Early efforts to understand complexity in field theory have primarily employed a geometric approach based on the concept of circuit complexity in quantum information theory. In a parallel vein, it has been proposed that certain deformations of the Euclidean path integral that prepares a given operator or state may provide an alternative definition, whose connection to the standard notion of complexity is less apparent. In this letter, we bridge the gap between these two proposals in two-dimensional conformal field theories, by explicitly showing how the latter approach from path integral optimization may be given a concrete realization within the standard gate counting framework. In particular, we show that when the background geometry is d...
In this paper, we analyze the circuit complexity for preparing ground states of quantum many-body sy...
Abstract Motivated by recent studies of holographic complexity, we examine the question of circuit c...
We investigate notions of complexity of states in continuous quantum-many body systems. We focus on ...
Early efforts to understand complexity in field theory have primarily employed a geometric approach ...
We discuss the interpretation of path integral optimization as a uniformization problem in even dime...
Quantum circuit complexity has played a central role in recent advances in holography and many-body ...
Abstract In this work, we formulate a path-integral optimization for two dimensional conformal field...
Abstract We study the conditions under which, given a generic quantum system, complexity metrics pro...
Abstract Using the path integral associated to a cMERA tensor network, we provide an operational def...
We introduce a new optimization procedure for Euclidean path integrals, which compute wave functiona...
In this work, we formulate a path-integral optimization for two dimensional conformal field theories...
Holographic complexity proposals have sparked interest in quantifying the cost of state preparation ...
Abstract We propose an optimization procedure for Euclidean path-integrals that evaluate CFT wave fu...
We propose that finite cutoff regions of holographic spacetimes represent quantum circuits that map ...
We initiate quantitative studies of complexity in (1+1)-dimensional conformal field theories with a ...
In this paper, we analyze the circuit complexity for preparing ground states of quantum many-body sy...
Abstract Motivated by recent studies of holographic complexity, we examine the question of circuit c...
We investigate notions of complexity of states in continuous quantum-many body systems. We focus on ...
Early efforts to understand complexity in field theory have primarily employed a geometric approach ...
We discuss the interpretation of path integral optimization as a uniformization problem in even dime...
Quantum circuit complexity has played a central role in recent advances in holography and many-body ...
Abstract In this work, we formulate a path-integral optimization for two dimensional conformal field...
Abstract We study the conditions under which, given a generic quantum system, complexity metrics pro...
Abstract Using the path integral associated to a cMERA tensor network, we provide an operational def...
We introduce a new optimization procedure for Euclidean path integrals, which compute wave functiona...
In this work, we formulate a path-integral optimization for two dimensional conformal field theories...
Holographic complexity proposals have sparked interest in quantifying the cost of state preparation ...
Abstract We propose an optimization procedure for Euclidean path-integrals that evaluate CFT wave fu...
We propose that finite cutoff regions of holographic spacetimes represent quantum circuits that map ...
We initiate quantitative studies of complexity in (1+1)-dimensional conformal field theories with a ...
In this paper, we analyze the circuit complexity for preparing ground states of quantum many-body sy...
Abstract Motivated by recent studies of holographic complexity, we examine the question of circuit c...
We investigate notions of complexity of states in continuous quantum-many body systems. We focus on ...