- Need to be able to do things like
$(f(x)-f(y))/(x-y)$ or$f(x)/x$ whenf % ideal(x) == 0
. If we can get this to work then we can do local and global degrees over arbitrary fields - Build trace forms along separable field extensions
- Build norms
Would be really fun:
- Implement
$K_\ast^\text{M}$ and$K_\ast^{\text{MW}}$ into Macaulay2 -- by this we mean provide a nice way to give minimal presentations for elements in these rings in terms of generators, and be able to add, multiply, and check equality of elements. - Take a form in
$\text{GW}(k)$ and return the minimal$n$ so that it vanishes in$I^n$