Towards new relativistic doubly -deformed D=4 quantum phase spaces
Abstract
We propose new noncommutative models of quantum phase spaces, containing a pair of -deformed Poincar\'e algebras, with two independent double (,)-deformations in space-time and four-momenta sectors. The first such quantum phase space can be obtained by contractions M,R ∞ of recently introduced doubly -deformed (,)-Yang models, with the parameters M,R describing inverse space-time and four-momenta curvatures and constant four-vectors aμ, bμ determining nine types of (,)-deformations. The second considered model is provided by the nonlinear doubly -deformed TSR algebra spanned by 14 coset o(1,5)/ o(2) generators. The basic algebraic difference between the two models is the following: the first one, described by o(1,5) Lie algebra can be supplemented by the Hopf algebra structure, while the second model contains the quantum phase space commutators [xμ,q], with the standard numerical iημ term; therefore it describes the quantum-deformed Heisenberg algebra relations which cannot be equipped with the Hopf algebra.
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