Insertion and Elimination: the doubly infinite Lie algebra of Feynman graphs
نویسندگان
چکیده
The Lie algebra of Feynman graphs gives rise to two natural representations, acting as derivations on the commutative Hopf algebra of Feynman graphs, by creating or eliminating subgraphs. Insertions and eliminations do not commute, but rather establish a larger Lie algebra of derivations which we here determine.
منابع مشابه
8 A ug 2 00 3 INSERTION AND ELIMINATION LIE ALGEBRA : THE LADDER CASE
We prove that the insertion-elimination Lie algebra of Feynman graphs in the ladder case has a natural interpretation in terms of a certain algebra of infinite dimensional matrices. We study some aspects of its representation theory and we will discuss some relations with the representation of the Heisenberg algebra.
متن کاملar X iv : m at h / 03 08 04 2 v 3 [ m at h . Q A ] 8 S ep 2 00 3 INSERTION AND ELIMINATION LIE ALGEBRA : THE LADDER CASE
We prove that the insertion-elimination Lie algebra of Feynman graphs in the ladder case has a natural interpretation in terms of a certain algebra of infinite dimensional matrices. We study some aspects of its representation theory and we will discuss some relations with the representation of the Heisenberg algebra.
متن کاملm at h . Q A ] 1 8 N ov 2 00 3 INSERTION AND ELIMINATION LIE ALGEBRA : THE LADDER CASE
We prove that the insertion-elimination Lie algebra of Feynman graphs in the ladder case has a natural interpretation in terms of a certain algebra of infinite dimensional matrices. We study some aspects of its representation theory and we will discuss some relations with the representation of the Heisenberg algebra.
متن کامل. Q A ] 5 A ug 2 00 3 INSERTION AND ELIMINATION LIE ALGEBRA : THE LADDER CASE
We prove that the insertion-elimination Lie algebra of Feynman graphs in the ladder case has a natural interpretation in terms of a certain algebra of infinite dimensional matrices. We study some aspects of its representation theory and we will discuss some relations with the representation of the Heisenberg algebra.
متن کاملHecke Correspondences and Feynman Graphs
We consider natural representations of the Connes-Kreimer Lie algebras on rooted trees/Feynman graphs arising from Hecke correspondences in the categories LRF ,LFG constructed by K. Kremnizer and the author. We thus obtain the insertion/elimination representations constructed by Connes-Kreimer as well as an isomorphic pair we term top-insertion/top-elimination. We also construct graded finite-d...
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تاریخ انتشار 2002