Filter.atTop
filter and archimedean (semi)rings/fields #
In this file we prove that for a linear ordered archimedean semiring R
and a function f : α → ℕ
,
the function Nat.cast ∘ f : α → R
tends to Filter.atTop
along a filter l
if and only if so
does f
. We also prove that Nat.cast : ℕ → R
tends to Filter.atTop
along Filter.atTop
, as
well as version of these two results for ℤ
(and a ring R
) and ℚ
(and a field R
).
Equations
- (_ : Filter.IsCountablyGenerated Filter.atTop) = (_ : Filter.IsCountablyGenerated Filter.atTop)
Equations
- (_ : Filter.IsCountablyGenerated Filter.atBot) = (_ : Filter.IsCountablyGenerated Filter.atBot)
If a function tends to infinity along a filter, then this function multiplied by a positive
constant (on the left) also tends to infinity. The archimedean assumption is convenient to get a
statement that works on ℕ
, ℤ
and ℝ
, although not necessary (a version in ordered fields is
given in Filter.Tendsto.const_mul_atTop
).
If a function tends to infinity along a filter, then this function multiplied by a positive
constant (on the right) also tends to infinity. The archimedean assumption is convenient to get a
statement that works on ℕ
, ℤ
and ℝ
, although not necessary (a version in ordered fields is
given in Filter.Tendsto.atTop_mul_const
).
See also Filter.Tendsto.atTop_mul_neg_const
for a version of this lemma for
LinearOrderedField
s which does not require the Archimedean
assumption.
See also Filter.Tendsto.atBot_mul_const
for a version of this lemma for
LinearOrderedField
s which does not require the Archimedean
assumption.
See also Filter.Tendsto.atBot_mul_neg_const
for a version of this lemma for
LinearOrderedField
s which does not require the Archimedean
assumption.