English

About the Dedekind psi function in Pauli graphs

Quantum Physics 2011-08-17 v1 Number Theory

Abstract

We study the commutation structure within the Pauli groups built on all decompositions of a given Hilbert space dimension qq, containing a square, into its factors. The simplest illustrative examples are the quartit (q=4q=4) and two-qubit (q=22q=2^2) systems. It is shown how the sum of divisor function σ(q)\sigma(q) and the Dedekind psi function ψ(q)=qpq(1+1/p)\psi(q)=q \prod_{p|q} (1+1/p) enter into the theory for counting the number of maximal commuting sets of the qudit system. In the case of a multiple qudit system (with q=pmq=p^m and pp a prime), the arithmetical functions σ(p2n1)\sigma(p^{2n-1}) and ψ(p2n1)\psi(p^{2n-1}) count the cardinality of the symplectic polar space W2n1(p)W_{2n-1}(p) that endows the commutation structure and its punctured counterpart, respectively. Symmetry properties of the Pauli graphs attached to these structures are investigated in detail and several illustrative examples are provided.

Keywords

Cite

@article{arxiv.1012.1461,
  title  = {About the Dedekind psi function in Pauli graphs},
  author = {Michel R. P. Planat},
  journal= {arXiv preprint arXiv:1012.1461},
  year   = {2011}
}

Comments

Proceedings of Quantum Optics V, Cozumel to appear in Revista Mexicana de Fisica

R2 v1 2026-06-21T16:54:43.719Z