CLASSICAL VELOCITY IN κ-DEFORMED POINCARÉ ALGEBRA AND A MAXIMUM ACCELERATION
2003 ◽
Vol 18
(07)
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pp. 527-536
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Keyword(s):
We study the commutators of the κ-deformed Poincaré algebra (κPA) in an arbitrary basis. It is known that the two recently studied doubly special relativity theories correspond to different choices of κPA bases. We present another such example. We consider the classical limit of κPA and calculate particle velocity in an arbitrary basis. It has standard properties and its expression takes a simple form in terms of the variables in the Snyder basis. We then study the particle trajectory explicitly for the case of a constant force. Assuming that the spacetime continuum, velocity, acceleration, etc. can be defined only at length scales greater than x min ≠ 0, we show that the acceleration has a finite maximum.
2003 ◽
Vol 18
(01)
◽
pp. 7-18
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2003 ◽
Vol 36
(42)
◽
pp. 10493-10503
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2002 ◽
Vol 539
(1-2)
◽
pp. 126-132
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2005 ◽
Vol 20
(20n21)
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pp. 4925-4940
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2003 ◽
Vol 18
(24)
◽
pp. 1711-1719
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2008 ◽
Vol 660
(3)
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pp. 267-274
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2013 ◽
Vol 23
◽
pp. 373-378
2019 ◽
Vol 2019
(8)
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2013 ◽
Vol 30
(4)
◽
pp. 825-845
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