1 | | The improvement in timing is minor for many tasks, and {{{sage -t --long weyl_characters.py}}} only comes in a few seconds faster. But for tensor product decompositions where the first factor is smaller than the other, the improvement is big, as Anne's ~~test~~s show. One can get up to the 12th or 13th tensor power of the spin representation of spin=B4(0,0,0,1), which was previously hopeless. |

| 1 | The improvement in timing is minor for many tasks, and {{{sage -t --long weyl_characters.py}}} only comes in a few seconds faster. But for tensor product decompositions where the first factor is smaller than the other, the improvement is big, as Anne's posted timings show. One can get up to the 12th or 13th tensor power of the spin representation of spin=B4(0,0,0,1), which was previously hopeless. |