Peter Schupp scite author profile

A deformation of the algebra of diffeomorphisms is constructed for canonically deformed spaces with constant deformation parameter θ. The algebraic relations remain the same, whereas the comultiplication rule (Leibniz rule) is different from the undeformed one. Based on this deformed algebra a covariant tensor calculus is constructed and all the concepts like metric, covariant derivatives, curvature and torsion can be defined on the deformed space as well. The construction of these geometric quantities is presented in detail. This leads to an action invariant under the deformed diffeomorphism algebra and can be interpreted as a θ-deformed Einstein-Hilbert action. The metric or the vierbein field will be the dynamical variable as they are in the undeformed theory. The action and all relevant quantities are expanded up to second order in θ.

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Gauge theory on noncommutative spaces

Madore

Schraml

Schupp³

et al. 2000

Eur. Phys. J. C

541

815

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The standard model on non-commutative space-time

Calmet¹,

Jurčo²,

Schupp³

et al. 2002

Eur. Phys. J. C

320

565

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We consider the Standard Model on a non-commutative space and expand the action in the non-commutativity parameter θ µν . No new particles are introduced, the structure group is SU (3) × SU (2) × U (1). We derive the leading order action. At zeroth order the action coincides with the ordinary Standard Model. At leading order in θ µν we find new vertices which are absent in the Standard Model on commutative space-time. The most striking features are couplings between quarks, gluons and electroweak bosons and many new vertices in the charged and neutral currents. We find that parity is violated in non-commutative QCD. The Higgs mechanism can be applied. QED is not deformed in the minimal version of the NCSM to the order considered.

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Construction of non-Abelian gauge theories on noncommutative spaces

Jurčo¹,

Möller²,

Schraml³

et al. 2001

Eur. Phys. J. C

340

534

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We present a formalism to explicitly construct non-Abelian gauge theories on noncommutative spaces (induced via a star product with a constant Poisson tensor) from a consistency relation. This results in an expansion of the gauge parameter, the noncommutative gauge potential and fields in the fundamental representation, in powers of a parameter of the noncommutativity. This allows the explicit construction of actions for these gauge theories.

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Enveloping algebra-valued gauge transformations for non-abelian gauge groups on non-commutative spaces

Jurčo

Schraml

Schupp³

et al. 2000

Eur. Phys. J. C

269

347

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Peter Schupp

A gravity theory on noncommutative spaces

Gauge theory on noncommutative spaces

The standard model on non-commutative space-time

Construction of non-Abelian gauge theories on noncommutative spaces

Enveloping algebra-valued gauge transformations for non-abelian gauge groups on non-commutative spaces

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