cons
and tail
for maps Fin n →₀ M
#
We interpret maps Fin n →₀ M
as n
-tuples of elements of M
,
We define the following operations:
Finsupp.tail
: the tail of a mapFin (n + 1) →₀ M
, i.e., its lastn
entries;Finsupp.cons
: adding an element at the beginning of ann
-tuple, to get ann + 1
-tuple;
In this context, we prove some usual properties of tail
and cons
, analogous to those of
Data.Fin.Tuple.Basic
.
@[simp]
theorem
Finsupp.cons_zero
{n : ℕ}
{M : Type u_1}
[Zero M]
(y : M)
(s : Fin n →₀ M)
:
↑(Finsupp.cons y s) 0 = y
@[simp]
theorem
Finsupp.tail_cons
{n : ℕ}
{M : Type u_1}
[Zero M]
(y : M)
(s : Fin n →₀ M)
:
Finsupp.tail (Finsupp.cons y s) = s
@[simp]
theorem
Finsupp.cons_tail
{n : ℕ}
{M : Type u_1}
[Zero M]
(t : Fin (n + 1) →₀ M)
:
Finsupp.cons (↑t 0) (Finsupp.tail t) = t
theorem
Finsupp.cons_ne_zero_of_left
{n : ℕ}
{M : Type u_1}
[Zero M]
{y : M}
{s : Fin n →₀ M}
(h : y ≠ 0)
:
Finsupp.cons y s ≠ 0
theorem
Finsupp.cons_ne_zero_of_right
{n : ℕ}
{M : Type u_1}
[Zero M]
{y : M}
{s : Fin n →₀ M}
(h : s ≠ 0)
:
Finsupp.cons y s ≠ 0