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Conformal field theory complexity from Euler-Arnold equations

Mario Flory, Michal P. Heller

2020Journal of High Energy Physics51 citationsDOIOpen Access PDF

Abstract

Defining complexity in quantum field theory is a difficult task, and the main challenge concerns going beyond free models and associated Gaussian states and operations. One take on this issue is to consider conformal field theories in 1+1 dimensions and our work is a comprehensive study of state and operator complexity in the universal sector of their energy-momentum tensor. The unifying conceptual ideas are Euler-Arnold equations and their integro-differential generalization, which guarantee well-posedness of the optimization problem between two generic states or transformations of interest. The present work provides an in-depth discussion of the results reported in arXiv:2005.02415 and techniques used in their derivation. Among the most important topics we cover are usage of differential regularization, solution of the integro-differential equation describing Fubini-Study state complexity and probing the underlying geometry.

Topics & Concepts

PhysicsConformal field theoryQuantum field theoryTheoretical physicsOperator (biology)Field (mathematics)Conformal mapWork (physics)Boundary conformal field theoryOperator product expansionState (computer science)Cover (algebra)GaussianPrimary fieldOperator algebraConformal symmetryDifferential equationApplied mathematicsAlgebra over a fieldStatistical physicsMathematical physicsBlack Holes and Theoretical PhysicsAlgebraic structures and combinatorial modelsQuantum many-body systems
Conformal field theory complexity from Euler-Arnold equations | Litcius