Based on general and minimal properties of the discrete circuit complexity, we define the complexity in continuous systems in a geometrical way. We first show that the Finsler metric naturally emerges in the geometry of the complexity in continuous systems. Due to fundamental symmetries of quantum field theories, the Finsler metric is more constrained and consequently, the complexity of SU(n) operators is uniquely determined as a length of a geodesic in the Finsler geometry. Our Finsler metric is bi-invariant contrary to the right-invariance of discrete qubit systems. We clarify why the bi-invariance is relevant in quantum field theoretic systems. After comparing our results with discrete qubit systems we show most results in k-local right-...
We apply the recently developed notion of complexity for field theory to a quantum quench through th...
We apply the recently developed notion of complexity for field theory to a quantum quench through a ...
We address the difference between integrable and chaotic motion in quantum theory as manifested by t...
Abstract Based on general and minimal properties of the discrete circuit complexity, we define the c...
Abstract Recently it has been shown that the complexity of SU(n) operator is determined by the geode...
We investigate notions of complexity of states in continuous many-body quantum systems. We focus on ...
Motivated by recent studies of holographic complexity, we examine the question of circuit complexity...
Abstract We study the conditions under which, given a generic quantum system, complexity metrics pro...
Abstract We propose how to compute the complexity of operators generated by Hamiltonians in quantum ...
We initiate quantitative studies of complexity in (1+1)-dimensional conformal field theories with a ...
Abstract Using the path integral associated to a cMERA tensor network, we provide an operational def...
As a new step towards defining complexity for quantum field theories, we map Nielsen operator comple...
We investigate notions of complexity of states in continuous quantum-many body systems. We focus on ...
Defining complexity in quantum field theory is a difficult task, and the main challenge concerns goi...
Abstract We compute the time-dependent complexity of the thermofield double states by four different...
We apply the recently developed notion of complexity for field theory to a quantum quench through th...
We apply the recently developed notion of complexity for field theory to a quantum quench through a ...
We address the difference between integrable and chaotic motion in quantum theory as manifested by t...
Abstract Based on general and minimal properties of the discrete circuit complexity, we define the c...
Abstract Recently it has been shown that the complexity of SU(n) operator is determined by the geode...
We investigate notions of complexity of states in continuous many-body quantum systems. We focus on ...
Motivated by recent studies of holographic complexity, we examine the question of circuit complexity...
Abstract We study the conditions under which, given a generic quantum system, complexity metrics pro...
Abstract We propose how to compute the complexity of operators generated by Hamiltonians in quantum ...
We initiate quantitative studies of complexity in (1+1)-dimensional conformal field theories with a ...
Abstract Using the path integral associated to a cMERA tensor network, we provide an operational def...
As a new step towards defining complexity for quantum field theories, we map Nielsen operator comple...
We investigate notions of complexity of states in continuous quantum-many body systems. We focus on ...
Defining complexity in quantum field theory is a difficult task, and the main challenge concerns goi...
Abstract We compute the time-dependent complexity of the thermofield double states by four different...
We apply the recently developed notion of complexity for field theory to a quantum quench through th...
We apply the recently developed notion of complexity for field theory to a quantum quench through a ...
We address the difference between integrable and chaotic motion in quantum theory as manifested by t...