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Internet Measurements
6.648
Dozenten
Beschreibung
NOTE: The listed timeslots and rooms (73/E24) are NOT 100% FINAL yet and might change. We are working with the colleagues from Twente to finalize them as soon as possible.
This course will be taught in cooperation with the University of Twente, several lectures will be held via video stream from Twente.
Description (taken from https://osiris.utwente.nl/)
Aims
Upon completing the course, students are able to:
- Understand why measuring at Internet scale is an important tool to advance network technology
- Understand the two main approaches to Internet measurement: active and passive measurements
- Understand the basic building blocks needed to set up a measurement (packet inspection, flows, active probing)
- Evaluate existing Internet measurement studies, focusing on the quality and reproducibility of the results
- Analyse the ethical implications of a measurement and the potential disruptive impact of a measurement
- Analyse Internet measurement results using state-of-the-art big data techniques
- Design their own Internet-scale measurement
Content
Have you ever wondered how a change in one of the Internet's protocols affects its users? How Internet traffic varies between day and night, weekdays and weekends, school holidays and exam periods? If some Internet companies really are too big to fail? You are not the only one. Measuring the Internet is vital to keeping the Internet stable and secure, and to inform policy for the Internet community and governments.
The Internet Measurements course will teach you everything about global, Internet-scale measurements, based on state-of-the art research done at the university. We will explain basic measurement concepts, such as the difference between passive measurements (where you just observe ongoing network traffic) and active measurements (where you actively send probes). We will discuss the ethics of Internet measurements, using censorship measurements and botnet-based measurements that the academic community found questionable. We will be using state-of-the-art big data analysis techniques, such as Apache Spark, to work with some of the very large datasets collected by the OpenINTEL measurement project (https://openintel.nl/). And right from the start, you will be designing your own Internet-scale measurement together with a group of students, to answer your own questions about the whys, hows and whats of the global Internet.
Weitere Angaben
Ort: (73/E24): Mo. 10:45 - 12:30 (5x)
Fr. 10:15 - 11:45 (2x)
Montag, 15.04.2024 12:00 - 14:00, Freitag, 17.05.2024 10:45 - 12:30, Dienstag, 18.06.2024 15:30 - 17:00,
(73/E06): Fr. 10:15 - 11:45 (1x),
(UTwente): Freitag, 07.06.2024, Freitag, 28.06.2024 09:00 - 14:00,
(UTwente Gebäude Carré Raum 3F): Montag, 10.06.2024 11:30 - 15:00
Zeiten: Mo. 10:45 - 12:30 (wöchentlich) - Timeslot not final!,
Fr. 10:15 - 11:45 (wöchentlich) - Exercise,
Termine am Montag, 15.04.2024 12:00 - 14:00, Freitag, 17.05.2024 10:45 - 12:30, Freitag, 07.06.2024 09:00 - 14:00, Montag, 10.06.2024 11:30 - 15:00, Freitag, 14.06.2024 11:00 - 12:00, Dienstag, 18.06.2024 15:30 - 17:00, Freitag, 28.06.2024 09:00 - 14:00, Samstag, 31.08.2024 (ganztägig)
Erster Termin: Freitag, 12.04.2024 10:00 - 12:00, Ort: (73/E24)
Veranstaltungsart: Vorlesung und Seminar (Offizielle Lehrveranstaltungen)
Studienbereiche
- Informatik > Master of Science in Informatik
- Informatik > Master of Science in Informatik (bis PO 2016)
- Informatik > Vorlesungen
- Mathematics/Computer Science
Research Areas:
Algebraic geometry 14-XX
K-theory 19-XX
Algebraic topology 55-XX
Publications:
- Cellularity of hermitian K-theory and Witt-theory (with Markus Spitzweck and Paul Arne Østvær)
- On the η-inverted sphere. K-Theory-Proceedings of the International Colloquium
- Gigantic random simplicial complexes Link (with Jens Grygierek, Martina Juhnke-Kubitzke, Matthias Reitzner and Tim Römer)
- On very effective hermitian K-theory Link (with Alexey Ananyevskiy and Paul Arne Østvær)
- The first stable homotopy groups of motivic spheres DOI (with Markus Spitzweck and Paul Arne Østvær)
- Vanishing in stable motivic homotopy sheaves (with Kyle Ormsby and Paul Arne Østvær) Link
- The multiplicative structure on the graded slices of hermitian K-theory and Witt-theory (with Paul Arne Østvær) Link
- Slices of hermitian K–theory and Milnor's conjecture on quadratic forms (with Paul Arne Østvær) Link
- Calculus of functors and model categories, II (with Georg Biedermann) Link
- The Arone-Goodwillie spectral sequence for Σ∞Ωn and topological realization at odd primes (with Sebastian Buescher, Fabian Hebestreit und Manfred Stelzer) Link
- Motivic slices and coloured operads (with Javier Gutierrez, Markus Spitzweck and Paul Arne Østvær) Link
- Motivic strict ring models for K-theory (with Markus Spitzweck and Paul Arne Østvær) PDF
- Theta characteristics and stable homotopy types of curves DOI
- A universality theorem for Voevodsky's algebraic cobordism spectrum (with Ivan Panin and Konstantin Pimenov) Link
- On the relation of Voevodsky's algebraic cobordism to Quillen's K-theory DOI (with Ivan Panin and Konstantin Pimenov)
- On Voevodsky's algebraic K-theory spectrum BGL (with Ivan Panin and Konstantin Pimenov)
- Rigidity in motivic homotopy theory DOI (with Paul Arne Østvær)
- Calculus of functors and model categories DOI (with Georg Biedermann and Boris Chorny)
- Motivic Homotopy Theory Link (with B.I.Dundas, M.Levine, P.A.Østvær and V.Voevodsky)
- Motives and modules over motivic cohomology Link (with Paul Arne Østvær)
- Modules over motivic cohomology DOI (with Paul Arne Østvær)
- Enriched functors and stable homotopy theory Link (with Bjørn Ian Dundas and Paul Arne Østvær)
- Motivic functors Link (with Bjørn Ian Dundas and Paul Arne Østvær)
Preprints and Talks:
Projekte
- DFG-Sachbeihilfe "Algebraic bordism spectra: Computations, filtrations, applications" (DFG-RSF-Antrag mit Alexey Ananyevskiy)
- DFG-Sachbeihilfe "Applying motivic filtrations" (mit Marc Levine und Markus Spitzweck) im DFG Schwerpunktprogramm 1786
- DFG-Sachbeihilfe "Operads in algebraic geometry and their realizations" (mit Jens Hornbostel,
Markus Spitzweck und Manfred Stelzer) im DFG Schwerpunktprogramm 1786 - DFG Sachbeihilfe ``Operad structures in motivic homotopy theory'' im DFG Schwerpunktprogramm 1786 ``Homotopy theory and algebraic geometry'' (mit Markus Spitzweck)
- DFG Sachbeihilfe ``Motivic filtrations over Dedekind domains'' im DFG Schwerpunktprogramm 1786 ``Homotopy theory and algebraic geometry'' (mit Marc Levine und Markus Spitzweck)
- DFG Graduiertenkolleg 1916 ``Combinatorial structures in geometry''
- DFG Sachbeihilfe ``Goodwillie towers, realizations, and En-structures''
- Graduiertenkolleg ``Combinatorial structures in algebra and topology'' (mit H. Brenner, W. Bruns, T. Römer und R. Vogt)
- DFG Sachbeihilfe ``Combinatorial structures in algebra and topology'' (mit H. Brenner, W. Bruns, T. Römer und R. Vogt)
Supervision
PhD
Philip Herrmann: Stable equivariant motivic homotopy theory and motivic Borel cohomology, 2012
Florian Strunk: On motivic spherical bundles, 2013
Master/Diplom
Markus Severitt: Motivic Homotopy Types of Projective Curves, 2006 PDF
Philip Herrmann: Ein Modell für die motivische Homotopiekategorie, 2009
Florian Strunk: Ein Modell für motivische Kohomologie, 2009
Sebastian Büscher: Anwendung der F2-kohomologischen Goodwillie-Spektralsequenz für iterierte Schleifenraeume, 2010
Fabian Hebestreit: On topological realization at odd primes, 2010
Katharina Lorenz: Darstellung unterschiedlicher mathematischer Rekonstruktionen von Größen, 2012
Jana Brickwedde: Fehlvorstellungen zum Grenzwertbegriff, 2015
Lena-Christin Müller: Penrose-Parkettierungen und ihre Eigenschaften, 2015
Larissa Bauland: Der Satz von Seifert-van Kampen und einige seiner Anwendungen, 2018
Nikolaus Krause: Eine algebraische Einfuehrung in die Milnor-Witt K-Theorie, 2019
Bachelor
Ein Spezialfall des letzten Satzes von Fermat, 2010
Transzendente Zahlen, 2010
Zur Gruppe des Rubik-Wuerfels, 2011
Einige Betrachtungen zum letzten Satz von Fermat, 2012
Die Involution auf algebraischer K-Theorie, 2012
-
Platonische und Archimedische Körper, 2012
Klassifikation regulärer Polyeder, 2013
Grundbegriffe der Trigonometrie und ihrer Umsetzung in der gymnasialen Sekundarstufe I, 2014
Die Riemann’sche Zetafunktion und der Primzahlsatz, 2014
Konstruktion der klassischen Zahlbereiche, 2014
Eigenschaften und spezielle Werte der Riemann'schen Zetafunktion, 2015
Das quadratische Reziprozitätsgesetz und dessen Bedeutung in der Kryptographie, 2015
Graphen färben, 2015
Klassifikation und Visualisierung von Koniken, 2016
Konstruktion von Polygonen mit einem einzigen Schnitt, 2016
Parkettierungen der Ebene durch kongruente konvexe Fuenfecke, 2019
Die klassischen Hopf-Faserbuendel und einige ihrer Eigenschaften, 2019
Einige Anmerkungen mathematischer und historischer Natur zu Fermats Letztem Satz, 2019