RG studies of scalar-field models of long-range interactions

Abstract

In this work we studies the long-range interactions in non-gravitational field theories and their behaviour in the deep infrared. To model such effects, we consider a nonlocal scalar theory obtained by adding a ϕ-1ϕ term to the local action. Using the functional renormalisation group, we analyse its infrared fixed-point structure. Within the LPA, we show that nonlocality modifies phase-transition patterns and can induce symmetry breaking. Extending the LPA beyond polynomial truncations, we examine the convexity property of the effective potential as k→ 0 and find that the flow becomes singular for λ2>0 before reaching the deep infrared. In the LPA' framework, we find that the infrared-stable fixed point is the nonlocal Gaussian fixed point. We then generalise the model to ϕσ/2ϕ and analyse how the infrared properties depend on σ. With appropriate scaling choices, we show that the infrared behaviour remains unchanged up to σ=d/2 and follows Sak's prediction up to σ=2. Finally, we study higher-derivative cases within the LPA, focusing on σ=4, which corresponds to isotropic Lifshitz criticality, and obtain results consistent with earlier work.

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