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DTSTART:20190331T010000
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DTSTART:20191027T010000
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DTSTART;TZID=Europe/Sofia:20190904T161500
DTEND;TZID=Europe/Sofia:20190904T180000
DTSTAMP:20260510T215038
CREATED:20190820T164633Z
LAST-MODIFIED:20190820T165017Z
UID:7315-1567613700-1567620000@math.bas.bg
SUMMARY:Национален колоквиум по математика
DESCRIPTION:СЪЮЗ НА МАТЕМАТИЦИТЕ В БЪЛГАРИЯ\nИНСТИТУТ ПО МАТЕМАТИКА И ИНФОРМАТИКА – БАН \n\nНАЦИОНАЛЕН КОЛОКВИУМ ПО МАТЕМАТИКА \nПоредната сбирка на Колоквиума ще се състои на 4 септември 2019 г. (сряда) от 16:15 часа в Заседателната зала на ИМИ-БАН\, София\, ул. „Акад. Г. Бончев”\, блок 8. \nДоклад на тема: \nThe Squeezing Function\nще изнесе Prof. John Erik Fornæss\, Norwegian Academy of Science and Letters\, Norwegian University of Science and Technology\, Trondheim.. \nПоканват се всички интересуващи се. \nРъководител на Колоквиума: акад. П. Попиванов \nРезюме. In complex analysis the most important domain is the unit disc. In fact all domains (at least simply connected and bounded) are biholomorphic\, i.e. analytically equivalent\, to the disc.\nIn higher dimension\, the natural analogue is the unit ball. But in higher dimension\, the general domain is not biholomorphic to the ball. A basic question is then how well a general domain can be approximated by the ball. If we have a ball 𝔹𝑟 of radius 𝑟<1 contained in the unit ball 𝔹1\, then a domain 𝑈 with 𝔹𝑟 contained in 𝑈 contained in 𝔹1 is said to be squeezed between the two balls. The larger we can choose 𝑟 the closer the domain 𝑈 is to the ball.
URL:https://math.bas.bg/event/%d0%bd%d0%b0%d1%86%d0%b8%d0%be%d0%bd%d0%b0%d0%bb%d0%b5%d0%bd-%d0%ba%d0%be%d0%bb%d0%be%d0%ba%d0%b2%d0%b8%d1%83%d0%bc-%d0%bf%d0%be-%d0%bc%d0%b0%d1%82%d0%b5%d0%bc%d0%b0%d1%82%d0%b8%d0%ba%d0%b0-10/
LOCATION:Институт по математика и информатика – БАН\, Block 8\, 1113 БАН IV км.\, София\, Bulgaria
CATEGORIES:Редовен семинар
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