We calculate the operator complexity for the displacement, squeeze and rotation operators of a quantum harmonic oscillator. The complexity of the time-dependent displacement operator is constant, equal to the magnitude of the coherent state parameter, while the complexity of unitary evolution by a generic quadratic Hamiltonian is proportional to the amount of squeezing and is sensitive to the time-dependent phase of the unitary operator. We apply these results to study the complexity of a free massive scalar field, finding that the complexity has a period of rapid linear growth followed by a saturation determined by the UV cutoff and the number of spatial dimensions. We also study the complexity of the unitary evolution of quantum cosmologi...
Utilizing the program of expectation values in coherent states and its recently developed algorithmi...
Quantum circuit complexity has played a central role in recent advances in holography and many-body ...
We formulate the transition from decelerated to accelerated expansion as a bounce in connection spac...
We study a notion of operator growth known as Krylov complexity in free and interacting massive scal...
We propose a measure of quantum state complexity defined by minimizing the spread of the wave-functi...
As a new step towards defining complexity for quantum field theories, we map Nielsen operator comple...
We examine the multifold complexity and Loschmidt echo for an inverted harmonic oscillator. We give ...
We present a general framework in which both Krylov state and operator complexities can be put on th...
We calculate Nielsen's circuit complexity of coherent spin state operators. An expression for the co...
We study the temporal evolution of the circuit complexity for a subsystem in harmonic lattices after...
We probe the contraction from $2d$ relativistic CFTs to theories with Bondi-Metzner-Sachs (BMS) symm...
In this paper, we study the Krylov complexity ($K$) from the planar/inflationary patch of the de Sit...
We present a new infinite class of gravitational observables in asymptotically Anti-de Sitter space ...
We develop computational tools necessary to extend the application of Krylov complexity beyond the s...
We compute the Krylov Complexity of a light operator $\mathcal{O}_L$ in an eigenstate of a $2d$ CFT ...
Utilizing the program of expectation values in coherent states and its recently developed algorithmi...
Quantum circuit complexity has played a central role in recent advances in holography and many-body ...
We formulate the transition from decelerated to accelerated expansion as a bounce in connection spac...
We study a notion of operator growth known as Krylov complexity in free and interacting massive scal...
We propose a measure of quantum state complexity defined by minimizing the spread of the wave-functi...
As a new step towards defining complexity for quantum field theories, we map Nielsen operator comple...
We examine the multifold complexity and Loschmidt echo for an inverted harmonic oscillator. We give ...
We present a general framework in which both Krylov state and operator complexities can be put on th...
We calculate Nielsen's circuit complexity of coherent spin state operators. An expression for the co...
We study the temporal evolution of the circuit complexity for a subsystem in harmonic lattices after...
We probe the contraction from $2d$ relativistic CFTs to theories with Bondi-Metzner-Sachs (BMS) symm...
In this paper, we study the Krylov complexity ($K$) from the planar/inflationary patch of the de Sit...
We present a new infinite class of gravitational observables in asymptotically Anti-de Sitter space ...
We develop computational tools necessary to extend the application of Krylov complexity beyond the s...
We compute the Krylov Complexity of a light operator $\mathcal{O}_L$ in an eigenstate of a $2d$ CFT ...
Utilizing the program of expectation values in coherent states and its recently developed algorithmi...
Quantum circuit complexity has played a central role in recent advances in holography and many-body ...
We formulate the transition from decelerated to accelerated expansion as a bounce in connection spac...