Wilson action for the O(N) model

Abstract: In this paper the fixed-point Wilson action for the critical O(N ) model in D = 4 − ǫ dimensions is written down in the ǫ expansion to order ǫ 2 . It is obtained by solving the fixed-point Polchinski Exact Renormalization Group equation (with anomalous dimension) in powers of ǫ. This is an example of a theory that has scale and conformal invariance despite having a finite UV cutoff. The energy-momentum tensor for this theory is also constructed (at zero momentum) to order ǫ 2 . This is done by solving the Ward… Show more

“…By setting D = 4 − and solving the fixed point condition Eq. (2.24) of the WP equation with the expansion [56], we get the action S * WF at the WF fixed point up to O( ) as…”

“…As was seen in Section 2.2, the asymptotic behavior of λ(τ ) at the large flow time is controlled by the signature of the quantity D − 2 + η. The anomalous dimension η can be explicitly calculated with the expansion at this fixed point [56] and is given to…”

“…Let us see the relationship between the signature of D − 2 + η and the cluster decomposition principle concretely from the two-point function of the WF fixed point action. According to [56], the connected two-point function of φ a is given to O 2 by…”

Fixed Point Structure of Gradient Flow Exact Renormalization Group for Scalar Field Theories

“…By setting D = 4 − and solving the fixed point condition Eq. (2.24) of the WP equation with the expansion [56], we get the action S * WF at the WF fixed point up to O( ) as…”

“…As was seen in Section 2.2, the asymptotic behavior of λ(τ ) at the large flow time is controlled by the signature of the quantity D − 2 + η. The anomalous dimension η can be explicitly calculated with the expansion at this fixed point [56] and is given to…”

“…Let us see the relationship between the signature of D − 2 + η and the cluster decomposition principle concretely from the two-point function of the WF fixed point action. According to [56], the connected two-point function of φ a is given to O 2 by…”

Fixed Point Structure of Gradient Flow Exact Renormalization Group for Scalar Field Theories

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Recently a conformally invariant action describing the Wilson-Fischer fixed point in D = 4−ǫ dimensions in the presence of a finite UV cutoff was constructed [41]. In the present paper we construct two composite operator perturbations of this action with definite scaling dimension also in the presence of a finite cutoff.Thus the operator (as well as the fixed point action) is well defined at all momenta 0 ≤ p ≤ ∞ and at low energies they reduce tox φ 2 and x φ 4 respectively.

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“…Recently a conformally invariant action describing the Wilson-Fischer fixed point in D = 4−ǫ dimensions in the presence of a finite UV cutoff was constructed [41]. In the present paper we construct two composite operator perturbations of this action with definite scaling dimension also in the presence of a finite cutoff.…”

Finite Cutoff CFT's and Composite Operators

Gradient Flow Exact Renormalization Group for Scalar Quantum Electrodynamics