Universal sub-leading terms in ground state fidelity

Abstract

The study of the (logarithm of the) fidelity i.e., of the overlap amplitude, between ground states of Hamiltonians corresponding to different coupling constants, provides a valuable insight on critical phenomena. When the parameters are infinitesimally close, it is known that the leading term behaves as O(Lα) (L system size) where α is equal to the spatial dimension d for gapped systems, and otherwise depends on the critical exponents. Here we show that when parameters are changed along a critical manifold, a sub-leading O(1) term can appear. This term, somewhat similar to the topological entanglement entropy, depends only on the system's universality class and encodes non-trivial information about the topology of the system. We relate it to universal g factors and partition functions of (boundary) conformal field theory in d=1 and d=2 dimensions. Numerical checks are presented on the simple example of the XXZ chain.