On the pre-Lie algebra of specified Feynman graphs
Abstract
We study the pre-Lie algebra of specified Feynman graphs V T and we define a pre-Lie structure on its doubling space F T. We prove that F T is pre-Lie module on V T and we find some relations between the two pre-Lie structures. Also, we study the enveloping algebras of two pre-Lie algebras denoted respectively by ( D' T, , ) and ( H' T, , ) and we prove that ( D' T, , ) is a module-bialgebra on ( H' T, , ).
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