Complexity in two-point measurement schemes

We show that the characteristic function of the probability distribution associated with the change of an observable in a two -point measurement protocol with a perturbation can be written as an autocorrelation function between an initial state and a certain unitary evolved state by an effective unitary operator. Using this identification, we probe how the evolved state spreads in the corresponding conjugate space, by defining a notion of the complexity of the spread of this evolved state. For a sudden quench scenario, where the parameters of an initial Hamiltonian (taken as the observable measured in the two -point measurement protocol) are suddenly changed to a new set of values, we first obtain the corresponding Krylov basis vectors and the associated Lanczos coefficients for an initial pure state, and define the associated spread complexity. Interestingly, we find that in such a protocol, the Lanczos coefficients can be related to various cost functions used in the geometric formulation of circuit complexity, for example, the one used to define Fubini-Study complexity. We illustrate the evolution of spread complexity both analytically, by using Lie algebraic techniques, and also by performing numerical computations. This is done for cases when the Hamiltonian before and after the quench are taken as different combinations of chaotic and integrable spin chains. We show that the spread complexity saturates for large values of the parameter only when the prequench Hamiltonian is chaotic. Furthermore, in these examples, we also discuss the importance of the role played by the initial state, which is determined by the time -evolved perturbation operator.