English

Operator Approach to Complexity : Excited States

High Energy Physics - Theory 2019-09-25 v5

Abstract

We evaluate the complexity of the free scalar field by the operator approach in which the transformation matrix between the second quantization operators of reference state and target state is regarded as the quantum gate. We first examine the system in which the reference state is two non-interacting oscillators with same frequency ω0\omega_0 while the target state is two interacting oscillators with frequency ω~1\tilde \omega_1 and ω~2\tilde \omega_2. We calculate the geodesic length on the associated group manifold of gate matrix and reproduce the known value of ground-state complexity. Next, we study the complexity in the excited states. Although the gate matrix is very large we can transform it to a diagonal matrix and obtain the associated complexity. We explicitly calculate the complexity in several excited states and prove that the square of geodesic length in the general state n,m|{\rm n,m}\rangle is D(n,m)2=(n+1)(lnω~1ω0)2+(m+1)(lnω~2ω0)2D_{\rm (n,m)}^2={\rm (n+1)}\left(\ln {\sqrt{\tilde \omega_1\over \omega_0}}\,\right)^2 +{\rm (m+1)}\left(\ln {\sqrt{\tilde \omega_2\over \omega_0}}\,\right)^2. The results are extended to the N couple harmonic oscillators which correspond to the lattice version of free scalar field.

Cite

@article{arxiv.1905.02041,
  title  = {Operator Approach to Complexity : Excited States},
  author = {Wung-Hong Huang},
  journal= {arXiv preprint arXiv:1905.02041},
  year   = {2019}
}

Comments

Latex 20 pages. Correct definition of ground state. Add sec.4.3 : Wavefunction of Excited State

R2 v1 2026-06-23T08:58:08.841Z