FUNCTION: SgaOnX - action of an element of the symmetric group algebra on
a linear combination of X[perm]
CALLING SEQUENCE:
- SgaOnX(e_1, exp)
- SGA[SgaOnX](e_1, exp)
-
PARAMETERS:
- e_1 = any element of the symmetric group algebra
- exp = any expression
SYNOPSIS:
- The SgaOnX function realizes the action of an element of the symmetric
group algebra, say e_1, on an expression exp expressed on the X Schubert
basis.
- The expression exp is expanded and the result is not collected.
- One may add 'noexpand' just after the argument exp to choose not to
expand the expression exp before treating it.
- One may collect the result by adding a third argument: this is done
by SgaOnX(e_1, exp, 'collect'). Moreover, one can use both noexpand and
collect options: for instance, SgaOnX(e_1, exp, 'noexpand', 'collect').
- The action of the element SgTranspo(i,n) on the Schubert polynomial
X[perm] is : let nu = MultPerm(perm, SgTranspo(i,n)), then
X[perm] --> X[perm] if length(nu) > length(perm)
X[perm] --> X[perm] + (x_{i+1} - x_i) X[nu] otherwise.
- The result is expressed on the X Schubert basis and is not collected.
- Whenever there is a conflict between the function name SgaOnX and
another name used in the same session, use the long form SGA['SgaOnX'].
EXAMPLES:
> with(SGA):
> SgaOnX(q^4*A[1,3,2] - q^3*A[2,1], z*X[3,2,1] - X[2,1,3]);
4 4 3
- X[3, 2, 1] z q + X[3, 1, 4, 2] z q + X[3, 2, 1] z q
3 4 3 3
- X[2, 4, 1, 3] z q - q X[2, 1] - X[2, 1] q + X[1, 3, 2] q
SEE ALSO: