The symmetric group $S_n$ acts on $\bar{M}_{0,n}$ by permuting the marked points.
This function computes the image of a curve class representative $C$ under a permutation $\sigma$ of the marked points.
Enter $\sigma$ as a list $\{ \sigma(1),\sigma(2),\ldots,\sigma(n)\}$. Cycle class notation is not supported for this function.
i1 : L= { {{{2,1},{3},{4},{5}},-2}, {{{1,3},{2},{4},{5}},-7}, {{{1,4},{2},{3},{5}},1}}; |
i2 : C=curveClassRepresentativeM0nbar(5,L); |
i3 : permute({5,2,1,3,4}, C) o3 = CurveClassRepresentativeM0nbar{CurveExpression => HashTable{{{1, 5}, {2}, {3}, {4}} => -7}} {{1}, {2, 5}, {3}, {4}} => -2 {{1}, {2}, {3, 5}, {4}} => 1 NumberOfMarkedPoints => 5 o3 : CurveClassRepresentativeM0nbar |
The object permute is a method function.