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[Merged by Bors] - feat(RingTheory/Polynomial/HilbertPoly): the definition and key property of Polynomial.hilbertPoly p d
for p : F[X]
and d : ℕ
, where F
is a field.
#19303
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PR summary fe4cf0e8c1Import changes for modified filesNo significant changes to the import graph Import changes for all files
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d
and a polynomial p : ℤ[X]
d
and a polynomial p : ℤ[X]
d
and a polynomial p : ℤ[X]
d
and a polynomial p : ℤ[X]
d
and a polynomial p : ℤ[X]
d
and a polynomial p : F[X]
, where F
is a field with characteristic 0
.
d
and a polynomial p : F[X]
, where F
is a field with characteristic 0
.Polynomial.hilbert p d
for a natural number d
and a polynomial p : F[X]
.
Polynomial.hilbert p d
for a natural number d
and a polynomial p : F[X]
.Polynomial.hilbert p d
for a natural number d
and a polynomial p : F[X]
, where F
is a field.
Polynomial.hilbert p d
for a natural number d
and a polynomial p : F[X]
, where F
is a field.Polynomial.hilbert p d
, where F
is a field, p : F[X]
and d : ℕ
.
Thanks a lot for your work on this! maintainer merge |
🚀 Pull request has been placed on the maintainer queue by kbuzzard. |
Polynomial.hilbert p d
for p : F[X]
and d : ℕ
, where F
is a field.RatFunc.Polynomial.hilbert p d
for p : F[X]
and d : ℕ
, where F
is a field.
✌️ FMLJohn can now approve this pull request. To approve and merge a pull request, simply reply with |
RatFunc.Polynomial.hilbert p d
for p : F[X]
and d : ℕ
, where F
is a field.Polynomial.hilbertPoly p d
for p : F[X]
and d : ℕ
, where F
is a field.
Polynomial.hilbertPoly p d
for p : F[X]
and d : ℕ
, where F
is a field.Polynomial.hilbertPoly p d
for p : F[X]
and d : ℕ
, where F
is a field.
bors r+ |
…rty of `Polynomial.hilbertPoly p d` for `p : F[X]` and `d : ℕ`, where `F` is a field. (#19303) Given any field `F`, polynomial `p : F[X]` and natural number `d`, we have defined `Polynomial.hilbertPoly p d : F[X]`. If `F` is of characteristic zero, then for any large enough `n : ℕ`, `PowerSeries.coeff F n (p * (invOneSubPow F d))` equals `(hilbertPoly p d).eval (n : F)` (see `Polynomial.coeff_mul_invOneSubPow_eq_hilbertPoly_eval`).
Pull request successfully merged into master. Build succeeded: |
Polynomial.hilbertPoly p d
for p : F[X]
and d : ℕ
, where F
is a field.Polynomial.hilbertPoly p d
for p : F[X]
and d : ℕ
, where F
is a field.
Given any field
F
, polynomialp : F[X]
and natural numberd
, we have definedPolynomial.hilbertPoly p d : F[X]
. IfF
is of characteristic zero, then for any large enoughn : ℕ
,PowerSeries.coeff F n (p * (invOneSubPow F d))
equals(hilbertPoly p d).eval (n : F)
(seePolynomial.coeff_mul_invOneSubPow_eq_hilbertPoly_eval
).