Fermionic Wave Functions on Unordered Configurations
Abstract
Quantum mechanical wave functions of N identical fermions are usually represented as anti-symmetric functions of ordered configurations. Leinaas and Myrheim proposed how a fermionic wave function can be represented as a function of unordered configurations, which is desirable as the ordering is artificial and unphysical. In this approach, the wave function is a cross-section of a particular Hermitian vector bundle over the configuration space, which we call the fermionic line bundle. Here, we provide a justification for Leinaas and Myrheim's proposal, that is, a justification for regarding cross-sections of the fermionic line bundle as equivalent to anti-symmetric functions of ordered configurations. In fact, we propose a general notion of equivalence of two quantum theories on the same configuration space; it is based on specifying a quantum theory as a triple (``quantum triple'') consisting of a Hilbert space , a Hamiltonian , and a family of position operators (technically, a projection-valued measure on configuration space acting on ).
Keywords
Cite
@article{arxiv.1403.3705,
title = {Fermionic Wave Functions on Unordered Configurations},
author = {Sheldon Goldstein and James Taylor and Roderich Tumulka and Nino Zanghi},
journal= {arXiv preprint arXiv:1403.3705},
year = {2014}
}
Comments
29 pages LaTeX, no figures