Higher Berry Curvature from the Wave function II: Locally Parameterized States Beyond One Dimension
Abstract
We propose a systematic wave function based approach to construct topological invariants for families of lattice systems that are short-range entangled using local parameter spaces. This construction is particularly suitable when given a family of tensor networks that can be viewed as the ground states of d dimensional lattice systems, for which we construct the closed (d+2)-form higher Berry curvature, which is a generalization of the well known 2-form Berry curvature. Such (d+2)-form higher Berry curvature characterizes a flow of (d+1)-form higher Berry curvature in the system. Our construction is equally suitable for constructing other higher pumps, such as the (higher) Thouless pump in the presence of a global on-site U(1) symmetry, which corresponds to a closed d-form. The cohomology classes of such higher differential forms are topological invariants and are expected to be quantized for short-range entangled states. We illustrate our construction with exactly solvable lattice models that are in nontrivial higher Berry classes in d=2.
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