Complexity of OM factorizations of polynomials over local fields

“…If δ = 0, then B p = A p [θ]; thus, we assume δ > 0 in our analysis. By [1,Thm. 3.14], for the computation of a p-integral basis of B/A we may work modulo p δ+1 .…”

“…Let us briefly recall how the Montes algorithm proceeds to obtain further dissections of the subsets P ϕ . We use the version of the algorithm described in [1,Sec. 4], guaranteeing that the OM representations t P have order r P + 1, where r P is the Okutsu depth of F P .…”

“…The Montes algorithm has a cost of O n 2+ǫ + n 1+ǫ δ log q + n 1+ǫ δ 2+ǫ p-small operations [1,Thm. 5.15].…”

Higher Newton polygons and integral bases

“…If δ = 0, then B p = A p [θ]; thus, we assume δ > 0 in our analysis. By [1,Thm. 3.14], for the computation of a p-integral basis of B/A we may work modulo p δ+1 .…”

“…Let us briefly recall how the Montes algorithm proceeds to obtain further dissections of the subsets P ϕ . We use the version of the algorithm described in [1,Sec. 4], guaranteeing that the OM representations t P have order r P + 1, where r P is the Okutsu depth of F P .…”

“…The Montes algorithm has a cost of O n 2+ǫ + n 1+ǫ δ log q + n 1+ǫ δ 2+ǫ p-small operations [1,Thm. 5.15].…”

Higher Newton polygons and integral bases

“…The original version of the Montes algorithm produces a more comprehensive output, but we require only ind p(t) . Admitting fast multiplication, it is shown in [1,Theorem 5.14]…”

“…According to our tests, the running time of the genus computation is in most of the cases dominated by the computation and factorization of the discriminant of a defining polynomial of F . The complexity estimation for the Montes algorithm in [1] affords us concrete bounds for the number of operations in the finite constant field k, which are needed to compute the genus of F (Theorem 3.6). Unfortunately, these theoretical bounds do not fit well with the practical performance of the method.…”

Genus computation of global function fields

Local computation of differents and discriminants