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X-WR-CALNAME:Centre for Mathematical Sciences
X-ORIGINAL-URL:https://math-sciences.org
X-WR-CALDESC:Events for Centre for Mathematical Sciences
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TZID:UTC
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TZOFFSETFROM:+0000
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DTSTART:20160101T000000
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BEGIN:VEVENT
DTSTART;TZID=UTC:20160406T130000
DTEND;TZID=UTC:20160406T140000
DTSTAMP:20210620T171619
CREATED:20160404T144729Z
LAST-MODIFIED:20160414T151121Z
UID:1534-1459947600-1459951200@math-sciences.org
SUMMARY:Tom McCourt (Plymouth)
DESCRIPTION:Veblen triple systems\nThe Veblen Axiom (or Veblen-Youngs Axiom) is one of the axioms used to define a projective space. In the case of finite geometries where lines have size three it gives rise to the Projective Steiner triple systems. In turn Steiner triple systems are equivalent to quasigroups that satisfy certain algebraic conditions. Using these equivalences the Veblen axiom can be interpreted as an algebraic condition. In this talk we will consider a generalisation of this algebraic condition\, namely we ‘throw away’ commutativity. In many cases commutativity comes back as a consequence of other conditions\, but not in all cases… \nThis is ongoing work with Terry Griggs.
URL:https://math-sciences.org/event/veblen-triple-systems-tom-mccourt/
LOCATION:Room 205\, 2-5\, Kirkby Place\, Plymouth\, PL4 6DT\, United Kingdom
CATEGORIES:Pure Mathematics,Seminars
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