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X-WR-CALNAME:Discrete Mathematics Group
X-ORIGINAL-URL:https://dimag.ibs.re.kr
X-WR-CALDESC:Events for Discrete Mathematics Group
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TZID:Asia/Seoul
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DTSTART:20200101T000000
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BEGIN:VEVENT
DTSTART;TZID=Asia/Seoul:20210714T170000
DTEND;TZID=Asia/Seoul:20210714T180000
DTSTAMP:20260420T041833
CREATED:20210615T091821Z
LAST-MODIFIED:20240705T184018Z
UID:4257-1626282000-1626285600@dimag.ibs.re.kr
SUMMARY:Stefan Weltge\, Integer programs with bounded subdeterminants and two nonzeros per row
DESCRIPTION:We give a strongly polynomial-time algorithm for integer linear programs defined by integer coefficient matrices whose subdeterminants are bounded by a constant and that contain at most two nonzero entries in each row. The core of our approach is the first polynomial-time algorithm for the weighted stable set problem on graphs that do not contain more than k vertex-disjoint odd cycles\, where k is any constant. Previously\, polynomial-time algorithms were only known for k=0 (bipartite graphs) and for k=1. \nWe observe that integer linear programs defined by coefficient matrices with bounded subdeterminants and two nonzeros per column can be also solved in strongly polynomial-time\, using a reduction to b-matching. \nThis is joint work with Samuel Fiorini\, Gwenaël Joret\, and Yelena Yuditsky.
URL:https://dimag.ibs.re.kr/event/2021-07-14/
LOCATION:Room B232\, IBS (기초과학연구원)
CATEGORIES:Virtual Discrete Math Colloquium
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BEGIN:VEVENT
DTSTART;TZID=Asia/Seoul:20210728T150000
DTEND;TZID=Asia/Seoul:20210728T160000
DTSTAMP:20260420T041833
CREATED:20210607T135955Z
LAST-MODIFIED:20240705T184022Z
UID:4228-1627484400-1627488000@dimag.ibs.re.kr
SUMMARY:Maria Chudnovsky\, Induced subgraphs and tree decompositions
DESCRIPTION:Tree decompositions are a powerful tool in structural graph theory; they are traditionally used in the context of forbidden graph minors. Connecting tree decompositions and forbidden induced subgraphs has until recently remained out of reach. \nTree decompositions are closely related to the existence of  “laminar collections of separations” in a graph\, which roughly means that the separations in the collection “cooperate” with each other\, and the pieces that are obtained when the graph is simultaneously decomposed by all the separations in the collection “line up” to form a tree structure. Such collections of separations come up naturally in the context of forbidden minors. \nIn the case of families where induced subgraphs are excluded\, while there are often natural separations\, they are  usually very far from forming a laminar collection. In what follows we mostly focus on families of graphs of bounded degree. It turns out that due to the bound on the degree\, these collections of natural separations can be partitioned into a bounded number of laminar collections. This in turn allows to us obtain a wide variety of structural and algorithmic results\, which we will survey in this talk.
URL:https://dimag.ibs.re.kr/event/2021-07-28/
LOCATION:Zoom ID: 869 4632 6610 (ibsdimag)
CATEGORIES:Virtual Discrete Math Colloquium
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