More operations on modules and ideals #
Equations
- One or more equations did not get rendered due to their size.
This duplicates the global smul_eq_mul
, but doesn't have to unfold anywhere near as much to
apply.
Dependent version of Submodule.smul_induction_on
.
Equations
- ⋯ = ⋯
Given s
, a generating set of R
, to check that an x : M
falls in a
submodule M'
of x
, we only need to show that r ^ n • x ∈ M'
for some n
for each r : s
.
If x
is an I
-multiple of the submodule spanned by f '' s
,
then we can write x
as an I
-linear combination of the elements of f '' s
.
Equations
- ⋯ = ⋯
Equations
- ⋯ = ⋯
Alias of Ideal.inf_eq_mul_of_isCoprime
.
The radical of an ideal I
consists of the elements r
such that r ^ n ∈ I
for some n
.
Equations
Instances For
An ideal is radical if it contains its radical.
Instances For
An ideal is radical iff it is equal to its radical.
Alias of the reverse direction of Ideal.radical_eq_iff
.
An ideal is radical iff it is equal to its radical.
Ideal.radical
as an InfTopHom
, bundling in that it distributes over inf
.
Equations
- Ideal.radicalInfTopHom = { toFun := Ideal.radical, map_inf' := ⋯, map_top' := ⋯ }
Instances For
The reverse inclusion does not hold for e.g. I := fun n : ℕ ↦ Ideal.span {(2 ^ n : ℤ)}
.
Equations
- Ideal.instIdemCommSemiring = inferInstance
Alias of Ideal.IsPrime.pow_le_iff
.
Alias of Ideal.IsPrime.le_of_pow_le
.
Alias of Ideal.IsPrime.prod_le
.
The product of a finite number of elements in the commutative semiring R
lies in the
prime ideal p
if and only if at least one of those elements is in p
.
If I
divides J
, then I
contains J
.
In a Dedekind domain, to divide and contain are equivalent, see Ideal.dvd_iff_le
.
Equations
- Ideal.uniqueUnits = { default := 1, uniq := ⋯ }
A variant of Finsupp.linearCombination
that takes in vectors valued in I
.
Equations
- Ideal.finsuppTotal ι M I v = Finsupp.linearCombination R v ∘ₗ Finsupp.mapRange.linearMap (Submodule.subtype I)
Instances For
Equations
- ⋯ = ⋯
Equations
- ⋯ = ⋯