Add to ORKGWe extend the concept of dual unitary quantum gates to quantum lattice models in $2 + 1$ dimensions, by introducing and studying ternary unitary four-particle gates, which are unitary in time and both spatial dimensions. When used as building blocks of lattice models with periodic boundary conditions in time and space (corresponding to infinite temperature states), dynamical correlation functions exhibit a light-ray structure. We also generalize solvable MPS to two spatial dimensions with cylindrical boundary conditions, by showing that the analogous solvable PEPS can be identified with matrix product unitaries. In the resulting tensor network for evaluating equal-time correlation functions, the bulk ternary unitary gates cancel out. We del...
A systematic approach to dualities in symmetric (1+1)d quantum lattice models has recently been prop...
We consider the class of dual-unitary quantum circuits in 1 + 1 dimensions and introduce a notion of...
A central question in Quantum Computing is how matrices in $SU(2)$ can be approximated by products o...
Quantum dynamics with local interactions in lattice models display rich physics, but is notoriously ...
Random quantum circuits continue to inspire a wide range of applications in quantum information scie...
We study the unitary time evolution of the entanglement Hamiltonian of a free Fermi lattice gas in o...
We consider a class of quantum lattice models in 1 + 1 dimensions represented as local quantum circu...
A global quantum quench can be modeled by a quantum circuit with local unitary gates. In general, en...
We introduce a hybrid quantum-classical variational algorithm to simulate ground-state phase diagram...
We demonstrate the applicability of a universal gate set in the parity encoding, which is a dual to ...
We introduce a spacetime discretization of the Dirac equation that has the form of a quantum automat...
Quantum computers offer the possibility to implement lattice gauge theory in Minkowski rather than E...
We show that the integrable Lindblad superoperators found recently can be used to build integrable n...
We propose a general exact method of calculating dynamical correlation functions in dual symplectic ...
We study unitary evolution of bipartite entanglement in a circuit with nearest-neighbor random gates...
A systematic approach to dualities in symmetric (1+1)d quantum lattice models has recently been prop...
We consider the class of dual-unitary quantum circuits in 1 + 1 dimensions and introduce a notion of...
A central question in Quantum Computing is how matrices in $SU(2)$ can be approximated by products o...
Quantum dynamics with local interactions in lattice models display rich physics, but is notoriously ...
Random quantum circuits continue to inspire a wide range of applications in quantum information scie...
We study the unitary time evolution of the entanglement Hamiltonian of a free Fermi lattice gas in o...
We consider a class of quantum lattice models in 1 + 1 dimensions represented as local quantum circu...
A global quantum quench can be modeled by a quantum circuit with local unitary gates. In general, en...
We introduce a hybrid quantum-classical variational algorithm to simulate ground-state phase diagram...
We demonstrate the applicability of a universal gate set in the parity encoding, which is a dual to ...
We introduce a spacetime discretization of the Dirac equation that has the form of a quantum automat...
Quantum computers offer the possibility to implement lattice gauge theory in Minkowski rather than E...
We show that the integrable Lindblad superoperators found recently can be used to build integrable n...
We propose a general exact method of calculating dynamical correlation functions in dual symplectic ...
We study unitary evolution of bipartite entanglement in a circuit with nearest-neighbor random gates...
A systematic approach to dualities in symmetric (1+1)d quantum lattice models has recently been prop...
We consider the class of dual-unitary quantum circuits in 1 + 1 dimensions and introduce a notion of...
A central question in Quantum Computing is how matrices in $SU(2)$ can be approximated by products o...