%0 Journal Article %1 rosellen_course_2006 %A Rosellen, Markus %D 2006 %J math/0607270 %K Quantum algebras {Algebra,Vertex} %T A Course in Vertex Algebra %U http://arxiv.org/abs/math/0607270 %X This book offers an introduction to vertex algebra based on a new approach. The new approach says that a vertex algebra is an associative algebra such that the underlying Lie algebra is a vertex Lie algebra. In particular, vertex algebras can be formulated in terms of a single multiplication and they behave like associative algebras with respect to it. Chapter 1 is the introduction. In chapter 2 we discuss many examples of vertex Lie algebras and we show that vertex Lie algebras form a full subcategory of the category of "local" Lie algebras. In chapter 3 we introduce associative, commutative, and Poisson vertex algebras and vertex algebra modules and we show that graded associative vertex algebras form a full subcategory of the category of "local" associative algebras. In chapter 4 we give a systematic presentation of the vertex algebra identities, proving in particular the equivalence of various axiom systems, and we use filtrations to prove results about generating subspaces with the PBW-property, with and without repeats. In chapter 5 we explain three constructions of the enveloping vertex algebra of a vertex Lie algebra and prove the PBW-theorem. In chapter 6 we prove the Zhu correspondence between N-graded vertex algebra modules and modules over the Zhu algebra.

@article{rosellen_course_2006, abstract = {This book offers an introduction to vertex algebra based on a new approach. The new approach says that a vertex algebra is an associative algebra such that the underlying Lie algebra is a vertex Lie algebra. In particular, vertex algebras can be formulated in terms of a single multiplication and they behave like associative algebras with respect to it. Chapter 1 is the introduction. In chapter 2 we discuss many examples of vertex Lie algebras and we show that vertex Lie algebras form a full subcategory of the category of "local" Lie algebras. In chapter 3 we introduce associative, commutative, and Poisson vertex algebras and vertex algebra modules and we show that graded associative vertex algebras form a full subcategory of the category of "local" associative algebras. In chapter 4 we give a systematic presentation of the vertex algebra identities, proving in particular the equivalence of various axiom systems, and we use filtrations to prove results about generating subspaces with the {PBW-property,} with and without repeats. In chapter 5 we explain three constructions of the enveloping vertex algebra of a vertex Lie algebra and prove the {PBW-theorem.} In chapter 6 we prove the Zhu correspondence between N-graded vertex algebra modules and modules over the Zhu algebra.}, added-at = {2009-05-11T21:36:02.000+0200}, author = {Rosellen, Markus}, biburl = {https://www.bibsonomy.org/bibtex/216d0672ded02ea16f377092b8bd52ad2/tbraden}, interhash = {503d2fae3e9ff6a2aaccd09687f87f63}, intrahash = {16d0672ded02ea16f377092b8bd52ad2}, journal = {math/0607270}, keywords = {Quantum algebras {Algebra,Vertex}}, month = {July}, timestamp = {2009-05-11T21:36:02.000+0200}, title = {A Course in Vertex Algebra}, url = {http://arxiv.org/abs/math/0607270}, year = 2006 }