Discrete Higher Berry Phases and Matrix Product States

Abstract

A 1-parameter family of invertible states gives a topological transport phenomenon, similar to the Thouless pumping. As a natural generalization of this, we can consider a family of invertible states parametrized by some topological space X. This is called a higher pump. It is conjectured that (1+1)-dimensional bosonic invertible state parametrized by X is classified by H3(X;Z). In this paper, we construct two higher pumping models parametrized by X=RP2× S1 and X=L(3,1)× S1 that corresponds to the torsion part of H3(X;Z). As a consequence of the nontriviality as a family, we find that a quantum mechanical system with a nontrivial discrete Berry phase is pumped to the boundary of the (1+1)-dimensional system. We also study higher pump phenomena by using matrix product states (MPS), and construct a higher pump invariant which takes value in a torsion part of H3(X;Z). This is a higher analog of the ordinary discrete Berry phase that takes value in the torsion part of H2(X;Z). In order to define the higher pump invariant, we utilize the smooth Deligne cohomology and its integration theory. We confirm that the higher pump invariant of the model has a nontrivial value.