English

Analytical Solution of Cross Polarization Dynamics

Quantum Physics 2012-09-18 v1

Abstract

Cross polarization (CP) dynamics, which was remained unknown for five decades, has been derived analytically in the zero- and double-quantum spaces. The initial polarization in the double-quantum space is a constant of motion under strong pulse condition (ω1I+ω1Sd(t)|\omega_{1I}+\omega_{1S}|\gg |d(t)|), while the Hamiltonian in the zero-quantum space reduces to d(t)σzΔd(t)\sigma_{z}^{\Delta} under the Hartmann-Hahn match condition (ω1I=ω1S\omega_{1I}=\omega_{1S}). The time dependent Hamilontian (d(t)σzΔd(t)\sigma_{z}^{\Delta}) in the zero-quantum space can be expressed by average Hamiltonians. Since[d(t)σzΔ,d(t")σzΔ]=0[d(t')\sigma_{z}^{\Delta}, d(t")\sigma_{z}^{\Delta}]=0, only zero order average Hamiltonian needs to be calculated, leading to an analytical solution of CP dynamics.

Keywords

Cite

@article{arxiv.1209.3604,
  title  = {Analytical Solution of Cross Polarization Dynamics},
  author = {Peng Li and Qun Chen and Shanmin Zhang},
  journal= {arXiv preprint arXiv:1209.3604},
  year   = {2012}
}
R2 v1 2026-06-21T22:06:11.402Z