BEGIN:VCALENDAR VERSION:2.0 PRODID:researchseminars.org CALSCALE:GREGORIAN X-WR-CALNAME:researchseminars.org BEGIN:VEVENT SUMMARY:Sandor Kiss (Institute of Mathematics\, Budapest University of Tec hnology and Economics) DTSTART:20200604T133000Z DTEND:20200604T135500Z DTSTAMP:20260423T011218Z UID:CANT2020/42 DESCRIPTION:Title: Sidon sets and bases\nby Sandor Kiss (Institute of Mathematics\, Bud apest University of Technology and Economics) as part of Combinatorial and additive number theory (CANT 2021)\n\n\nAbstract\nLet $h \\ge 2$ be an in teger.\nWe say a set $A$ of nonnegative integers is an asymptotic basis of order $h$ if every large enough positive integer can be written as a sum of $h$ terms from \n$A$. The set of positive integers $A$ is\ncalled an $h $-Sidon set if the number of representations\nof any positive integer as t he sum\nof $h$ terms from $A$ is bounded by $1$. In this talk I will speak about the existence of $h$-Sidon sets which are asymptotic bases of order $2h+1$. \nThis is a joint work with Csaba Sándor.\n LOCATION:https://researchseminars.org/talk/CANT2020/42/ END:VEVENT END:VCALENDAR