open import Level renaming (suc to succ ; zero to Zero ) module stack where open import Relation.Binary.PropositionalEquality open import Relation.Binary.Core open import Data.Nat ex : 1 + 2 ≡ 3 ex = refl data Bool {n : Level } : Set n where True : Bool False : Bool record _∧_ {n : Level } (a : Set n) (b : Set n): Set n where field pi1 : a pi2 : b data Maybe {n : Level } (a : Set n) : Set n where Nothing : Maybe a Just : a -> Maybe a record StackMethods {n m : Level } (a : Set n ) {t : Set m }(stackImpl : Set n ) : Set (m Level.⊔ n) where field push : stackImpl -> a -> (stackImpl -> t) -> t pop : stackImpl -> (stackImpl -> Maybe a -> t) -> t pop2 : stackImpl -> (stackImpl -> Maybe a -> Maybe a -> t) -> t get : stackImpl -> (stackImpl -> Maybe a -> t) -> t get2 : stackImpl -> (stackImpl -> Maybe a -> Maybe a -> t) -> t clear : stackImpl -> (stackImpl -> t) -> t open StackMethods record Stack {n m : Level } (a : Set n ) {t : Set m } (si : Set n ) : Set (m Level.⊔ n) where field stack : si stackMethods : StackMethods {n} {m} a {t} si pushStack : a -> (Stack a si -> t) -> t pushStack d next = push (stackMethods ) (stack ) d (\s1 -> next (record {stack = s1 ; stackMethods = stackMethods } )) popStack : (Stack a si -> Maybe a -> t) -> t popStack next = pop (stackMethods ) (stack ) (\s1 d1 -> next (record {stack = s1 ; stackMethods = stackMethods }) d1 ) pop2Stack : (Stack a si -> Maybe a -> Maybe a -> t) -> t pop2Stack next = pop2 (stackMethods ) (stack ) (\s1 d1 d2 -> next (record {stack = s1 ; stackMethods = stackMethods }) d1 d2) getStack : (Stack a si -> Maybe a -> t) -> t getStack next = get (stackMethods ) (stack ) (\s1 d1 -> next (record {stack = s1 ; stackMethods = stackMethods }) d1 ) get2Stack : (Stack a si -> Maybe a -> Maybe a -> t) -> t get2Stack next = get2 (stackMethods ) (stack ) (\s1 d1 d2 -> next (record {stack = s1 ; stackMethods = stackMethods }) d1 d2) clearStack : (Stack a si -> t) -> t clearStack next = clear (stackMethods ) (stack ) (\s1 -> next (record {stack = s1 ; stackMethods = stackMethods } )) open Stack {-- data Element {n : Level } (a : Set n) : Set n where cons : a -> Maybe (Element a) -> Element a datum : {n : Level } {a : Set n} -> Element a -> a datum (cons a _) = a next : {n : Level } {a : Set n} -> Element a -> Maybe (Element a) next (cons _ n) = n --} -- cannot define recrusive record definition. so use linked list with maybe. record Element {l : Level} (a : Set l) : Set l where inductive constructor cons field datum : a -- `data` is reserved by Agda. next : Maybe (Element a) open Element record SingleLinkedStack {n : Level } (a : Set n) : Set n where field top : Maybe (Element a) open SingleLinkedStack pushSingleLinkedStack : {n m : Level } {t : Set m } {Data : Set n} -> SingleLinkedStack Data -> Data -> (Code : SingleLinkedStack Data -> t) -> t pushSingleLinkedStack stack datum next = next stack1 where element = cons datum (top stack) stack1 = record {top = Just element} popSingleLinkedStack : {n m : Level } {t : Set m } {a : Set n} -> SingleLinkedStack a -> (Code : SingleLinkedStack a -> (Maybe a) -> t) -> t popSingleLinkedStack stack cs with (top stack) ... | Nothing = cs stack Nothing ... | Just d = cs stack1 (Just data1) where data1 = datum d stack1 = record { top = (next d) } pop2SingleLinkedStack : {n m : Level } {t : Set m } {a : Set n} -> SingleLinkedStack a -> (Code : SingleLinkedStack a -> (Maybe a) -> (Maybe a) -> t) -> t pop2SingleLinkedStack {n} {m} {t} {a} stack cs with (top stack) ... | Nothing = cs stack Nothing Nothing ... | Just d = pop2SingleLinkedStack' {n} {m} stack cs where pop2SingleLinkedStack' : {n m : Level } {t : Set m } -> SingleLinkedStack a -> (Code : SingleLinkedStack a -> (Maybe a) -> (Maybe a) -> t) -> t pop2SingleLinkedStack' stack cs with (next d) ... | Nothing = cs stack Nothing Nothing ... | Just d1 = cs (record {top = (next d1)}) (Just (datum d)) (Just (datum d1)) getSingleLinkedStack : {n m : Level } {t : Set m } {a : Set n} -> SingleLinkedStack a -> (Code : SingleLinkedStack a -> (Maybe a) -> t) -> t getSingleLinkedStack stack cs with (top stack) ... | Nothing = cs stack Nothing ... | Just d = cs stack (Just data1) where data1 = datum d get2SingleLinkedStack : {n m : Level } {t : Set m } {a : Set n} -> SingleLinkedStack a -> (Code : SingleLinkedStack a -> (Maybe a) -> (Maybe a) -> t) -> t get2SingleLinkedStack {n} {m} {t} {a} stack cs with (top stack) ... | Nothing = cs stack Nothing Nothing ... | Just d = get2SingleLinkedStack' {n} {m} stack cs where get2SingleLinkedStack' : {n m : Level} {t : Set m } -> SingleLinkedStack a -> (Code : SingleLinkedStack a -> (Maybe a) -> (Maybe a) -> t) -> t get2SingleLinkedStack' stack cs with (next d) ... | Nothing = cs stack Nothing Nothing ... | Just d1 = cs stack (Just (datum d)) (Just (datum d1)) clearSingleLinkedStack : {n m : Level } {t : Set m } {a : Set n} -> SingleLinkedStack a -> (SingleLinkedStack a -> t) -> t clearSingleLinkedStack stack next = next (record {top = Nothing}) emptySingleLinkedStack : {n : Level } {a : Set n} -> SingleLinkedStack a emptySingleLinkedStack = record {top = Nothing} ----- -- Basic stack implementations are specifications of a Stack -- singleLinkedStackSpec : {n m : Level } {t : Set m } {a : Set n} -> StackMethods {n} {m} a {t} (SingleLinkedStack a) singleLinkedStackSpec = record { push = pushSingleLinkedStack ; pop = popSingleLinkedStack ; pop2 = pop2SingleLinkedStack ; get = getSingleLinkedStack ; get2 = get2SingleLinkedStack ; clear = clearSingleLinkedStack } createSingleLinkedStack : {n m : Level } {t : Set m } {a : Set n} -> Stack {n} {m} a {t} (SingleLinkedStack a) createSingleLinkedStack = record { stack = emptySingleLinkedStack ; stackMethods = singleLinkedStackSpec }