2 research outputs found
P-partitions and a multi-parameter Klyachko idempotent
Because they play a role in our understanding of the symmetric group algebra,
Lie idempotents have received considerable attention. The Klyachko idempotent
has attracted interest from combinatorialists, partly because its definition
involves the major index of permutations.
For the symmetric group S_n, we look at the symmetric group algebra with
coefficients from the field of rational functions in n variables q_1,..., q_n.
In this setting, we can define an n-parameter generalization of the Klyachko
idempotent, and we show it is a Lie idempotent in the appropriate sense.
Somewhat surprisingly, our proof that it is a Lie element emerges from
Stanley's theory of P-partitions.Comment: 16 pages, 1 figure. Final version: incorporates suggestions of the
referee, no changes to the result