Spinning Conformal Correlators (1107.3554v3)

Abstract: We develop the embedding formalism for conformal field theories, aimed at doing computations with symmetric traceless operators of arbitrary spin. We use an index-free notation where tensors are encoded by polynomials in auxiliary polarization vectors. The efficiency of the formalism is demonstrated by computing the tensor structures allowed in n-point conformal correlation functions of tensors operators. Constraints due to tensor conservation also take a simple form in this formalism. Finally, we obtain a perfect match between the number of independent tensor structures of conformal correlators in d dimensions and the number of independent structures in scattering amplitudes of spinning particles in (d+1)-dimensional Minkowski space.

• The paper introduces an embedding formalism to simplify conformal computations for arbitrary-spin tensor operators.
• It details the derivation of independent tensor structures for multi-point correlators under conformal symmetry.
• The study reveals a correspondence between CFT tensor correlators and Minkowski scattering amplitudes, bridging two key areas in physics.

Spinning Conformal Correlators: An Analytical Approach to CFTs with Tensor Operators

The paper "Spinning Conformal Correlators" by Miguel S. Costa, João Penedones, David Poland, and Slava Rychkov presents an advanced analytical framework for dealing with conformal field theories (CFTs) that involve symmetric traceless tensor operators of arbitrary spin. This research introduces and employs an embedding formalism to streamline computations beyond the scalar operator field and extends its analysis to correlators of spinning particles, focusing on both conserved and non-conserved tensor fields.

Key Contributions and Results

The notable contributions of this paper lie in the formal development and application of the embedding space technique to symmetric traceless tensor operators in CFT. This formalism simplifies the complex nature of conformal computations by mapping them into an index-free, polynomial representation, thus reducing the computational overhead traditionally associated with tensor fields in CFT.

• Embedding Formalism for Tensor Operators: The authors provide a formalism where tensor operators in d-dimensional Euclidean space are reinterpreted in (d+2)-dimensional embedding space, converting the problem into a Lorentz invariant form. This approach allows for a more straightforward derivation of conformal constraints and properties for n-point functions, particularly through the use of polynomial encoding.
• Tensor Correlation Functions: The paper methodically computes the tensor structures allowed in two-point, three-point, and n-point conformal correlation functions, leveraging the embedding formalism. Particularly, the authors rigorously derive the number of independent tensor structures in various scenarios and reconcile these with known constraints due to conformal symmetry and conservation laws.
• Matching with Scattering Amplitudes: A remarkable result is the identification of a perfect correlation between the number of independent tensor structures in d-dimensional conformal correlators and that found in scattering amplitudes of spinning particles in (d + 1)-dimensional Minkowski space. This connection provides a synthetic bridge between the world of conformal correlators and particle physics, potentially guiding further exploration in AdS/CFT duality.

Impact and Future Implications

The advancements presented are significant from both a theoretical and practical perspective. The embedding space formalism notably enhances the tractability of CFT computations involving complex tensor operators.

Theoretical Implications

The paper lays a foundation for furthering the conformal bootstrap approach to leverage operator product expansions (OPE) across different operator types, such as stress-energy tensors or global symmetry currents. This work positions tensor operators within a framework that could reveal new general constraints applicable to any CFT with specified global symmetries.

Practical Implications

From a practical standpoint, the methodology enables efficient and automated calculations for high-spin fields, which are pivotal in a variety of physical models and hypothesis testing within the scope of theoretical physics. Furthermore, the alignment with Minkowski space scattering amplitudes suggests novel synergies between conformal theories and scattering processes, potentially impacting particle physics and quantum field theory (QFT) research trajectories.

Speculations on Future Developments

One could speculate about the extension of this framework to incorporate more complex fields such as those with mixed symmetry or incorporate the formalism into the Mellin space, which has shown parallels to scattering amplitudes. Additionally, exploration into the implications of this work for quantum gravity and string theory, particularly under the AdS/CFT correspondence, offers a promising avenue of exploration.

Overall, "Spinning Conformal Correlators" anchors a methodological shift in the handling of tensor operators in CFTs, bringing forth a significant leap in our capacity to unravel the intricacies of higher dimensional quantum field theories. This research lays an insightful, albeit rigorous, framework that could expedite advancements across multiple facets of theoretical physics, subject to further refinements and interdisciplinary applications.