Topology

Spielman's review.

Berry phase

Direct measurement of the Zak phase in topological Bloch bands

They work with 1D dimerized optical lattice (or as they call it a superlattice), which leads to the Rice-Mele Hamiltonian: $\bar H = -\sum_n(Ja^\dagger_n b_n+J'a^\dagger b_{n-1}+\text{h.c.})+\Delta\sum_n(a^\dagger_n a_n-b^\dagger_n b_n)$ . If Δ is tuned to be equal then the system corresponds to the Su-Schrieffer-Heeger (SSH) model, which has two topologically distinct phases. The Zak phase difference between them is equal to π. The Zak phase is a gauge dependent quality, although the Zak phase difference of the two dimerizations is uniquely defined. Total phase obtained by a particle moved through the Brillouin zone has three contributions: geometric phase (Zak), dynamical phase ( $\int{H dt}$ ), and a phase due to Zeeman energy.

Experimental procedure

By conrolling phase between two standing-wave lasers they were able to tune across phase transition.

prepare atoms in |↓, k=0> state
apply a π/2 pulse to have a superposition of ↑ and ↓,
the force created by the magnetic field acts in opposite directions, thus superposition evolves into $|\uparrow,k>+e^{i\phi}|\downarrow,-k>$
To eliminate Zeeman phase from the measurement a spin-echo π is applied, D1 changed to D2
Spins evolve in the upper band, until they return to k=0
π/2 is applied to interfere two spin components, the final phase measured is φ(Zak, D1)-φ(Zak, D2)

A. Two phases
B. Phases measurement

Topology

Berry phase

Direct measurement of the Zak phase in topological Bloch bands

Experimental procedure

Navigation menu

Personal tools

Namespaces

Variants

Views

More

Search

Navigation

Tools