Can an ideal I in a polynomial ring k[x] over a field be moved by a change of coordinates into a position where it is generated by binomials x(a) - lambda x(b) with lambda is an element of k, or by unital binomials (i.e., with. = 0 or 1)? Can a variety be moved into...
Can an ideal I in a polynomial ring k[x] over a field be moved by a change of coordinates into a position where it is generated by binomials x(a) - lambda x(b) with lambda is an element of k, or by unital binomials (i.e., with. = 0 or 1)? Can a variety be moved into...
Can an ideal I in a polynomial ring k[x] over a field be moved by a change of coordinates into a position where it is generated by binomials $x^a - cx^b$ with c in k, or by unital binomials (i.e., with c = 0 or 1)? Can a variety be moved into a position where it ...