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 i...
Abstract In this work, we formulate a path-integral optimization for two dimensional conformal field...
The theory describing the scaling properties of quantum field theory is introduced. The symmetry pri...
We study various aspects of scale invariant quantum field theories, in particular, the non-relativis...
Defining complexity in quantum field theory is a difficult task, and the main challenge concerns goi...
We initiate quantitative studies of complexity in (1+1)-dimensional conformal field theories with a ...
We investigate notions of complexity of states in continuous many-body quantum systems. We focus on ...
Based on general and minimal properties of the discrete circuit complexity, we define the complexity...
Abstract Recently it has been shown that the complexity of SU(n) operator is determined by the geode...
Finding pure states in an enlarged Hilbert space that encode the mixed state of a quantum field theo...
We investigate notions of complexity of states in continuous quantum-many body systems. We focus on ...
Abstract We study the evolution of holographic complexity of pure and mixed states in 1 + 1-dimensio...
URL: http://www-spht.cea.fr/articles/t00/189/The question of boundary conditions in conformal field ...
Finding pure states in an enlarged Hilbert space that encode the mixed state of a quantum field theo...
We construct an efficient Monte Carlo algorithm that overcomes the severe signal-to-noise ratio prob...
We investigate and characterize the dynamics of operator growth in irrational two-dimensional confor...
Abstract In this work, we formulate a path-integral optimization for two dimensional conformal field...
The theory describing the scaling properties of quantum field theory is introduced. The symmetry pri...
We study various aspects of scale invariant quantum field theories, in particular, the non-relativis...
Defining complexity in quantum field theory is a difficult task, and the main challenge concerns goi...
We initiate quantitative studies of complexity in (1+1)-dimensional conformal field theories with a ...
We investigate notions of complexity of states in continuous many-body quantum systems. We focus on ...
Based on general and minimal properties of the discrete circuit complexity, we define the complexity...
Abstract Recently it has been shown that the complexity of SU(n) operator is determined by the geode...
Finding pure states in an enlarged Hilbert space that encode the mixed state of a quantum field theo...
We investigate notions of complexity of states in continuous quantum-many body systems. We focus on ...
Abstract We study the evolution of holographic complexity of pure and mixed states in 1 + 1-dimensio...
URL: http://www-spht.cea.fr/articles/t00/189/The question of boundary conditions in conformal field ...
Finding pure states in an enlarged Hilbert space that encode the mixed state of a quantum field theo...
We construct an efficient Monte Carlo algorithm that overcomes the severe signal-to-noise ratio prob...
We investigate and characterize the dynamics of operator growth in irrational two-dimensional confor...
Abstract In this work, we formulate a path-integral optimization for two dimensional conformal field...
The theory describing the scaling properties of quantum field theory is introduced. The symmetry pri...
We study various aspects of scale invariant quantum field theories, in particular, the non-relativis...