2015
DOI: 10.1007/jhep08(2015)113
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A proper fixed functional for four-dimensional Quantum Einstein Gravity

Abstract: Realizing a quantum theory for gravity based on Asymptotic Safety hinges on the existence of a non-Gaussian fixed point of the theory's renormalization group flow. In this work, we use the functional renormalization group equation for the effective average action to study the fixed point underlying Quantum Einstein Gravity at the functional level including an infinite number of scale-dependent coupling constants. We formulate a list of guiding principles underlying the construction of a partial differential eq… Show more

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Cited by 103 publications
(143 citation statements)
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References 117 publications
(196 reference statements)
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“…On the other hand, no ghosts are present in [22]. In spite of these differences, the equation of [22] was shown in [23] to have a global scaling solution whose general shape is quite similar to ours. The equation for unimodular gravity has only been analyzed at polynomial level so far.…”
Section: Discussionsupporting
confidence: 65%
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“…On the other hand, no ghosts are present in [22]. In spite of these differences, the equation of [22] was shown in [23] to have a global scaling solution whose general shape is quite similar to ours. The equation for unimodular gravity has only been analyzed at polynomial level so far.…”
Section: Discussionsupporting
confidence: 65%
“…In the Hessian on the four-sphere (2.11), the operator = −∇ 2 appears everywhere and is a natural choice. However, in order to gain some additional freedom, we follow [22,23] and add to terms proportional to the scalar curvature, with coefficients −α, −γ , and −β for spin two, one, and zero, respectively. These parameters should not be confused with the gauge fixing parameters which do not appear in the following.…”
Section: Cutoff and Functional Renormalization Group Equationmentioning
confidence: 99%
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“…However this is also an area where there is little guidance from current experimental observation or other techniques, and therefore one must place particular reliance on a rigorous understanding of the mathematical structure that the exact RG exposes, in so far as this is possible. This is especially so with recent work on "functional truncations" [17][18][19][20][21][22][23][24][25][26][27][28][29][30][31][32][33][34][35][36].…”
Section: Introductionmentioning
confidence: 99%