Documentation

Mathlib.Combinatorics.Enumerative.Partition

Partitions #

A partition of a natural number n is a way of writing n as a sum of positive integers, where the order does not matter: two sums that differ only in the order of their summands are considered the same partition. This notion is closely related to that of a composition of n, but in a composition of n the order does matter. A summand of the partition is called a part.

Main functions #

p : Partition n is a structure, made of a multiset of integers which are all positive and add up to n.

Implementation details #

The main motivation for this structure and its API is to show Euler's partition theorem, and related results.

The representation of a partition as a multiset is very handy as multisets are very flexible and already have a well-developed API.

TODO #

Link this to Young diagrams.

Tags #

Partition

References #

https://en.wikipedia.org/wiki/Partition_(number_theory)

structure Nat.Partition (n : ℕ) :

A partition of n is a multiset of positive integers summing to n.

parts : Multiset ℕ
positive integers summing to n
parts_pos {i : ℕ} : i ∈ self.parts → 0 < i
proof that the parts are positive
parts_sum : self.parts.sum = n
proof that the parts sum to n

Instances For

theorem Nat.Partition.ext {n : ℕ} {x y : n.Partition} (parts : x.parts = y.parts) :

x = y

instance Nat.instDecidableEqPartition {n✝ : ℕ} :

DecidableEq n✝.Partition

Equations

Nat.instDecidableEqPartition = Nat.decEqPartition✝

@[deprecated "Partition now derives an instance of DecidableEq." (since := "2024-12-28")]

instance Nat.Partition.decidableEqPartition {n : ℕ} :

DecidableEq n.Partition

Equations

x✝¹.decidableEqPartition x✝ = decidable_of_iff' (x✝¹.parts = x✝.parts) ⋯

def Nat.Partition.ofComposition (n : ℕ) (c : Composition n) :

A composition induces a partition (just convert the list to a multiset).

Equations

Nat.Partition.ofComposition n c = { parts := ↑c.blocks, parts_pos := ⋯, parts_sum := ⋯ }

@[simp]

theorem Nat.Partition.ofComposition_parts (n : ℕ) (c : Composition n) :

(ofComposition n c).parts = ↑c.blocks

theorem Nat.Partition.ofComposition_surj {n : ℕ} :

Function.Surjective (ofComposition n)

def Nat.Partition.ofSums (n : ℕ) (l : Multiset ℕ) (hl : l.sum = n) :

Given a multiset which sums to n, construct a partition of n with the same multiset, but without the zeros.

Equations

Nat.Partition.ofSums n l hl = { parts := Multiset.filter (fun (x : ℕ) => x ≠ 0) l, parts_pos := ⋯, parts_sum := ⋯ }

@[simp]

theorem Nat.Partition.ofSums_parts (n : ℕ) (l : Multiset ℕ) (hl : l.sum = n) :

(ofSums n l hl).parts = Multiset.filter (fun (x : ℕ) => x ≠ 0) l

def Nat.Partition.ofMultiset (l : Multiset ℕ) :

l.sum.Partition

A Multiset ℕ induces a partition on its sum.

Equations

Nat.Partition.ofMultiset l = Nat.Partition.ofSums l.sum l ⋯

@[simp]

theorem Nat.Partition.ofMultiset_parts (l : Multiset ℕ) :

(ofMultiset l).parts = Multiset.filter (fun (x : ℕ) => ¬x = 0) l

def Nat.Partition.ofSym {n : ℕ} {σ : Type u_1} (s : Sym σ n) [DecidableEq σ] :

An element s of Sym σ n induces a partition given by its multiplicities.

Equations

Nat.Partition.ofSym s = { parts := Multiset.map (fun (a : σ) => Multiset.count a ↑s) (↑s).dedup, parts_pos := ⋯, parts_sum := ⋯ }

@[simp]

theorem Nat.Partition.ofSym_map {n : ℕ} {σ : Type u_1} {τ : Type u_2} [DecidableEq σ] [DecidableEq τ] (e : σ ≃ τ) (s : Sym σ n) :

ofSym (Sym.map (⇑e) s) = ofSym s

def Nat.Partition.ofSymShapeEquiv {n : ℕ} {σ : Type u_1} {τ : Type u_2} [DecidableEq σ] [DecidableEq τ] (μ : n.Partition) (e : σ ≃ τ) :

{ x : Sym σ n // ofSym x = μ } ≃ { x : Sym τ n // ofSym x = μ }

An equivalence between σ and τ induces an equivalence between the subtypes of Sym σ n and Sym τ n corresponding to a given partition.

Equations

One or more equations did not get rendered due to their size.

def Nat.Partition.indiscrete (n : ℕ) :

The partition of exactly one part.

Equations

Nat.Partition.indiscrete n = Nat.Partition.ofSums n {n} ⋯

instance Nat.Partition.instInhabited {n : ℕ} :

Inhabited n.Partition

Equations

Nat.Partition.instInhabited = { default := Nat.Partition.indiscrete n }

@[simp]

theorem Nat.Partition.indiscrete_parts {n : ℕ} (hn : n ≠ 0) :

(indiscrete n).parts = {n}

@[simp]

theorem Nat.Partition.partition_zero_parts (p : Partition 0) :

instance Nat.Partition.UniquePartitionZero :

Unique (Partition 0)

Equations

Nat.Partition.UniquePartitionZero = { toInhabited := Nat.Partition.instInhabited, uniq := Nat.Partition.UniquePartitionZero.proof_1 }

@[simp]

theorem Nat.Partition.partition_one_parts (p : Partition 1) :

instance Nat.Partition.UniquePartitionOne :

Unique (Partition 1)

Equations

Nat.Partition.UniquePartitionOne = { toInhabited := Nat.Partition.instInhabited, uniq := Nat.Partition.UniquePartitionOne.proof_1 }

@[simp]

theorem Nat.Partition.ofSym_one {σ : Type u_1} [DecidableEq σ] (s : Sym σ 1) :

ofSym s = indiscrete 1

theorem Nat.Partition.count_ofSums_of_ne_zero {n : ℕ} {l : Multiset ℕ} (hl : l.sum = n) {i : ℕ} (hi : i ≠ 0) :

Multiset.count i (ofSums n l hl).parts = Multiset.count i l

The number of times a positive integer i appears in the partition ofSums n l hl is the same as the number of times it appears in the multiset l. (For i = 0, Partition.non_zero combined with Multiset.count_eq_zero_of_not_mem gives that this is 0 instead.)

theorem Nat.Partition.count_ofSums_zero {n : ℕ} {l : Multiset ℕ} (hl : l.sum = n) :

Multiset.count 0 (ofSums n l hl).parts = 0

instance Nat.Partition.instFintype (n : ℕ) :

Fintype n.Partition

Show there are finitely many partitions by considering the surjection from compositions to partitions.

Equations

Nat.Partition.instFintype n = Fintype.ofSurjective (Nat.Partition.ofComposition n) ⋯

def Nat.Partition.odds (n : ℕ) :

Finset n.Partition

The finset of those partitions in which every part is odd.

Equations

Nat.Partition.odds n = Finset.filter (fun (c : n.Partition) => ∀ i ∈ c.parts, ¬Even i) Finset.univ

def Nat.Partition.distincts (n : ℕ) :

Finset n.Partition

The finset of those partitions in which each part is used at most once.

Equations

Nat.Partition.distincts n = Finset.filter (fun (c : n.Partition) => c.parts.Nodup) Finset.univ

def Nat.Partition.oddDistincts (n : ℕ) :

Finset n.Partition

The finset of those partitions in which every part is odd and used at most once.

Equations

Nat.Partition.oddDistincts n = Nat.Partition.odds n ∩ Nat.Partition.distincts n