I'm struggling a little to come up with a notion of membership proof for `Data.AVL`

trees. I would like to be able to pass around a value of type `n ∈ m`

, to mean that n appears as a key in in the AVL tree, so that given such a proof, `get n m`

can always successfully yield a value associated with n. You can assume my AVL trees always contain values drawn from a join semilattice (A, ∨, ⊥) over a setoid (A, ≈), although below the idempotence is left implicit.

```
module Temp where
open import Algebra.FunctionProperties
open import Algebra.Structures renaming (IsCommutativeMonoid to IsCM)
open import Data.AVL
open import Data.List
open import Data.Nat hiding (_⊔_)
import Data.Nat.Properties as ℕ-Prop
open import Data.Product hiding (_-×-_)
open import Function
open import Level
open import Relation.Binary renaming (IsEquivalence to IsEq)
open import Relation.Binary.PropositionalEquality
module ℕ-AVL {v} (V : Set v)
= Data.AVL (const V) (StrictTotalOrder.isStrictTotalOrder ℕ-Prop.strictTotalOrder)
data ≈-List {a ℓ : Level} {A : Set a} (_≈_ : Rel A ℓ) : Rel (List A) (a ⊔ ℓ) where
[] : ≈-List _≈_ [] []
_∷_ : {x y : A} {xs ys : List A} → (x≈y : x ≈ y) → (xs≈ys : ≈-List _≈_ xs ys) → ≈-List _≈_ (x ∷ xs) (y ∷ ys)
_-×-_ : {a b c d ℓ₁ ℓ₂ : Level} {A : Set a} {B : Set b} {C : Set c} {D : Set d} →
REL A C ℓ₁ → REL B D ℓ₂ → A × B → C × D → Set (ℓ₁ ⊔ ℓ₂)
(R -×- S) (a , b) (c , d) = R a c × S b d
-- Two AVL trees are equal iff they have equal toList images.
≈-AVL : {a ℓ : Level} {A : Set a} → Rel A ℓ → Rel (ℕ-AVL.Tree A) (a ⊔ ℓ)
≈-AVL _≈_ = ≈-List ( _≡_ -×- _≈_ ) on (ℕ-AVL.toList _)
_∈_ : {a ℓ : Level} {A : Set a} {_≈_ : Rel A ℓ} {_∨_ : Op₂ A} {⊥ : A}
{{_ : IsCM _≈_ _∨_ ⊥}} → ℕ → ℕ-AVL.Tree A → Set (a ⊔ ℓ)
n ∈ m = {!!}
get : {a ℓ : Level} {A : Set a} {_≈_ : Rel A ℓ} {_∨_ : Op₂ A} {⊥ : A} →
{{_ : IsCM _≈_ _∨_ ⊥}} → (n : ℕ) → (m : ℕ-AVL.Tree A) → n ∈ m → A
get n m n∈m = {!!}
```

I feel like this should be easy, but I'm finding it hard. One option would be to use my notion of equivalence for AVL-trees, which says that two trees are equal iff they have the same `toList`

image, and exploit the commutative monoid over A, defining

n ∈ m = ≈-AVL *≈* m (ℕ-AVL.unionWith _ *∨* m (ℕ-AVL.singleton _ n ⊥))

This essentially says that m contains n iff the singleton map (n, ⊥) is "below" m in the partial order induced by the commutative monoid (technically we need the idempotence for this interpretation to make sense). However given such a definition I'm not at all sure how to implement `get`

.

I have also experimented with defining my own inductive ∈ relation but found that hard as I seemed to end up having to know about the complicated internal indices used by `Data.AVL`

.

Finally I also tried using a value of type `n ∈? m ≡ true`

, where *∈?* is defined in `Data.AVL`

, but didn't have much success there either. I would appreciate any suggestions.