On path integration on noncommutative geometries
Volume 40 / 1997
Banach Center Publications 40 (1997), 379-386
DOI: 10.4064/-40-1-379-386
Abstract
We discuss a recent approach to quantum field theoretical path integration on noncommutative geometries which imply UV/IR regularising finite minimal uncertainties in positions and/or momenta. One class of such noncommutative geometries arise as `momentum spaces' over curved spaces, for which we can now give the full set of commutation relations in coordinate free form, based on the Synge world function.