BEGIN:VCALENDAR VERSION:2.0 PRODID:-//Institute of Mathematics and Informatics - ECPv6.0.8//NONSGML v1.0//EN CALSCALE:GREGORIAN METHOD:PUBLISH X-WR-CALNAME:Institute of Mathematics and Informatics X-ORIGINAL-URL:https://math.bas.bg X-WR-CALDESC:Събития за Institute of Mathematics and Informatics REFRESH-INTERVAL;VALUE=DURATION:PT1H X-Robots-Tag:noindex X-PUBLISHED-TTL:PT1H BEGIN:VTIMEZONE TZID:Europe/Sofia BEGIN:DAYLIGHT TZOFFSETFROM:+0200 TZOFFSETTO:+0300 TZNAME:EEST DTSTART:20240331T010000 END:DAYLIGHT BEGIN:STANDARD TZOFFSETFROM:+0300 TZOFFSETTO:+0200 TZNAME:EET DTSTART:20241027T010000 END:STANDARD END:VTIMEZONE BEGIN:VEVENT DTSTART;TZID=Europe/Sofia:20240918T140000 DTEND;TZID=Europe/Sofia:20240918T153000 DTSTAMP:20260411T153447 CREATED:20240910T173803Z LAST-MODIFIED:20240911T101734Z UID:16734-1726668000-1726673400@math.bas.bg SUMMARY:Семинар "Математическо моделиране и числен анализ" DESCRIPTION:Поредната сбирка на СЕМИНАРА на секция \n“Математическо моделиране и числен анализ” \nще се състои на  18.09.2024 (сряда)\, от 14:00 часа в зала 478 на Института по математика и информатика. \nДоклад на тема: \nSingular perturbation theory in epidemic modelling\nще изнесе Sara Sottile (University of Bologna\, Italy). \nРезюме: In real world scenarios\, the natural phenomena usually evolve on time scales differing by various orders of magnitude. Such separation in time-scales can be found\, for example\, in the field of chemical oscillations [1]\, neuroscience [2]\, ecology [3] or opinion/information spreading [4]. In this context\, Geometric Singular Perturbation Theory (GSPT) is a powerful analytical technique which fully exploits the underlying time-scale separation. Epidemiological models also provide a natural fit for these dynamics. Consider\, for instance\, models that incorporate information dynamics [5\, 6]\, host-vector interactions [7\, 8]\, or even those that account for immunity loss and reinfection processes\, which occur over extended time scales [9]. This seminar will introduce the fundamental concepts of Geometric Singular Perturbation Theory (GSPT) and explore its applications in epidemiology\, using various tools and techniques to illustrate the range of its potential. \nReferences \n[1] Jelbart\, S.\, Pages\, N.\, Kirk\, V.\, Sneyd\, J.\, Wechselberger\, M. (2022). Process-oriented geometric singular perturbation theory and calcium dynamics. SIAM Journal on Applied Dynamical Systems\, 21(2): 982–1029. \n[2] Desroches\, M.\, Krauskopf\, B.\, Osinga\, H. M. (2008). Mixed-mode oscillations and slow manifolds in the self-coupled FitzHugh-Nagumo system. Chaos: An Interdisci- plinary Journal of Nonlinear Science\, 18(1): 015107. \n[3] Rinaldi\, S.\, Scheffer\, M. (2000). Geometric analysis of ecological models with slow and fast processes. Ecosystems\, 3: 507-521. \n[4] S. Schecter. (2021) Geometric singular perturbation theory analysis of an epidemic model with spontaneous human behavioral change. Journal of Mathematical Biology\, 82(6):1–26. \n[5] Della Marca\, R.\, d’Onofrio\, A.\, Sensi\, M.\, Sottile\, S. (2024). A geometric analysis of the impact of large but finite switching rates on vaccination evolutionary games. Nonlinear Analysis: Real World Applications\, 75: 103986. \n[6] Bulai\, I.M.\, Sensi\, M.\, Sottile\, S. (2024). A geometric analysis of the SIRS compartmental model with fast information and misinformation spreading. Chaos\, Solitons & Fractals\, 185\, 115104. \n[7] Aguiar\, M.\, Kooi\, B. W.\, Pugliese\, A.\, Sensi\, M.\, Stollenwerk\, N. (2021) Time scale separation in the vector borne disease model SIRUV via center manifold analysis. medRxiv \n[8] Rashkov\, P.\, Kooi\, B. W. (2021) Complexity of host-vector dynamics in a two-strain dengue model. Journal of Biological Dynamics\, 15(1)\, 35–72. \n[9] Kaklamanos\, P.\, Pugliese\, A.\, Sensi\, M.\, Sottile\, S. (2024). A geometric analysis of the SIRS model with secondary infections. SIAM Journal on Applied Mathematics\, 84(2). \n  URL:https://math.bas.bg/event/%d1%81%d0%b5%d0%bc%d0%b8%d0%bd%d0%b0%d1%80-%d0%bc%d0%b0%d1%82%d0%b5%d0%bc%d0%b0%d1%82%d0%b8%d1%87%d0%b5%d1%81%d0%ba%d0%be-%d0%bc%d0%be%d0%b4%d0%b5%d0%bb%d0%b8%d1%80%d0%b0%d0%bd%d0%b5-%d0%b8-%d1%87-6/ LOCATION:Институт по математика и информатика – БАН\, Block 8\, 1113 БАН IV км.\, София\, Bulgaria CATEGORIES:Редовен семинар END:VEVENT END:VCALENDAR