Spectral Action Beyond the Weak-Field Approximation

Abstract: The spectral action for a non-compact commutative spectral triple is computed covariantly in a gauge perturbation up to order 2 in full generality. In the ultraviolet regime, p → ∞, the action decays as 1/p 4 in any even dimension.Recent advances [12,14] in explaining some key features of gravity and Standard Model through the spectral action of noncommutative geometry brought this subject to a focus of interest in theoretical physics. In noncommutative geometry, all information is encoded in a spectral triple… Show more

“…Comparing (10) with the stand expansion of g µν used in perturbation theory, g µν = δ µν + √ 16πG N h µν with G N being Newton's constant, identifies the natural scale for Λ as the Planck mass m Pl = (8πG N ) −1/2 (also see [64] for a related discussion). A lengthy but in principle straightforward calculation [31,32,[60][61][62] then yields the expression for the inverse propagators of the physical fields including the full-momentum dependence…”

“…[31,32] and study the properties of the spectral action beyond the framework of effective field theory. More specifically, we construct the generalized spectral dimension D S (T ) [33][34][35] resulting from the spectral action principle and compare our findings with other approaches to quantum gravity.…”

Spectral dimensions from the spectral action

“…Comparing (10) with the stand expansion of g µν used in perturbation theory, g µν = δ µν + √ 16πG N h µν with G N being Newton's constant, identifies the natural scale for Λ as the Planck mass m Pl = (8πG N ) −1/2 (also see [64] for a related discussion). A lengthy but in principle straightforward calculation [31,32,[60][61][62] then yields the expression for the inverse propagators of the physical fields including the full-momentum dependence…”

“…[31,32] and study the properties of the spectral action beyond the framework of effective field theory. More specifically, we construct the generalized spectral dimension D S (T ) [33][34][35] resulting from the spectral action principle and compare our findings with other approaches to quantum gravity.…”

Spectral dimensions from the spectral action

“…Although in the low momentum regime the expansion (2.5) recovers the Standard Model action, the high momentum regime does not contain positive powers of the field derivatives [5,19], exhibiting the structure…”

“…The A i with i ¼ 1; 2; 3 are constants which depend on the details of the function χ, and for typical choices of that function, the three constants are not too different from unity. In the case of the cutoff being the characteristic function of the unit interval, the OðΛ −2 Þ are not present in the asymptotic expansion; however, careful analysis of the situation shows [19] that the anzatz (2.6) coincides with the left-hand side only for momenta smaller than the cutoff Λ.…”

Spectral action with zeta function regularization

“…In noncommutative geometry, the heat trace is the cornerstone of bosonic spectral action computations [9,19,[46][47][48]. The large energies expansion of the latter is based on the asymptotic expansion of the heat trace associated with the relevant Dirac operator.…”

Asymptotic and Exact Expansions of Heat Traces