Lie powers and Witt vectors

R. M. Bryant; Marianne Johnson

doi:10.1007/s10801-007-0117-9

Lie powers and Witt vectors

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Abstract

In the study of Lie powers of a module V in prime characteristic p, a basic role is played by certain modules B n introduced by Bryant and Schocker. The isomorphism types of the B n are not fully understood, but these modules fall into infinite families {Bk}B pk,B{p2k}, one family B(k) for each positive integer k not divisible by p, and there is a recursive formula for the modules within B(k). Here we use combinatorial methods and Witt vectors to show that each module in B(k) is isomorphic to a direct sum of tensor products of direct summands of the kth tensor power V ⊗k. © 2008 Springer Science+Business Media, LLC.

Original language	English
Pages (from-to)	169-187
Number of pages	18
Journal	Journal of Algebraic Combinatorics
Volume	28
Issue number	1
DOIs	https://doi.org/10.1007/s10801-007-0117-9
Publication status	Published - Aug 2008

Keywords

Free Lie algebra
Lie power
Tensor power
Witt vector

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10.1007/s10801-007-0117-9

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title = "Lie powers and Witt vectors",

abstract = "In the study of Lie powers of a module V in prime characteristic p, a basic role is played by certain modules B n introduced by Bryant and Schocker. The isomorphism types of the B n are not fully understood, but these modules fall into infinite families {Bk}B pk,B{p2k}, one family B(k) for each positive integer k not divisible by p, and there is a recursive formula for the modules within B(k). Here we use combinatorial methods and Witt vectors to show that each module in B(k) is isomorphic to a direct sum of tensor products of direct summands of the kth tensor power V ⊗k. {\textcopyright} 2008 Springer Science+Business Media, LLC.",

keywords = "Free Lie algebra, Lie power, Tensor power, Witt vector",

author = "Bryant, {R. M.} and Marianne Johnson",

year = "2008",

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doi = "10.1007/s10801-007-0117-9",

language = "English",

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T1 - Lie powers and Witt vectors

AU - Bryant, R. M.

AU - Johnson, Marianne

PY - 2008/8

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N2 - In the study of Lie powers of a module V in prime characteristic p, a basic role is played by certain modules B n introduced by Bryant and Schocker. The isomorphism types of the B n are not fully understood, but these modules fall into infinite families {Bk}B pk,B{p2k}, one family B(k) for each positive integer k not divisible by p, and there is a recursive formula for the modules within B(k). Here we use combinatorial methods and Witt vectors to show that each module in B(k) is isomorphic to a direct sum of tensor products of direct summands of the kth tensor power V ⊗k. © 2008 Springer Science+Business Media, LLC.

AB - In the study of Lie powers of a module V in prime characteristic p, a basic role is played by certain modules B n introduced by Bryant and Schocker. The isomorphism types of the B n are not fully understood, but these modules fall into infinite families {Bk}B pk,B{p2k}, one family B(k) for each positive integer k not divisible by p, and there is a recursive formula for the modules within B(k). Here we use combinatorial methods and Witt vectors to show that each module in B(k) is isomorphic to a direct sum of tensor products of direct summands of the kth tensor power V ⊗k. © 2008 Springer Science+Business Media, LLC.

KW - Free Lie algebra

KW - Lie power

KW - Tensor power

KW - Witt vector

U2 - 10.1007/s10801-007-0117-9

DO - 10.1007/s10801-007-0117-9

M3 - Article

SN - 1572-9192

VL - 28

SP - 169

EP - 187

JO - Journal of Algebraic Combinatorics

JF - Journal of Algebraic Combinatorics

IS - 1

ER -

Lie powers and Witt vectors

Abstract

Keywords

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