Add to ORKGAbstract. Because they play a role in our understanding of the symmetric group algebra, Lie idempotents have received considerable attention. The Kly-achko idempotent has attracted interest from combinatorialists, partly because its definition involves the major index of permutations. For the symmetric group Sn, we look at the symmetric group algebra with coefficients from the field of rational functions in n variables q1,..., qn. In this setting, we can define an n-parameter generalization of the Klyachko idempo-tent, 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. 1
AbstractWe count the number of idempotent elements in a certain section of the s symmetric semigroup...
In this thesis, we study the representation theory of the symmetric groups $\mathfrak{S}_n$, their S...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1973.Vita.Bibliography...
Because they play a role in our understanding of the symmetric group algebra, Lie idempotents have r...
Because they play a role in our understanding of the symmetric group algebra, Lie idempotents have r...
Because they play a role in our understanding of the symmetric group algebra, Lie idempotents have r...
AbstractAn analogue of the exponential generating function for derangement numbers in the symmetric ...
We show that for all but two partitions λ of n> 6 there exists a standard tableau of shape λ with...
We show that for all but two partitions $\lambda$ of $n >6$ there exists a standard tableau of shape...
AbstractWe show that for all but two partitions λ of n>6 there exists a standard tableau of shape λ ...
We study the singular part of the partition monoid Pn; that is, the ideal PnSn , where Sn is the sym...
Nine (= 2 x 2 x 2 + 1) product identities for certain one-variable generating functions of certain f...
Nine (= 2 x 2 x 2 + 1) product identities for certain one-variable generating functions of certain f...
In this article we will give an overview of the new Lie theoretic approach to the p-modular represen...
The partition algebra Pk(n) is an associative algebra with a basis of set partition diagrams and a m...
AbstractWe count the number of idempotent elements in a certain section of the s symmetric semigroup...
In this thesis, we study the representation theory of the symmetric groups $\mathfrak{S}_n$, their S...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1973.Vita.Bibliography...
Because they play a role in our understanding of the symmetric group algebra, Lie idempotents have r...
Because they play a role in our understanding of the symmetric group algebra, Lie idempotents have r...
Because they play a role in our understanding of the symmetric group algebra, Lie idempotents have r...
AbstractAn analogue of the exponential generating function for derangement numbers in the symmetric ...
We show that for all but two partitions λ of n> 6 there exists a standard tableau of shape λ with...
We show that for all but two partitions $\lambda$ of $n >6$ there exists a standard tableau of shape...
AbstractWe show that for all but two partitions λ of n>6 there exists a standard tableau of shape λ ...
We study the singular part of the partition monoid Pn; that is, the ideal PnSn , where Sn is the sym...
Nine (= 2 x 2 x 2 + 1) product identities for certain one-variable generating functions of certain f...
Nine (= 2 x 2 x 2 + 1) product identities for certain one-variable generating functions of certain f...
In this article we will give an overview of the new Lie theoretic approach to the p-modular represen...
The partition algebra Pk(n) is an associative algebra with a basis of set partition diagrams and a m...
AbstractWe count the number of idempotent elements in a certain section of the s symmetric semigroup...
In this thesis, we study the representation theory of the symmetric groups $\mathfrak{S}_n$, their S...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1973.Vita.Bibliography...