Abstract We study circuit complexity for free fermionic field theories and Gaussian states. Our definition of circuit complexity is based on the notion of geodesic distance on the Lie group of special orthogonal transformations equipped with a right-invariant metric. After analyzing the differences and similarities to bosonic circuit complexity, we develop a comprehensive mathematical framework to compute circuit complexity between arbitrary fermionic Gaussian states. We apply this framework to the free Dirac field in four dimensions where we compute the circuit complexity of the Dirac ground state with respect to several classes of spatially unentangled reference states. Moreover, we show that our methods can also be applied to compute the...
Abstract Based on general and minimal properties of the discrete circuit complexity, we define the c...
Abstract As a probe of circuit complexity in holographic field theories, we study sub-system analogu...
Abstract Recently it has been shown that the complexity of SU(n) operator is determined by the geode...
Motivated by recent studies of holographic complexity, we examine the question of circuit complexity...
We define and calculate versions of complexity for free fermionic quantum field theories in 1 + 1 an...
Motivated by recent studies of circuit complexity in weakly interacting scalar field theory, we expl...
We investigate notions of complexity of states in continuous many-body quantum systems. We focus on ...
Motivated by recent studies of circuit complexity in weakly interacting scalar field theory, we expl...
Abstract We examine the circuit complexity of coherent states in a free scalar field theory, applyin...
Abstract We consider circuit complexity in certain interacting scalar quantum field theories, mainly...
We investigate notions of complexity of states in continuous quantum-many body systems. We focus on ...
Abstract We propose how to compute the complexity of operators generated by Hamiltonians in quantum ...
Motivated by holographic complexity proposals as novel probes of black hole space-times, we explore ...
Abstract We systematically explore the construction of Nielsen’s circuit complexity to a non-Lorentz...
We study the circuit complexity for mixed bosonic Gaussian states in harmonic lattices in any number...
Abstract Based on general and minimal properties of the discrete circuit complexity, we define the c...
Abstract As a probe of circuit complexity in holographic field theories, we study sub-system analogu...
Abstract Recently it has been shown that the complexity of SU(n) operator is determined by the geode...
Motivated by recent studies of holographic complexity, we examine the question of circuit complexity...
We define and calculate versions of complexity for free fermionic quantum field theories in 1 + 1 an...
Motivated by recent studies of circuit complexity in weakly interacting scalar field theory, we expl...
We investigate notions of complexity of states in continuous many-body quantum systems. We focus on ...
Motivated by recent studies of circuit complexity in weakly interacting scalar field theory, we expl...
Abstract We examine the circuit complexity of coherent states in a free scalar field theory, applyin...
Abstract We consider circuit complexity in certain interacting scalar quantum field theories, mainly...
We investigate notions of complexity of states in continuous quantum-many body systems. We focus on ...
Abstract We propose how to compute the complexity of operators generated by Hamiltonians in quantum ...
Motivated by holographic complexity proposals as novel probes of black hole space-times, we explore ...
Abstract We systematically explore the construction of Nielsen’s circuit complexity to a non-Lorentz...
We study the circuit complexity for mixed bosonic Gaussian states in harmonic lattices in any number...
Abstract Based on general and minimal properties of the discrete circuit complexity, we define the c...
Abstract As a probe of circuit complexity in holographic field theories, we study sub-system analogu...
Abstract Recently it has been shown that the complexity of SU(n) operator is determined by the geode...