HepLean Documentation

Mathlib.Algebra.Order.BigOperators.Ring.Finset

Big operators on a finset in ordered rings #

This file contains the results concerning the interaction of finset big operators with ordered rings.

In particular, this file contains the standard form of the Cauchy-Schwarz inequality, as well as some of its immediate consequences.

theorem Finset.prod_nonneg {ι : Type u_1} {R : Type u_2} [CommMonoidWithZero R] [PartialOrder R] [ZeroLEOneClass R] [PosMulMono R] {f : ιR} {s : Finset ι} (h0 : is, 0 f i) :
0 is, f i
theorem Finset.prod_le_prod {ι : Type u_1} {R : Type u_2} [CommMonoidWithZero R] [PartialOrder R] [ZeroLEOneClass R] [PosMulMono R] {f g : ιR} {s : Finset ι} (h0 : is, 0 f i) (h1 : is, f i g i) :
is, f i is, g i

If all f i, i ∈ s, are nonnegative and each f i is less than or equal to g i, then the product of f i is less than or equal to the product of g i. See also Finset.prod_le_prod' for the case of an ordered commutative multiplicative monoid.

theorem Finset.prod_le_one {ι : Type u_1} {R : Type u_2} [CommMonoidWithZero R] [PartialOrder R] [ZeroLEOneClass R] [PosMulMono R] {f : ιR} {s : Finset ι} (h0 : is, 0 f i) (h1 : is, f i 1) :
is, f i 1

If each f i, i ∈ s belongs to [0, 1], then their product is less than or equal to one. See also Finset.prod_le_one' for the case of an ordered commutative multiplicative monoid.

theorem Finset.prod_pos {ι : Type u_1} {R : Type u_2} [CommMonoidWithZero R] [PartialOrder R] [ZeroLEOneClass R] [PosMulStrictMono R] [Nontrivial R] {f : ιR} {s : Finset ι} (h0 : is, 0 < f i) :
0 < is, f i
theorem Finset.prod_lt_prod {ι : Type u_1} {R : Type u_2} [CommMonoidWithZero R] [PartialOrder R] [ZeroLEOneClass R] [PosMulStrictMono R] [Nontrivial R] {f g : ιR} {s : Finset ι} (hf : is, 0 < f i) (hfg : is, f i g i) (hlt : is, f i < g i) :
is, f i < is, g i
theorem Finset.prod_lt_prod_of_nonempty {ι : Type u_1} {R : Type u_2} [CommMonoidWithZero R] [PartialOrder R] [ZeroLEOneClass R] [PosMulStrictMono R] [Nontrivial R] {f g : ιR} {s : Finset ι} (hf : is, 0 < f i) (hfg : is, f i < g i) (h_ne : s.Nonempty) :
is, f i < is, g i
theorem Finset.sum_sq_le_sq_sum_of_nonneg {ι : Type u_1} {R : Type u_2} [OrderedSemiring R] {f : ιR} {s : Finset ι} (hf : is, 0 f i) :
is, f i ^ 2 (∑ is, f i) ^ 2
theorem Finset.prod_add_prod_le {ι : Type u_1} {R : Type u_2} [OrderedCommSemiring R] {s : Finset ι} {i : ι} {f g h : ιR} (hi : i s) (h2i : g i + h i f i) (hgf : js, j ig j f j) (hhf : js, j ih j f j) (hg : is, 0 g i) (hh : is, 0 h i) :
is, g i + is, h i is, f i

If g, h ≤ f and g i + h i ≤ f i, then the product of f over s is at least the sum of the products of g and h. This is the version for OrderedCommSemiring.

theorem Finset.sum_mul_self_eq_zero_iff {ι : Type u_1} {R : Type u_2} [LinearOrderedSemiring R] [ExistsAddOfLE R] (s : Finset ι) (f : ιR) :
is, f i * f i = 0 is, f i = 0
theorem Finset.abs_prod {ι : Type u_1} {R : Type u_2} [LinearOrderedCommRing R] (s : Finset ι) (f : ιR) :
|xs, f x| = xs, |f x|
@[simp]
theorem Finset.PNat.coe_prod {ι : Type u_4} (f : ιℕ+) (s : Finset ι) :
(∏ is, f i) = is, (f i)
@[simp]
theorem CanonicallyOrderedCommSemiring.prod_pos {ι : Type u_1} {R : Type u_2} [CanonicallyOrderedCommSemiring R] {f : ιR} {s : Finset ι} [Nontrivial R] :
0 < is, f i is, 0 < f i

Note that the name is to match CanonicallyOrderedCommSemiring.mul_pos.

theorem Finset.prod_add_prod_le' {ι : Type u_1} {R : Type u_2} [CanonicallyOrderedCommSemiring R] {f g h : ιR} {s : Finset ι} {i : ι} (hi : i s) (h2i : g i + h i f i) (hgf : js, j ig j f j) (hhf : js, j ih j f j) :
is, g i + is, h i is, f i

If g, h ≤ f and g i + h i ≤ f i, then the product of f over s is at least the sum of the products of g and h. This is the version for CanonicallyOrderedCommSemiring.

Named inequalities #

theorem Finset.sum_sq_le_sum_mul_sum_of_sq_eq_mul {ι : Type u_1} {R : Type u_2} [LinearOrderedCommSemiring R] [ExistsAddOfLE R] (s : Finset ι) {r f g : ιR} (hf : is, 0 f i) (hg : is, 0 g i) (ht : is, r i ^ 2 = f i * g i) :
(∑ is, r i) ^ 2 (∑ is, f i) * is, g i

Cauchy-Schwarz inequality for finsets.

This is written in terms of sequences f, g, and r, where r is a stand-in for √(f i * g i). See sum_mul_sq_le_sq_mul_sq for the more usual form in terms of squared sequences.

theorem Finset.sum_mul_sq_le_sq_mul_sq {ι : Type u_1} {R : Type u_2} [LinearOrderedCommSemiring R] [ExistsAddOfLE R] (s : Finset ι) (f g : ιR) :
(∑ is, f i * g i) ^ 2 (∑ is, f i ^ 2) * is, g i ^ 2

Cauchy-Schwarz inequality for finsets, squared version.

theorem Finset.sq_sum_div_le_sum_sq_div {ι : Type u_1} {R : Type u_2} [LinearOrderedSemifield R] [ExistsAddOfLE R] (s : Finset ι) (f : ιR) {g : ιR} (hg : is, 0 < g i) :
(∑ is, f i) ^ 2 / is, g i is, f i ^ 2 / g i

Sedrakyan's lemma, aka Titu's lemma or Engel's form.

This is a specialization of the Cauchy-Schwarz inequality with the sequences f n / √(g n) and √(g n), though here it is proven without relying on square roots.

Absolute values #

theorem AbsoluteValue.sum_le {ι : Type u_1} {R : Type u_2} {S : Type u_3} [Semiring R] [OrderedSemiring S] (abv : AbsoluteValue R S) (s : Finset ι) (f : ιR) :
abv (∑ is, f i) is, abv (f i)
theorem IsAbsoluteValue.abv_sum {ι : Type u_1} {R : Type u_2} {S : Type u_3} [Semiring R] [OrderedSemiring S] (abv : RS) [IsAbsoluteValue abv] (f : ιR) (s : Finset ι) :
abv (∑ is, f i) is, abv (f i)
@[deprecated IsAbsoluteValue.abv_sum]
theorem abv_sum_le_sum_abv {ι : Type u_1} {R : Type u_2} {S : Type u_3} [Semiring R] [OrderedSemiring S] (abv : RS) [IsAbsoluteValue abv] (f : ιR) (s : Finset ι) :
abv (∑ is, f i) is, abv (f i)

Alias of IsAbsoluteValue.abv_sum.

theorem AbsoluteValue.map_prod {ι : Type u_1} {R : Type u_2} {S : Type u_3} [CommSemiring R] [Nontrivial R] [LinearOrderedCommRing S] (abv : AbsoluteValue R S) (f : ιR) (s : Finset ι) :
abv (∏ is, f i) = is, abv (f i)
theorem IsAbsoluteValue.map_prod {ι : Type u_1} {R : Type u_2} {S : Type u_3} [CommSemiring R] [Nontrivial R] [LinearOrderedCommRing S] (abv : RS) [IsAbsoluteValue abv] (f : ιR) (s : Finset ι) :
abv (∏ is, f i) = is, abv (f i)

Positivity extension #

The positivity extension which proves that ∏ i ∈ s, f i is nonnegative if f is, and positive if each f i is.

TODO: The following example does not work

example (s : Finset ℕ) (f : ℕ → ℤ) (hf : ∀ n, 0 ≤ f n) : 0 ≤ s.prod f := by positivity

because compareHyp can't look for assumptions behind binders.

Instances For