SEMINARS
2014/15 Seminar Talks
Ana Anušić:
- Plane embeddings of inverse limit spaces of tent maps, Topološki seminar Ljubljana-Maribor-Zagreb, Faculty of Mathematics and Physics, University of Ljubljana, Ljubljana, Slovenia, 23. 05. 2015.
- Arc-components of inverse limits of tent maps, Arbeitsgemeinschaft Ergodentheorie, Faculty of Mathematics, University of Vienna, Vienna, Austria, 06. 10. 2014.
Davor Dragičević:
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Neuniformna hiperboličnost i dopustivost, Seminar za diferencijalne jednadžbe i nelinearnu analizu, Faculty of Electrical Engineering and Computing, University of Zagreb, Zagreb, Croatia, 6. 3. 2015.
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Neuniformno hiperbolične dihotomije i dopustivost, Kolokvij DMF-a, University of Rijeka, Rijeka, Croatia, 30. 01. 2014.
Maja Resman:
- є-neighborhoods of orbits and cohomological equations, Seminaire Géométrie et Systèmes
Dynamiques, Institut de Mathématiques, Université de Bourgogne, Dijon, France, May 2014.
Sonja Štimac:
- Horseshoe-like maps and symbolic dynamics III, Indiana University - Purdue University Indianapolis, Indianapolis, IN, US, 25. 09. 2014.
- Horseshoe-like maps and symbolic dynamics II , Indiana University - Purdue University Indianapolis, Indianapolis, IN, US, 18. 09. 2014.
- Horseshoe-like maps and symbolic dynamics I, Indiana University - Purdue University Indianapolis, Indianapolis, IN, US, 04. 09. 2014.
Vesna Županović:
- Fractal analysis of oscillatory integrals, Seminaire Géométrie et Systèmes Dynamiques, Institut de Mathématiques, Université de Bourgogne, Dijon, France, 13. 05. 2014.
15 May 2015, FER
Andrej Novak (ZESOI, FER): Kinetički pristup u numeričkom rješavanju heterogenih zakona sačuvanja / Kinetic approach in numerical solving of heterogeneous convervation laws
Sažetak (Abstract). Prilikom modeliranja prirodnih fenomena često je prvi korak donošenje zaključaka o očuvanju nekih veličina. Osim u primjeni, skalarni zakoni sačuvanja su veliki matematički izazov zbog nejedinstvenosti slabog rješenja i gubitka regularnosti. U izlaganju motivirat ćemo osnove entropijske teorije za skalarne zakone sačuvanja $u_t + f(u)_x = 0$, a u nastavku predstaviti ideje za razvoj nove numeričke sheme za heterogeni zakon sačuvanja $u_t + f(t,x,u)_x = 0$ temeljen na kinetičkoj formulaciji.