Mercurial > hg > Members > kono > Proof > category
annotate system-f.agda @ 330:fa018eb1723e
remove module level
author | Shinji KONO <kono@ie.u-ryukyu.ac.jp> |
---|---|
date | Sat, 22 Mar 2014 10:22:25 +0700 |
parents | c4514e0cf0e2 |
children | f385a5821563 |
rev | line source |
---|---|
315 | 1 open import Level |
2 open import Relation.Binary.PropositionalEquality | |
3 | |
330 | 4 module system-f where |
315 | 5 |
330 | 6 Bool : {l : Level} {X : Set l} -> Set l |
7 Bool = \{l : Level} -> \{X : Set l} -> X -> X -> X | |
315 | 8 |
330 | 9 T : {l : Level} {X : Set l} -> Bool {l} {X} |
10 T {l} {X} = \(x y : X) -> x | |
315 | 11 |
330 | 12 F : {l : Level} {X : Set l} -> Bool {l} {X} |
13 F {l} {X} = \(x y : X) -> y | |
315 | 14 |
330 | 15 D : {l : Level} -> {U : Set l} -> U -> U -> Bool {l} {U} -> U |
16 D {l} {U} u v t = t u v | |
315 | 17 |
330 | 18 lemma04 : {l : Level} { U : Set l} {u v : U} -> D {_} {U} u v (T {_} {U} ) ≡ u |
315 | 19 lemma04 = refl |
20 | |
330 | 21 lemma05 : {l : Level} { U : Set l} {u v : U} -> D {_} {U} u v (F {_} {U} ) ≡ v |
315 | 22 lemma05 = refl |
23 | |
321 | 24 _×_ : {l : Level} -> Set l -> Set l -> Set (suc l) |
25 _×_ {l} U V = {X : Set l} -> (U -> V -> X) -> X | |
315 | 26 |
321 | 27 <_,_> : {l : Level} {U V : Set l} -> U -> V -> (U × V) |
28 <_,_> {l} {U} {V} u v = \{X} -> \(x : U -> V -> X) -> x u v | |
315 | 29 |
321 | 30 π1 : {l : Level} {U V : Set l} -> (U × V) -> U |
31 π1 {l} {U} {V} t = t {U} (\(x : U) -> \(y : V) -> x) | |
315 | 32 |
321 | 33 π2 : {l : Level} {U V : Set l} -> (U × V) -> V |
34 π2 {l} {U} {V} t = t {V} (\(x : U) -> \(y : V) -> y) | |
315 | 35 |
330 | 36 lemma06 : {l : Level} {U V : Set l } -> {u : U } -> {v : V} -> π1 ( < u , v > ) ≡ u |
315 | 37 lemma06 = refl |
38 | |
330 | 39 lemma07 : {l : Level} {U V : Set l } -> {u : U } -> {v : V} -> π2 ( < u , v > ) ≡ v |
315 | 40 lemma07 = refl |
41 | |
330 | 42 hoge : {l : Level} {U V : Set l} -> U -> V -> (U × V) |
315 | 43 hoge u v = < u , v > |
44 | |
45 -- lemma08 : (t : U × V) -> < π1 t , π2 t > ≡ t | |
46 -- lemma08 t = {!!} | |
316 | 47 |
48 -- Emp definision is still wrong... | |
49 | |
327 | 50 Emp : {l : Level} {X : Set l} -> Set l |
51 Emp {l} = \{X : Set l} -> X | |
316 | 52 |
327 | 53 -- ε : {l : Level} (U : Set l) {l' : Level} {U' : Set l'} -> Emp -> Emp |
54 -- ε {l} U t = t | |
316 | 55 |
327 | 56 -- lemma09 : {l : Level} {U : Set l} {l' : Level} {U' : Set l} -> (t : Emp {l} {U} ) -> ε U (ε Emp t) ≡ ε U t |
322 | 57 -- lemma09 t = refl |
321 | 58 |
327 | 59 -- lemma10 : {l : Level} {U V X : Set l} -> (t : Emp {_} {U × V}) -> U × V |
60 -- lemma10 {l} {U} {V} t = ε (U × V) t | |
316 | 61 |
327 | 62 -- lemma10' : {l : Level} {U V X : Set l} -> (t : Emp {_} {U × V}) -> Emp |
63 -- lemma10' {l} {U} {V} {X} t = ε (U × V) t | |
64 | |
65 -- lemma100 : {l : Level} {U V X : Set l} -> (t : Emp {_} {U}) -> Emp | |
322 | 66 -- lemma100 {l} {U} {V} t = ε U t |
321 | 67 |
327 | 68 -- lemma101 : {l k : Level} {U V : Set l} -> (t : Emp {_} {U × V}) -> π1 (ε (U × V) t) ≡ ε U t |
322 | 69 -- lemma101 t = refl |
319 | 70 |
327 | 71 -- lemma102 : {l k : Level} {U V : Set l} -> (t : Emp {_} {U × V}) -> π2 (ε (U × V) t) ≡ ε V t |
322 | 72 -- lemma102 t = refl |
321 | 73 |
327 | 74 -- lemma103 : {l : Level} {U V : Set l} -> (u : U) -> (t : Emp {l} {_} ) -> (ε (U -> V) t) u ≡ ε V t |
322 | 75 -- lemma103 u t = refl |
316 | 76 |
330 | 77 _+_ : {l : Level} -> Set l -> Set l -> Set (suc l) |
78 _+_ {l} U V = {X : Set l} -> ( U -> X ) -> (V -> X) -> X | |
316 | 79 |
330 | 80 ι1 : {l : Level } {U V : Set l} -> U -> U + V |
81 ι1 {l} {U} {V} u = \{X} -> \(x : U -> X) -> \(y : V -> X ) -> x u | |
316 | 82 |
330 | 83 ι2 : {l : Level } {U V : Set l} -> V -> U + V |
84 ι2 {l} {U} {V} v = \{X} -> \(x : U -> X) -> \(y : V -> X ) -> y v | |
316 | 85 |
330 | 86 δ : {l : Level} { U V R S : Set l } -> (R -> U) -> (S -> U) -> ( R + S ) -> U |
87 δ {l} {U} {V} {R} {S} u v t = t {U} (\(x : R) -> u x) ( \(y : S) -> v y) | |
316 | 88 |
330 | 89 lemma11 : {l : Level} { U V R S : Set _ } -> (u : R -> U ) (v : S -> U ) -> (r : R) -> δ {l} {U} {V} {R} {S} u v ( ι1 r ) ≡ u r |
316 | 90 lemma11 u v r = refl |
91 | |
330 | 92 lemma12 : {l : Level} { U V R S : Set _ } -> (u : R -> U ) (v : S -> U ) -> (s : S) -> δ {l} {U} {V} {R} {S} u v ( ι2 s ) ≡ v s |
316 | 93 lemma12 u v s = refl |
94 | |
95 | |
322 | 96 _××_ : {l : Level} -> Set (suc l) -> Set l -> Set (suc l) |
97 _××_ {l} U V = {X : Set l} -> (U -> V -> X) -> X | |
98 | |
99 <<_,_>> : {l : Level} {U : Set (suc l) } {V : Set l} -> U -> V -> (U ×× V) | |
100 <<_,_>> {l} {U} {V} u v = \{X} -> \(x : U -> V -> X) -> x u v | |
316 | 101 |
102 | |
330 | 103 Int : {l : Level } { X : Set l } -> Set l |
322 | 104 Int = \{l : Level } -> \{ X : Set l } -> X -> ( X -> X ) -> X |
105 | |
106 Zero : {l : Level } -> { X : Set l } -> Int | |
107 Zero {l} {X} = \(x : X ) -> \(y : X -> X ) -> x | |
108 | |
109 S : {l : Level } -> { X : Set l } -> Int -> Int | |
110 S {l} {X} t = \(x : X) -> \(y : X -> X ) -> y ( t x y ) | |
111 | |
326 | 112 n0 : {l : Level} {X : Set l} -> Int {l} {X} |
113 n0 = Zero | |
114 | |
322 | 115 n1 : {l : Level } -> { X : Set l } -> Int {l} {X} |
116 n1 {l} {X} = \(x : X ) -> \(y : X -> X ) -> y x | |
117 | |
118 n2 : {l : Level } -> { X : Set l } -> Int {l} {X} | |
119 n2 {l} {X} = \(x : X ) -> \(y : X -> X ) -> y (y x) | |
120 | |
323 | 121 n3 : {l : Level } -> { X : Set l } -> Int {l} {X} |
122 n3 {l} {X} = \(x : X ) -> \(y : X -> X ) -> y (y (y x)) | |
123 | |
322 | 124 lemma13 : {l : Level } -> { X : Set l } -> S ( S ( Zero {l} {X}) ) ≡ n2 |
125 lemma13 {l} {X} = refl | |
126 | |
127 It : {l : Level} {U : Set l} -> U -> ( U -> U ) -> Int -> U | |
128 It {l} {U} u f t = t u f | |
316 | 129 |
130 | |
323 | 131 R : {l : Level} { U X : Set l} -> U -> ( U -> Int {l} {X} -> U ) -> Int -> U |
132 R {l} {U} u v t = π1 ( It {suc l} {U × Int} (< u , Zero >) (λ (x : U × Int) → < v (π1 x) (π2 x) , S (π2 x) > ) t ) | |
133 | |
134 sum : {l : Level} {X : Set l} -> Int -> Int {l} {X} -> Int | |
326 | 135 sum x y = It y ( λ z -> S z ) x |
136 | |
137 mul : {l : Level } {X : Set l} -> Int {l} {_} -> Int -> Int {l} {X} | |
138 mul x y = It Zero ( λ (z : Int) -> sum y z ) x | |
324 | 139 |
326 | 140 copyInt : {l : Level } {X : Set l} -> Int {l} {_} -> Int {l} {X} |
141 copyInt x = It Zero ( λ (z : Int) -> S z ) x | |
324 | 142 |
326 | 143 -- fact : {l : Level} {X X' : Set l} -> Int -> Int {l} {_} |
144 -- fact {l} {X} {X'} n = R (S Zero) (λ ( z w : Int) -> mul {l} {_} z (S w) ) n | |
145 | |
146 -- lemma13' : fact n3 ≡ mul n1 ( mul n2 n3) | |
147 -- lemma13' = refl | |
324 | 148 |
149 -- lemma14 : (x y : Int) -> mul x y ≡ mul y x | |
326 | 150 -- lemma14 x y = It {!!} {!!} {!!} |
323 | 151 |
326 | 152 lemma15 : {l : Level} {X : Set l} (x y : Int {l} {X}) -> mul {l} {X} n2 n3 ≡ mul {l} {X} n3 n2 |
324 | 153 lemma15 x y = refl |
323 | 154 |
324 | 155 lemma16 : {l : Level} {X U : Set l} -> (u : U ) -> (v : U -> Int {l} {X} -> U ) -> R u v Zero ≡ u |
156 lemma16 u v = refl | |
157 | |
158 -- lemma17 : {l : Level} {X U : Set l} -> (u : U ) -> (v : U -> Int -> U ) -> (t : Int ) -> R u v (S t) ≡ v ( R u v t ) t | |
159 -- lemma17 u v t = refl | |
160 | |
161 -- postulate lemma17 : {l : Level} {X U : Set l} -> (u : U ) -> (v : U -> Int -> U ) -> (t : Int ) -> R u v (S t) ≡ v ( R u v t ) t | |
316 | 162 |
330 | 163 List : {l : Level} {U X : Set l} -> Set l |
164 List = \{l : Level} -> \{ U X : Set l} -> X -> ( U -> X -> X ) -> X | |
323 | 165 |
325 | 166 Nil : {l : Level} {U : Set l} {X : Set l} -> List {l} {U} {X} |
167 Nil {l} {U} {X} = \(x : X) -> \(y : U -> X -> X) -> x | |
168 | |
169 Cons : {l : Level} {U : Set l} {X : Set l} -> U -> List {l} {U} {X} -> List {l} {U} {X} | |
170 Cons {l} {U} {X} u t = \(x : X) -> \(y : U -> X -> X) -> y u (t x y ) | |
171 | |
328 | 172 l0 : {l : Level} {X X' : Set l} -> List {l} {Int {l} {X}} {X'} |
325 | 173 l0 = Nil |
174 | |
328 | 175 l1 : {l : Level} {X X' : Set l} -> List {l} {Int {l} {X}} {X'} |
325 | 176 l1 = Cons n1 Nil |
177 | |
328 | 178 l2 : {l : Level} {X X' : Set l} -> List {l} {Int {l} {X}} {X'} |
325 | 179 l2 = Cons n2 l1 |
323 | 180 |
330 | 181 l3 : {l : Level} {X X' : Set l} -> List {l} {Int {l} {X}} {X'} |
182 l3 = Cons n3 l2 | |
183 | |
325 | 184 ListIt : {l : Level} {U W X : Set l} -> W -> ( U -> W -> W ) -> List {l} {U} {W} -> W |
185 ListIt {l} {U} {W} {X} w f t = t w f | |
323 | 186 |
330 | 187 Nullp : {l : Level} {U : Set (suc l)} { X : Set (suc l)} -> List {suc l} {U} {Bool {_} {X}} -> Bool {_} {_} |
325 | 188 Nullp {l} {U} {X} list = ListIt {suc l} {U} {Bool} {X} T (\u w -> F) list |
189 | |
326 | 190 Append : {l : Level} {U : Set l} {X : Set l} -> List {l} {U} {_} -> List {l} {U} {X} -> List {l} {U} {_} |
328 | 191 Append {l} {U} {X} x y = \s t -> x (y s t) t |
325 | 192 |
329
c4514e0cf0e2
no yellow on append example
Shinji KONO <kono@ie.u-ryukyu.ac.jp>
parents:
328
diff
changeset
|
193 lemma18 :{l : Level} {U : Set l} {X : Set l} -> Append {l} {Int {l} {U}} {X} l1 l2 ≡ Cons n1 (Cons n2 (Cons n1 Nil)) |
328 | 194 lemma18 = refl |
326 | 195 |
330 | 196 Reverse : {l : Level} {U : Set l} {X : Set l} -> List {l} {U} {_} -> List {l} {U} {X} |
197 Reverse {l} {U} {X} x = ListIt {l} {U} {List {l} {U} {_}} {X} Nil ( \u w -> Append w (Cons u Nil) ) x | |
198 | |
199 lemma19 :{l : Level} {U : Set l} {X : Set l} -> Reverse {l} {Int {l} {U}} {X} l3 ≡ Cons n1 (Cons n2 (Cons n3 Nil)) | |
200 lemma19 = refl | |
201 | |
325 | 202 Tree = \{l : Level} -> \{ U X : Set l} -> X -> ( (U -> X) -> X ) -> X |
203 | |
204 NilTree : {l : Level} {U : Set l} {X : Set l} -> Tree {l} {U} {X} | |
205 NilTree {l} {U} {X} = \(x : X) -> \(y : (U -> X) -> X) -> x | |
206 | |
207 Collect : {l : Level} {U : Set l} {X : Set l} -> (U -> X -> ((U -> X) -> X) -> X ) -> Tree {l} {U} {X} | |
208 Collect {l} {U} {X} f = \(x : X) -> \(y : (U -> X) -> X) -> y (\(z : U) -> f z x y ) | |
209 | |
210 TreeIt : {l : Level} {U W X : Set l} -> W -> ( (U -> W) -> W ) -> Tree {l} {U} {W} -> W | |
211 TreeIt {l} {U} {W} {X} w h t = t w h |