BEGIN:VCALENDAR VERSION:2.0 PRODID:-//Date iCal//NONSGML kigkonsult.se iCalcreator 2.20.2// METHOD:PUBLISH X-WR-CALNAME;VALUE=TEXT:Eventi DIAG BEGIN:VTIMEZONE TZID:Europe/Paris BEGIN:STANDARD DTSTART:20161030T030000 TZOFFSETFROM:+0200 TZOFFSETTO:+0100 TZNAME:CET END:STANDARD BEGIN:DAYLIGHT DTSTART:20160327T020000 TZOFFSETFROM:+0100 TZOFFSETTO:+0200 TZNAME:CEST END:DAYLIGHT END:VTIMEZONE BEGIN:VEVENT UID:calendar.7343.field_data.0@www.u-gov-ricerca.uniroma1.it DTSTAMP:20260412T083341Z CREATED:20160711T123835Z DESCRIPTION:From 14:00 to 14:25:TITLE: Equilibria for semi-infinite program mingSPEAKER: Giancarlo Bigi (Dipartimento di Informatica\, Università di P isa)ABSTRACT: Bilevel optimization\, noncooperative games and semi-infinit e programming share some similarities\, which may lead to meaningful conne ctions. Indeed\, theoretical developments and algorithms developed for one of these models could be exploited to cope with the others. In this talk we focus on the relationships between generalized Nash games and semi-infi nite programming. In particular\, we show how generalized Nash games can b e exploited to solve semi-infinite programs with convex-concave constraint s\, relying on penalization techniques and a sequence of suitable saddlepo int problems.From 14:30 to 14:55:TITLE: A bridge between bilevel programs and Nash gamesSPEAKER: Lorenzo Lampariello (Dipartimento di Studi Aziendal i\, Università degli Studi Roma Tre)ABSTRACT: We study connections between bilevel programming problems and Generalized Nash Equilibrium Problems (G NEP). We provide a complete analysis of the relationship between the verti cal bilevel problem and the corresponding horizontal one-level GNEP. We de fine classes of problems for which solutions of the bilevel program can be computed by finding equilibria of the GNEP. Our study provides the theore tical backbone and the main ideas uderlying some useful novel algorithmic developments.From 15:00 to 15:25:TITLE: A single-level approach to multi-l eader-follower gamesSPEAKER: Simone Sagratella (Dipartimento di Ingegneria Informatica Automatica Gestionale\, Sapienza Università di Roma)ABSTRACT: Multi-Leader Common-Follower games (MLCF) are a powerful modelling tool t o study complex bilevel systems arising for example in electricity markets . Leveraging the optimal value approach\, we introduce a Generalized Nash Equilibrium Problem (GNEP) model based on the first order approximation of follower’s value function. This single-level GNEP is closely related to t he original MLCF. We show that any KKT point of (a suitably perturbed vers ion of the) former problem is critical for (an approximate) MLCF. Moreover \, we define wide classes of problems for which the vice-versa holds as we ll. DTSTART;TZID=Europe/Paris:20160712T140000 DTEND;TZID=Europe/Paris:20160712T140000 LAST-MODIFIED:20190805T155749Z LOCATION:Aula A5 DIAG-Sapienza\, Via Ariosto 25\, Roma SUMMARY:Bilevel Programs and Nash games - Giancarlo Bigi\, Lorenzo Lamparie llo\, Simone Sagratella URL;TYPE=URI:http://www.u-gov-ricerca.uniroma1.it/node/7343 END:VEVENT END:VCALENDAR