dr. M. Kreck |
Algebra und Geometrie | MA | |
Forschungs- und Oberseminar: | MA |
Veranstaltung: | Abschluss: | Lehrende: |
Lineare Algebra | BA / L3 | Prof. Dr. J. Stix |
Funktionentheorie und gewöhnliche Differentialgleichungen | BA / L3 | Prof. Dr. J. Wolfart |
Kombinatorische Anwendungen der Algebra | BA / L3 | Prof. Dr. A. Küronya |
Algebraische Graphentheorie | BA / L3 | Prof. Dr. A. Werner |
Elementarmathematik I | L2 / L5 | Prof. Dr. A. Werner |
Elementargeometrie | L3 | Prof. Dr. A. Werner |
Algebra I | BA /L3 | Prof. Dr. A. Küronya |
Algebraische Geometrie | BA / L3 / MA | Prof. Dr. M. Möller |
Algebraische Zahlentheorie | BA / MA | Prof. Dr. J. Stix |
Topologie | BA / L3 | Prof. Dr. M. Kreck |
Algebraische Geometrie | BA / MA | Prof. Dr. M. Möller |
Algebra und Geometrie | Prof. Dr. M. Möller Prof. Dr. A. Werner | |
Forschungs- und Oberseminar: | Prof. Dr. M. Möller Prof. Dr. A. Werner |
Veranstaltung: | Abschluss: | Lehrende: |
Geometrie | BA / L3 | Prof. Dr. Alex Küronya |
Grundlagen der Algebra | BA / L3 | Prof. Dr. Alex Küronya |
Lineare Algebra | BA / L3 | Prof. Dr. Annette Werner |
Elementare Zahlentheorie (BaM-AZ-g) | BA | Prof. Dr. Jakob Stix |
Kommutative Algebra (BaM-AZ-g) | BA | Prof. Dr. Jakob Stix |
Elementarmathematik II (L2, L5) | L2 / L5 | Dr. André Kappes |
Geometrie (L2, L5) | L2 / L5 | Andreas Maurischat |
Lineare Algebra zur Sekundarstufe I | L2 / L5 | Andreas Maurischat |
Tropische und nicht-archimedische | BA | Prof. Dr. Annette Werner |
Oberseminar Algebra und Geometrie | Prof. Dr. Martin Möller Prof. Dr. Annette Werner | |
Forschungs- und Oberseminar: | Prof. Dr. Martin Möller Prof. Dr. Annette Werner |
Veranstaltung: | Abschluss: | Lehrende: |
Lineare Algebra | BA / L3 | Prof. Dr. Martin Möller |
Algebra | BA | Prof. Dr. Jakob Stix |
Arithmetik elliptischer Kurven | BA / MA | Prof. Dr. Jakob Stix |
Ergodentheorie | BA / MA / L3 | Prof. Dr. Martin Möller |
Nicht-archimedische Geometrie | BA / MA | Prof. Dr. Annette Werner |
Geometrische Topologie | BA / L3 | Prof. Dr. Wolfgang Metzler |
Elementarmathematik I | L2 / L5 | Prof. Dr. Klaus Johannson |
Brauergruppe | BA | Prof. Dr. Jakob Stix |
Oberseminar Algebra und Geometrie | Prof. Dr. Martin Möller Prof. Dr. Annette Werner | |
Forschungs- und Oberseminar | Prof. Dr. Martin Möller Prof. Dr. Annette Werner |
Veranstaltungen: | Abschluss: | Dozenten: |
Algebraische Zahlentheorie | BA / MA | Dr. Amir Dzambic |
Blockseminar Schnitttheorie | MA | Prof. Dr. Martin Möller |
Forschungs- und Oberseminar | Prof. Dr. Martin Möller Prof. Dr. Annette Werner | |
Geometrie | L2 / L5 | Dr. Patrik Hubschmid |
Geometrie | BA / L3 | Prof. Dr. Jakob Stix |
Grundlagen der Algebra | BA / L3 | Prof. Dr. Jakob Stix |
Kleinsche Gruppen | BA / MA / L3 | Prof. Dr. Klaus Johannson |
L3-Seminar | L3 | Prof. Dr. Wolfgang Metzler |
Lineare Algebra | BA / L3 | Prof. Dr. Jürgen Wolfart |
Lineare Algebra zur Sekundarstufe I | L2 / L5 | Dr. Patrik Hubschmid |
Lineare Darstellungen endlicher Gruppen | BA / L3 | Prof. Dr. Jakob Stix |
Oberseminar Algebra und Geometrie | Prof. Dr. Martin Möller Prof. Dr. Annette Werner | |
Quadratische Formen | BA / MA / L3 | Dr. André Kappes |
Repetitorium "Lineare Algebra I" | BA / L3 | Prof. Dr. Annette Werner |
Riemannsche Flächen II | BA / MA | Dr. André Kappes |
aus vorangegangenen Semestern (seit WiSe 10/11):
Mi, 04. Okt. 2023, Oberseminar Algebra und Geometrie
Mi, 25. Okt. 2023, Oberseminar Algebra und Geometrie
Mi, 08. Nov. 2023, Frankfurter Seminar – Kolloquium des Instituts für Mathematik
Mi, 06. Dez. 2023, Oberseminar Algebra und Geometrie
Mi, 10. Mai 2023, Frankfurter Seminar – Kolloquium des Instituts für Mathematik
Mi, 24. Mai 2023, Oberseminar Algebra und Geometrie
Mi, 31. Mai 2023, Oberseminar Algebra und Geometrie
Mi, 28. Juni 2023, Oberseminar Algebra und Geometrie
Mi, 05. Juli 2023, Oberseminar Algebra und Geometrie
Do, 20. Okt. 2022, Oberseminar Algebra und Geometrie
Mi, 26. Oct. 2022, Oberseminar Algebra und Geometrie
Mi, 1. Nov. 2022, Oberseminar Algebra und Geometrie
Mi, 23. Nov. 2022, Oberseminar Algebra und Geometrie
Mi, 10. Jan. 2023, Oberseminar Algebra und Geometrie
Mi, 18. Jan. 2023, Oberseminar Algebra und Geometrie
Mi, 18. Mai 2022, Oberseminar Algebra und Geometrie
Mi, 15. Juni 2022, Oberseminar Algebra und Geometrie
Mi, 20. Okt. 2021, Oberseminar Algebra und Geometrie
Mi, 10. Nov. 2021, Oberseminar Algebra und Geometrie
Mi, 12. Jan. 2022, Oberseminar Algebra und Geometrie
Mi, 12. Jan. 2022, Oberseminar Algebra und Geometrie
Mi, 02. Feb. 2022, Oberseminar Algebra und Geometrie
Mi, 09. Feb. 2022 Oberseminar Algebra und Geometrie
Mi, 16. Feb. 2022Oberseminar Algebra und Geometrie
Mi, 21. April 2021, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 05. Mai 2021, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 19. Mai 2021, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 02. Juni 2021, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 23. Juni 2021, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 30. Juni 2021, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 14. Juli 2021, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 04. August 2021, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 4. Nov. 2020, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 18. Nov. 2020, Oberseminar Algebra und Geometrie (on Zoom):
Mi, 2. Dez. 2020, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 16. Dez. 2020, Oberseminar Algebra und Geometrie (on Zoom)
Mi., 20. Jan. 2021, Oberseminar Algebra und Geometrie (on Zoom)
Mi., 27. Jan. 2021, Oberseminar Algebra und Geometrie (on Zoom)
Di., 2. Feb. 2021, Interdisciplinary Seminar (on Zoom)
Mi, 3. Feb. 2021, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 10. March 2021, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 13. Mai 2020, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 20. Mai 2020, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 17. Juni 2020, Oberseminar Algebra und Geometrie (on Zoom)
Do, 19. Dezember 2019, Oberseminar Algebra und Geometrie
Mi, 18. Dezember 2019, Oberseminar Algebra und Geometrie
Mi, 4. Dezember 2019, Oberseminar Algebra und Geometrie
Mi, 23. Oktober 2019, Oberseminar Algebra und Geometrie
Mi, 03. April 2019, Oberseminar Algebra und Geometrie
Mi, 22. Mai 2019, Oberseminar Algebra und Geometrie
Do, 06. Juni 2019, Oberseminar Algebra und Geometrie
Mi, 12. Juni 2019, Oberseminar Algebra und Geometrie
Mo, 24. Juni 2019, Oberseminar Algebra und Geometrie
Mi, 26. Juni 2019, Oberseminar Algebra und Geometrie
Do, 18. Juli 2019, Oberseminar Algebra und Geometrie
Mi, 16. Januar 2019, Oberseminar
Mi, 23. Mai 2018 Oberseminar Algebra und Geometrie
Mi, 20. Juni 2018 Oberseminar Algebra und Geometrie
Mi, 27. Juni 2018 Oberseminar Algebra und Geometrie
Di, 03. Juli 2018 Forschungs- und Oberseminar
Do., 16. November 2017, Oberseminar Algebra und Geometrie
Do, 30. November 2017, Oberseminar Algebra und Geometrie
Do, 01. Februar 2018, Oberseminar Algebra und Geometrie
Mi, 07. Februar 2018, Oberseminar Algebra und Geometrie
Do, 08. Februar 2018, Oberseminar Algebra und Geometrie
Mi, 21. Juni 2017, Oberseminar
Do, 29. Juni 2017, Oberseminar
19. Oktober 2016, Oberseminar
09. November 2016, Oberseminar
16. November 2016, Oberseminar
11. Januar 2017, Oberseminar
1. Juni 2016, Oberseminar / Abschlussseminar
13. Juli 2016, Oberseminar / Abschlussseminar
23., 24., 25.02.2016 Vortragsreihe im Oberseminar
19.11.2015, Vortrag im Oberseminar
16.7.2015, Vortrag im Oberseminar
17.06.2015, Vortrag im Oberseminar
10.06.2015, Vortrag im Oberseminar
13.11.2014, Vortrag im Oberseminar
02.10.2014, Vortrag im Oberseminar
11.07.2014, Vorträge im Oberseminar
03.07.2014, Vortrag im Oberseminar
28.05.2014, Vortrag im Oberseminar
12.12.2013, Vortrag im Oberseminar
28.11.2013, Vortrag im Oberseminar
31.10.2013, Vortrag im Oberseminar
14.10.2013, Vortrag
13.06.2013, Vortrag im Oberseminar Algebra und Geometrie
18.01.2013, Vortrag im mathematischen Kolloquium
14.12.2012, Vortrag im mathematischen Kolloquium
12.07.2012, Vortrag im Oberseminar Algebra und Geometrie
19.04.2012, Vortrag im Oberseminar Algebra und Geometrie
21.11.-22.11.2011. Kolloquium zur algebraischen Geometrie
27.10.2011, Vortrag im Oberseminar Algebra und Geometrie
30.08.2011, Vortrag im Oberseminar Algebra und Geometrie
22.08.2011, Vortrag im Oberseminar Algebra und Geometrie
15.07.2011, Vortrag im Oberseminar Algebra und Geometrie
16.06.2011, Vortrag im Oberseminar Algebra und Geometrie
27.05.2011, Vortrag im mathematischen Kolloquium
19.05.2011 Vortrag im Oberseminar Algebra und Geometrie
28.04.2011 Vortrag im Oberseminar Algebra und Geometrie
Sommersemester 2024
Do, 02. Mai 2024
Di, 30. April 2024
Di, 09. April 2024
Wintersemester 2023/24
Di, 12. März 2024
Do, 08. Februar 2024
Mo, 22. Januar 2024
Fr, 15. Dezember 2023
Mi, 01. November 2023
Mo, 23. Oktober 2023
Sommersemester 2023
Mo, 11. September 2023
Fr, 08. September 2023
Mo, 04. September 2023
Mo, 31. Juli 2023
Fr, 23. Juni 2023
Mi, 21. Juni 2023
Wintersemester 2022/23
Di, 24. Januar 2023
Mi, 11. Januar 2023
Mi, 14. Dezember 2022
Mo, 17. Oktober 2022
Sommersemester 2022
Di, 12. April 2022
Di, 26. April 2022
Di, 03. Mai 2022
Do, 14. Juli 2022
Mi, 27. Juli 2022
Wintersemester 2021/22
Mi, 16. Februar 2022
Mi, 23. Februar 2022
Di, 15. März 2022
Sommersemester 2021
Mi, 23. Juni 2021, Bachelorabschlussvortrag (on Vidyo)
Mi, 07. Juli 2021, Masterabschlussvortrag (on Vidyo)
Mi, 14. Juli 2021, Bachelorabschlussvortrag
Wintersemester 2020/21
Di, 6. Okt. 2020, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 4. Nov. 2020, Bachelorabschlussvortrag (on Vidyo)
Mi, 3. Feb. 2021, Bachelorabschlussvortrag (on Zoom)
Do, 18. Feb. 2021, Masterabschlussvortrag (on Vidyo)
Sommersemester 2020
Di, 7. Juli 2020, Oberseminar Algebra und Geometrie (on Zoom)
Mi, 8. Juli 2020, Oberseminar Algebra und Geometrie (on Zoom)
Wintersemester 2019/20
Do, 23. January 2019 Oberseminar Algebra und Geometrie
Mi, 22. Januar 2019 Vortrag im Abschlussseminar
Sommersemester 2019
Mi, 17. Juli 2019 Bachelor-Abschlussprüfung
Do, 18. Juli 2019 Bachelor-Abschlussprüfung
Do, 26. September 2019 Bachelor Abschlussseminar
Fr, 27. September 2019 Abschlussseminar
Wintersemester 2018/19
Fr, 25. Januar 2019 Loewe-Vortragsreihe für ein allgemeines Publikum
Mathe für alle - Was Sie schon immer über Mathematik wissen wollten, aber bisher nicht zu fragen wagten.
Di, 19. März 2019 (Bachelor Vortrag im Abschlussseminar)
Sommersemester 2018
Mi, 25. April 2018 Abschlussseminar
Mi, 13. Juni 2018 Abschlussseminar
Mo, 18. Juni 2018 Antrittsvorlesungen im Rahmen
Mi, 29. August 2018 Abschlussseminar
Di, 11. September 2018 Abschlussseminar
Wintersemester 2017/18
Sommersemester 2017
Wintersemester 2016/17
26. Oktober 2016 Abschlussseminar
30. November 2016 Abschlussseminar
1. Februar 2017
8. Februar 2017 Oberseminar
Sommersemester 2016
14.04.2016 Vortragsreihe im Oberseminar
20. April 2016 Oberseminar / Abschlussseminar
1. August 2016 Oberseminar / Abschlussseminar
Do, 15. September 2016 Abschlussseminar
Wintersemester 2015/16
03.12.2015 Vortrag im Oberseminar
22.10.2015 Vortrag im Oberseminar
Sommersemester 2015
16.7.2015 Vortrag im Oberseminar
25.06.2015
17.06.2015 Vortrag im Oberseminar
10.06.2015 Vortrag im Oberseminar
13.05.2015 Vortrag im Oberseminar
27.04.2015, 11.05.2015 und 01.06.2015
16.04.2015 Vortrag im Oberseminar (Bericht über Bachelorarbeit)
Wintersemester 2014/15
29.01.2015 Vorträge im Oberseminar (Berichte über Bachelorarbeiten)
15.01.2015 Vortrag im Oberseminar (Bericht über Bachelorarbeit)
11.12.2014 Vortrag im Oberseminar
Sommersemester 2014
15.05.14 Vortrag im Oberseminar
Wintersemester 2013/14
03.02.2014 Vorträge im Oberseminar
12.12.2013 Vortrag im Oberseminar
28.11.2013 Vortrag im Oberseminar
14.11.2013 Vorträge im Oberseminar
31.10.2013 Vortrag im Oberseminar
Sommersemester 2013
11.07.2013 Vortrag im Oberseminar Algebra und Geometrie
Wintersemester 2011/2012
02.02.2012 Vortrag im Oberseminar Algebra und Geometrie
Forschungsseminar | Semester |
Rigid analytic motives [Programme] | WiSe 2023/24 |
Anabelian geometry [Programme] | WiSe 2023/24 |
Bridgeland stability conditions and applications [Programme] | SoSe 2023 |
Buildings [Programme] | WiSe 2022/23 |
Non-hypergeometric E-functions [Programme] | WiSe 2022/23 |
The Grothendieck conjecture for affine curves [Programme] | SoSe 2022 |
The André-Oort Conjecture [Programme] | SoSe 2022 |
Hodge theory of matroids [Programme] | WiSe 2021/22 |
The P = W conjecture [Programme] | SoSe 2021 |
DaFra-Seminar on Condensed Mathematics [Programme] | WiSe 2020/21 |
The paramodular conjecture (Frankfurt-Darmstadt) [Programme] | WiSe 2019/20 |
Uniformity of rational points on curves (Frankfurt-Darmstadt) [Programme] | SoSe 2019 |
The Noether-Lefschetz conjecture (Frankfurt-Darmstadt) [Programme] | WiSe 2018/19 |
Positivity of Higher-Codimensional Subvarieties (Frankfurt-Darmstadt) [Programme] | SoSe 2018 |
Unramified and Tamely Ramified Goemetric Class Field Theory (Frankfurt-Darmstadt) [Programme] | WiSe 2017/18 |
Toric varieties and modular forms (Frankfurt-Darmstadt) [Programme] | SoSe 2017 |
Abelsche Varietäten und der Torelli-Lokus (Frankfurt-Darmstadt) [Programme] | WiSe 2016/17 |
Rational points. (Frankfurt-Darmstadt) [Programme] | WiSe 2016/17 |
arXiv-Seminar (Frankfurt-Darmstadt) [Programme] | SoSe 2016 |
Vertex algebras (Frankfurt-Darmstadt) [Programme] | WiSe 2015/16 |
Arrangements, Kammerkomplexe und K(Π, 1)-Räume (Frankfurt-Darmstadt) [Programme] | SoSe 2015 |
Prime-Gaps (Frankfurt-Darmstadt) [Programme] | WiSe 2014/15 |
Noether-Lefschetz und Gromov-Witten (Frankfurt-Darmstadt) [Programme] | SoSe 2014 |
Die Birch-Swinnerton-Dyer-Vermutung und die Gross-Zagier-Formel (Frankfurt-Darmstadt) [Programme] | WiSe 2013/14 |
Margulis' Superstarrheit und Arithmetizität (Frankfurt-Darmstadt) | SoSe 2013 |
Arakelov-Theorie (Frankfurt-Darmstadt) | WiSe 2012/13 |
Selbergs 3/16 Theorem (Frankfurt-Darmstadt) | SoSe 2012 |
Institutsweites Forschungsseminar "Polynomielle Gleichungssysteme" | SoSe 2012 |
Berkovich-Räume und ihre Anwendungen | WiSe 2011/12 |
Forschungsseminar über Expandergraphen | SoSe 2011 |
Stationäre Maße auf Liegruppen nach Benoist und Quint [Programme] | WiSe 2010/11 |
This is an afternoon seminar series on Tropical Geometry.
Session will be held in a hybrid format, with participants able to join both in-person and on the online platform Zoom. To participate online, please register by sending an email to one of the organisers by the day before the next meeting. You will then receive the link to the meeting on the day of the meeting. Those in the SGA mailing list need not register.
Videos of some of the past talks are now available via our new youtube channel.
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Andreas Bernig (Goethe-Universität Frankfurt): Hard
Lefschetz theorem and Hodge-Riemann relations for convex
valuations
Abstract: The hard Lefschetz theorem and the Hodge-Riemann relations have their
origin in the cohomology theory of compact Kähler manifolds. In recent
years it has become clear that similar results hold in many different
settings, in particular in algebraic geometry and combinatorics (work by
Adiprasito, Huh and others). In a recent joint work with Jan Kotrbatý
and Thomas Wannerer, we prove the hard Lefschetz theorem and
Hodge-Riemann relations for valuations on convex bodies. These results
can be translated into an array of quadratic inequalities for mixed
volumes of smooth convex bodies, giving a smooth analogue of the
quadratic inequalities in McMullen's polytope algebra. Surprinsingly,
these inequalities fail for general convex bodies. Our proof uses
elliptic operators and perturbation theory of unbounded operators.
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Adam Afandi (Universität Münster): Stationary Descendents and the Discriminant Modular Form
Abstract: By using the Gromov-Witten/Hurwitz correspondence, Okounkov and Pandharipande showed that certain generating functions of stationary descendent Gromov-Witten invariants of a smooth elliptic curve are quasimodular forms. In this talk, I will discuss the various ways one can express the discriminant modular form in terms of these generating functions. The motivation behind this calculation is to provide a new perspective on tackling a longstanding conjecture of Lehmer from the middle of the 20th century; Lehmer posited that the Ramanujan tau function (i.e. the Fourier coefficients of the discriminant modular form) never vanishes. The connection with Gromov-Witten invariants allows one to translate Lehmer's conjecture into a combinatorial problem involving characters of the symmetric group and shifted symmetric functions.
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Noema Nicolussi (University of Potsdam): Hybrid curves and their moduli spaces - cancelled
Roberto Gualdi (University of Regensburg): From amoebas to arithmetics______________________________________________________________________________________________________________
Léonard Pille-Schneider (ENS, Paris): The SYZ conjecture for families of hypersurfaces
Abstract: Let X -> D* be a polarized family of complex Calabi-Yau manifolds, whose complex structure degenerates in the worst possible way. The SYZ conjecture predicts that the fibers X_t, as t ->0, degenerate to a tropical object; and in particular the program of Kontsevich and Soibelman relates it to the Berkovich analytification of X, viewed as a variety over the non-archimedean field of complex Laurent series.
I will explain the ideas of this program and some recent progress in the case of hypersurfaces.
Loujean Cobigo (Universität Tübingen): Tropical spin Hurwitz numbers______________________________________________________________________________________________________________
Victoria Schleis (Universität Tübingen): Linear degenerate tropical flag matroids
Abstract: Grassmannians and flag varieties are important moduli spaces in algebraic geometry. Their linear degenerations arise in representation theory as they describe quiver representations and their irreducible modules. As linear degenerations of flag varieties are difficult to analyze algebraically, we describe them in a combinatorial setting and further investigate their tropical counterparts. In this talk, I will introduce matroidal, polyhedral and tropical analoga and descriptions of linear degenerate flags and their varieties obtained in joint work with Alessio Borzì. To this end, we introduce and study morphisms of valuated matroids. Using techniques from matroid theory, polyhedral geometry and linear tropical geometry, we use the correspondences between the different descriptions to gain insight on the structure of linear degeneration. Further, we analyze the structure of linear degenerate flag varieties in all three settings, and provide some cover relations on the poset of degenerations. For small examples, we relate the observations on cover relations to the flat irreducible locus studied in representation theory.
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Sabrina Pauli (Universität Duisburg-Essen): Quadratically enriched tropical intersections 1
Abstract:
Tropical geometry has been proven to be a powerful computational tool
in enumerative geometry over the complex and real numbers. Results from
motivic homotopy theory allow to study questions in enumerative geometry
over an arbitrary field k. In these two talks we present one of the
first examples of how to use tropical geometry for questions in
enuemrative geometry over k, namely a proof of the quadratically
enriched Bézout's theorem for tropical curves.
In the first talk we explain what we mean by the "quadratic enrichment", that is we define the necessary notions of enumerative geometry over arbitrary fields valued in the Grothendieck-Witt ring of quadratic forms over k.
Andrés Jaramillo Puentes (Universität Duisburg-Essen): Quadratically enriched tropical intersections 2______________________________________________________________________________________________________________
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Abstract: The tropical moduli space $\Delta_{g,n}$ is a topological space that parametrizes isomorphism classes of $n$-marked stable tropical curves of genus $g$ with total volume 1. Its reduced rational homology has a natural structure of $S_n$-representations induced by permuting markings. In this talk, we focus on $\Delta_{2,n}$ and compute the characters of these $S_n$-representations for $n$ up to 8. We use the fact that $\Delta_{2,n}$ is a symmetric $\Delta$-complex, a concept introduced by Chan, Glatius, and Payne. The computation is done in SageMath.
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Karl Christ (Ben-Gurion University): Severi problem and tropical geometry
Abstract: The classical Severi problem is to show that the space of reduced and irreducible plane curves of fixed geometric genus and degree is irreducible. In case of characteristic zero, this longstanding problem was settled by Harris in 1986. In the first part of my talk I will give a brief overview of the ideas involved. Then, I will describe a tropical approach to studying degenerations of plane curves, which is the main ingredient to a new proof of irreducibility obtained in collaboration with Xiang He and Ilya Tyomkin. The main feature of the construction is that it works in positive characteristic, where the other known techniques fail.
Oliver Lorscheid (IMPA Rio de Janeiro/MPI Bonn): Towards a cohomological understanding of the tropical Riemann Roch theorem
Abstract: In this talk, we outline a program of developing a cohomological understanding of the tropical Riemann Roch theorem and discuss the first established steps in detail. In particular, we highlight the role of the tropical hyperfield and explain why ordered blue schemes provide a satisfying framework for tropical scheme theory.
In the last part of the talk, we turn to the notion of matroid bundles, which we hope to be the right tool to set up sheaf cohomology for tropical schemes. This is based on a joint work with Matthew Baker.
Diane Maclagan (University of Warwick): Connectivity of tropical varieties
Abstract: The structure theorem for tropical geometry states that the tropicalization of an irreducible subvariety of the algebraic torus over an algebraically closed field is the support of a pure polyhedral complex that is connected through codimension one. This means that the hypergraph whose vertices correspond to facets of the complex, and whose hyperedges correspond to the ridges, is connected. In this talk I will discuss joint work with Josephine Yu showing that this hypergraph is in fact d-connected (when the complex has no lineality space). This can be thought of as a generalization of Balinski's theorem on the d-connectivity of the edge graph of a d-polytope. A key ingredient of the proof is a toric Bertini theorem of Fuchs, Mantova, and Zannier, plus additions of Amoroso and Sombra.
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Enrica Mazzon (Max-Planck-Institute Bonn): Tropical affine manifolds in mirror symmetry
Abstract: Mirror symmetry is a fast-moving research area at the boundary between mathematics and theoretical physics. Originated from observations in string theory, it suggests that certain geometrical objects (complex Calabi-Yau manifolds) should come in pairs, in the sense that each of them has a mirror partner and the two share interesting geometrical properties. In this talk I will introduce some notions relating mirror symmetry to tropical geometry, inspired by the work of Kontsevich-Soibelman and Gross-Siebert. In particular, I will focus on the construction of a so-called “tropical affine manifold" using methods of non-archimedean geometry, and the guiding example will be the case of K3 surfaces and some hyper-Kähler varieties. This is based on a joint work with Morgan Brown and a work in progress with Léonard Pille-Schneider.
Christoph Goldner (Tübingen): Tropical mirror symmetry for ExP^1
Abstract: We recall some results of tropical mirror symmetry that relate the generating series of tropical Gromov-Witten invariants of an elliptic curve E to sums of Feynman integrals. After that, we present an approach to tropical mirror symmetry in case of ExP^1. The approach is based on the floor decomposition of tropical curves which is a degeneration technique that allows us to apply the results of the elliptic curve case. The new results are joint work with Janko Böhm and Hannah Markwig.
Sam Payne (University of Texas, Austin): Local h-vectors
Abstract: tba
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Schedule:
Madeline Brandt (University of California at Berkeley): Matroids and their Dressians
Abstract: In this talk we will explore Dressians of matroids. Dressians have many lives: they parametrize tropical linear spaces, their points induce regular matroid subdivisions of the matroid polytope, they parametrize valuations of a given matroid, and they are a tropical prevariety formed from certain Plücker equations. We show that initial matroids correspond to cells in regular matroid subdivisions of matroid polytopes, and we characterize matroids that do not admit any proper matroid subdivisions. An efficient algorithm for computing Dressians is presented, and its implementation is applied to a range of interesting matroids. If time permits, we will also discuss an ongoing project extending these ideas to flag matroids.
Dhruv Ranganathan (University of Cambridge): Tropical curves, stable maps, and singularities in genus one
Abstract: In the early days of tropical geometry, Speyer identified an extremely subtle combinatorial condition that distinguished tropical elliptic space curves from arbitrary balanced genus one graphs. Just before this, Vakil and Zinger gave a very explicit desingularization of the moduli space of elliptic curves in projective space, with remarkable applications. Just after this, Smyth constructed new compactifications of moduli spaces of pointed elliptic curves, using worse-than-nodal singularities, as part of the Hasset-Keel program. A decade on, we understand these three results as part of a single story involving logarithmic structures and their tropicalizations. I will discuss this picture and how the unified framework extends all three results. This is joint work with Keli Santos-Parker and Jonathan Wise.
Yoav Len (Georgia Institute of Technology): Algebraic and Tropical Prym varieties
Abstract: My talk will revolve around combinatorial aspects of Abelian varieties. I will focus on Pryms, a class of Abelian vari- eties that occurs in the presence of double covers, and have deep connections with torsion points of Jacobians, bi-tangent lines of curves, and spin structures. I will explain how problems concern- ing Pryms may be reduced, via tropical geometry, to problems on metric graphs. As a consequence, we obtain new results con- cerning the geometry of special algebraic curves, and bounds on dimensions of certain Brill–Noether loci. This is joint work with Martin Ulirsch.
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Margarida Melo (Università degli studi Roma Tre): Combinatorics and moduli of line bundles on stable curves.
Abstract: The moduli space of line bundles on smooth curves of given genus, the so called universal Jacobian, has a number of different compactifications over the moduli space of stable curves. These compactificatons have very interesting combinatorial properties, which can be used to describe their geometry. In the talk I will explain different features and applications of these interesting objects, focusing on properties which have a natural tropical counterpart.
Farbod Shokrieh (University of Copenhagen): Heights and moments of abelian varieties
Abstract: We give a formula which, for a principally polarized abelian variety $(A,\lambda)$ over the field of algebraic numbers, relates the stable Faltings height of $A$ with the N\'eron-Tate height of $(A,\lambda)$. Our formula completes earlier results due to Bost, Hindry, Autissier and Wagener. We also discuss the case of Jacobians in some detail, where graphs and electrical networks will play a role.
(Based on joint works with Robin de Jong.)
Workshops | |
The geometry of coherent sheaves: From derived categories to Higgs bundles | WiSe 2022/23 |
Nowton-Okounkov bodies and tropical geometry | WiSe 2022/23 |
The geometry of coherent sheaves: From derived categories to Higgs bundles | SoSe 2022 |
Mini Workshop on Toric Degenerations | SoSe 2021 |
Ruth Moufang Lectures | SoSe 2021 |
Non-Archimedean and tropical geometry | SoSe 2020 |
Winter School on Enumerativ Geometry and Modular Forms | WiSe 2018/19 |
Recent advances an the geometry of valuations | WiSe 2017/18 |
Non-Archimedean Geometry and Algebraic Groups | WiSe 2016/17 |
Süd-West-Arithmetik Seminar: Quantum Unique Ergodicity | SoSe 2015 |
Süd-West-Arithmetik Seminar (SWAS) 2014 | SoSe 2014 |
Süd-West-Arithmetik Seminar: Attaching Galois representations to modular forms | SoSe 2012 |
Workshop on Berkovich Spaces | SoSe 2011 |
Workshop zur Diskreten, Tropischen und Algebraischen Geometrie | SoSe 2011 |
mit anschließendem Mini-Workshop am 25. und 26.06.2010 anläßlich des 75. Geburtstages von Helmut Behr sowie der 65. Geburtstage von Robert Bieri und Jürgen Wolfart ein.
SPRECHER:
PROGRAMM:
Freitag 25.06.2010 (Lorenzhörsaal des phyisikalischen Vereins, Robert-Mayer-Str. 2-4):
15.00 Uhr: Begrüßung
15.15 Uhr: Herbert Abels: Zwei Erzeuger sind genug.
16.15 Uhr Kaffee
17.00 Uhr: Ralph Strebel: Robert Bieri und die Invarianten Sigma.
Ca. 19.00 Uhr: gemeinsames Abendessen in Dionysos (Rödelheimer Straße 34, Frankfurt)
Hinweis: Um eine Tischreservierung vornehmen zu können, wird um eine Anmeldung bis 15.06.2010 per Email an dzambic@math.uni-frankfurt.de gebeten.
Samstag 26.06.2010 (Großer Hörsaal 308, Robert-Mayer-Str.6-8):
10:30 Uhr: Martin Möller: Modular embeddings and Theta-half derivatives.
12:00 Uhr: Kai-Uwe Bux: Finitness properties of arithmetic groups: theorems and conjectures.
14:30 Uhr: Ulrich Stuhler: Zur Kohomologie einiger arithmetischer Gruppen.
16:00 Uhr: Manfred Streit: Galois actions on regular Belyi surfaces.
KONTAKT:
Amir Dzambic, Cynthia Hog-Angeloni, Jörg Lehner
Die Bilder wurden von Prof. Dr. Gerhard Burde gemalt. Das linke Bild zeigt in der Mitte das Gebäude Robert-Mayer-Straße 6-8 und am linken Rand den "Mathe-Turm" (Robert-Mayer-Straße 10). Das rechte Bild blickt aus der anderen Richtung auf die Gebäude, d. h. die Sternwarte in der Robert-Mayer-Straße 2 ist im Vordergrund und der "Mathe-Turm" am Ende.