I'm having difficulty convincing Agda to termination-check the function `fmap`

below and similar functions defined recursively over the structure of a `Trie`

. A `Trie`

is a trie whose domain is a `Type`

, an object-level type formed from unit, products and fixed points (I've omitted coproducts to keep the code minimal). The problem seems to relate to a type-level substitution I use in the definition of `Trie`

. (The expression `const (μₜ τ) * τ`

means apply the substitution `const (μₜ τ)`

to the type `τ`

.)

```
module Temp where
open import Data.Unit
open import Category.Functor
open import Function
open import Level
open import Relation.Binary
-- A context is just a snoc-list.
data Cxt {𝒂} (A : Set 𝒂) : Set 𝒂 where
ε : Cxt A
_∷ᵣ_ : Cxt A → A → Cxt A
-- Context membership.
data _∈_ {𝒂} {A : Set 𝒂} (a : A) : Cxt A → Set 𝒂 where
here : ∀ {Δ} → a ∈ Δ ∷ᵣ a
there : ∀ {Δ a′} → a ∈ Δ → a ∈ Δ ∷ᵣ a′
infix 3 _∈_
-- Well-formed types, using de Bruijn indices.
data _⊦ (Δ : Cxt ⊤) : Set where
nat : Δ ⊦
𝟏 : Δ ⊦
var : _ ∈ Δ → Δ ⊦
_+_ _⨰_ : Δ ⊦ → Δ ⊦ → Δ ⊦
μ : Δ ∷ᵣ _ ⊦ → Δ ⊦
infix 3 _⊦
-- A closed type.
Type : Set
Type = ε ⊦
-- Type-level substitutions and renamings.
Sub Ren : Rel (Cxt ⊤) zero
Sub Δ Δ′ = _ ∈ Δ → Δ′ ⊦
Ren Δ Δ′ = ∀ {x} → x ∈ Δ → x ∈ Δ′
-- Renaming extension.
extendᵣ : ∀ {Δ Δ′} → Ren Δ Δ′ → Ren (Δ ∷ᵣ _) (Δ′ ∷ᵣ _)
extendᵣ ρ here = here
extendᵣ ρ (there x) = there (ρ x)
-- Lift a type renaming to a type.
_*ᵣ_ : ∀ {Δ Δ′} → Ren Δ Δ′ → Δ ⊦ → Δ′ ⊦
_ *ᵣ nat = nat
_ *ᵣ 𝟏 = 𝟏
ρ *ᵣ (var x) = var (ρ x)
ρ *ᵣ (τ₁ + τ₂) = (ρ *ᵣ τ₁) + (ρ *ᵣ τ₂)
ρ *ᵣ (τ₁ ⨰ τ₂) = (ρ *ᵣ τ₁) ⨰ (ρ *ᵣ τ₂)
ρ *ᵣ (μ τ) = μ (extendᵣ ρ *ᵣ τ)
-- Substitution extension.
extend : ∀ {Δ Δ′} → Sub Δ Δ′ → Sub (Δ ∷ᵣ _) (Δ′ ∷ᵣ _)
extend θ here = var here
extend θ (there x) = there *ᵣ (θ x)
-- Lift a type substitution to a type.
_*_ : ∀ {Δ Δ′} → Sub Δ Δ′ → Δ ⊦ → Δ′ ⊦
θ * nat = nat
θ * 𝟏 = 𝟏
θ * var x = θ x
θ * (τ₁ + τ₂) = (θ * τ₁) + (θ * τ₂)
θ * (τ₁ ⨰ τ₂) = (θ * τ₁) ⨰ (θ * τ₂)
θ * μ τ = μ (extend θ * τ)
data Trie {𝒂} (A : Set 𝒂) : Type → Set 𝒂 where
〈〉 : A → 𝟏 ▷ A
〔_,_〕 : ∀ {τ₁ τ₂} → τ₁ ▷ A → τ₂ ▷ A → τ₁ + τ₂ ▷ A
↑_ : ∀ {τ₁ τ₂} → τ₁ ▷ τ₂ ▷ A → τ₁ ⨰ τ₂ ▷ A
roll : ∀ {τ} → (const (μ τ) * τ) ▷ A → μ τ ▷ A
infixr 5 Trie
syntax Trie A τ = τ ▷ A
{-# NO_TERMINATION_CHECK #-}
fmap : ∀ {a} {A B : Set a} {τ} → (A → B) → τ ▷ A → τ ▷ B
fmap f (〈〉 x) = 〈〉 (f x)
fmap f 〔 σ₁ , σ₂ 〕 = 〔 fmap f σ₁ , fmap f σ₂ 〕
fmap f (↑ σ) = ↑ (fmap (fmap f) σ)
fmap f (roll σ) = roll (fmap f σ)
```

It would seem that `fmap`

recurses into a strictly smaller argument in each case; certainly the product case is fine if I remove recursive types. On the other hand, the definition handles recursive types fine if I remove products.

What's the simplest way to proceed here? The inline/fuse trick does not look particularly applicable, but maybe it is. Or should I be looking for another way to deal with the substitution in the definition of `Trie`

?

`t`

and`s`

are not displaying for me (I get the boxes with hex codepoint). Looks like stackoverflow's CSS has more font choices for the code blocks.6more comments