A bijection between rooted trees and fermionic Fock states : grafting and growth operators in Fock space and fermionic operators for rooted trees.
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2013
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We showthat fermionic Fock states in the occupation number representation can
be indexed uniquely by rooted trees. Our main ingredients in this construction
are the Matula numbers, the fundamental theorem of arithmetic, and a relabeling
of fermionic quantum states by natural numbers. As a byproduct of the
correspondence mentioned above we realize the grafting and the growth
operators, comprising important constructions in the context of Hopf algebras,
in the fermionic Fock space. Also, we show how to construct fermionic creation
and annihilation operators in the context of rooted trees. New representations of
the solutions of combinatorial Dyson–Schwinger equations and of the antipode
in the Connes–Kreimer Hopf algebra of rooted trees related to the occupation
number picture are presented.
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FRANCISCO NETO, A. A bijection between rooted trees and fermionic Fock states: grafting and growth operators in Fock space and fermionic operators for rooted trees. Journal of Physics A: Mathematical and Theoretical, v. 46, p. 435205, 2013. Disponível em: <http://iopscience.iop.org/article/10.1088/1751-8113/46/43/435205/pdf>. Acesso em: 20 jul. 2017.