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DTSTART:20230312T070000
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DTSTART:20231105T060000
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UID:69facde9a15ea
DTSTART;TZID=America/Toronto:20240213T143000
SEQUENCE:0
TRANSP:TRANSPARENT
DTEND;TZID=America/Toronto:20240213T153000
URL:https://uwaterloo.ca/pure-mathematics/events/differential-geometry-work
 ing-seminar-94
SUMMARY:Differential Geometry Working Seminar
CLASS:PUBLIC
DESCRIPTION:TIMOTHY PONEPAL\, WILFRID LAURIER UNIVERSITY\n\n\"THE FLOW OF T
 HE HORIZONTAL LIFT OF A VECTOR FIELD\"\n\nLet $E$ be a vector bundle over 
 a manifold $M$\, and let $\\nabla$ be a\nconnection on $E$. Given a vector
  field $X$ on $M$\, the connection\ndetermines its horizontal lift $X^h$\,
  which is a vector field on the\ntotal space of $E$. We will show that the
  flow of $X^h$ is related to\nparallel transport with respect to $\\nabla$
 . If time permits\, we will\nshow that in the special case when $E$ is a r
 ank 3 oriented real\nvector bundle with fibre metric\, the flow of $X^h$ p
 reserves the cross\nproduct on the fibres.\n\nMC 5403
DTSTAMP:20260506T051313Z
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