module stack-subtype-sample where open import Level renaming (suc to S ; zero to O) open import Function open import Data.Nat open import Data.Maybe open import Relation.Binary.PropositionalEquality open import stack-subtype @$\mathbb{N}$@ open import subtype Context as N open import subtype Meta as M record Num : Set where field num : @$\mathbb{N}$@ instance NumIsNormalDataSegment : N.DataSegment Num NumIsNormalDataSegment = record { get = (\c @$\rightarrow$@ record { num = Context.n c}) ; set = (\c n @$\rightarrow$@ record c {n = Num.num n})} NumIsMetaDataSegment : M.DataSegment Num NumIsMetaDataSegment = record { get = (\m @$\rightarrow$@ record {num = Context.n (Meta.context m)}) ; set = (\m n @$\rightarrow$@ record m {context = record (Meta.context m) {n = Num.num n}})} plus3 : Num @$\rightarrow$@ Num plus3 record { num = n } = record {num = n + 3} plus3CS : N.CodeSegment Num Num plus3CS = N.cs plus3 plus5AndPushWithPlus3 : {mc : Meta} {{_ : N.DataSegment Num}} @$\rightarrow$@ M.CodeSegment Num (Meta) plus5AndPushWithPlus3 {mc} {{nn}} = M.cs (\n @$\rightarrow$@ record {context = con n ; nextCS = (liftContext {{nn}} {{nn}} plus3CS) ; stack = st} ) where co = Meta.context mc con : Num @$\rightarrow$@ Context con record { num = num } = N.DataSegment.set nn co record {num = num + 5} st = Meta.stack mc push-sample : {{_ : N.DataSegment Num}} {{_ : M.DataSegment Num}} @$\rightarrow$@ Meta push-sample {{nd}} {{md}} = M.exec {{md}} (plus5AndPushWithPlus3 {mc} {{nd}}) mc where con = record { n = 4 ; element = just 0} code = N.cs (\c @$\rightarrow$@ c) mc = record {context = con ; stack = emptySingleLinkedStack ; nextCS = code} push-sample-equiv : push-sample @$\equiv$@ record { nextCS = liftContext plus3CS ; stack = record { top = nothing} ; context = record { n = 9} } push-sample-equiv = refl pushed-sample : {m : Meta} {{_ : N.DataSegment Num}} {{_ : M.DataSegment Num}} @$\rightarrow$@ Meta pushed-sample {m} {{nd}} {{md}} = M.exec {{md}} (M.csComp {m} {{md}} pushSingleLinkedStackCS (plus5AndPushWithPlus3 {mc} {{nd}})) mc where con = record { n = 4 ; element = just 0} code = N.cs (\c @$\rightarrow$@ c) mc = record {context = con ; stack = emptySingleLinkedStack ; nextCS = code} pushed-sample-equiv : {m : Meta} @$\rightarrow$@ pushed-sample {m} @$\equiv$@ record { nextCS = liftContext plus3CS ; stack = record { top = just (cons 0 nothing) } ; context = record { n = 12} } pushed-sample-equiv = refl pushNum : N.CodeSegment Context Context pushNum = N.cs pn where pn : Context @$\rightarrow$@ Context pn record { n = n } = record { n = pred n ; element = just n} pushOnce : Meta @$\rightarrow$@ Meta pushOnce m = M.exec pushSingleLinkedStackCS m n-push : {m : Meta} {{_ : M.DataSegment Meta}} (n : @$\mathbb{N}$@) @$\rightarrow$@ M.CodeSegment Meta Meta n-push {{mm}} (zero) = M.cs {{mm}} {{mm}} id n-push {m} {{mm}} (suc n) = M.cs {{mm}} {{mm}} (\m @$\rightarrow$@ M.exec {{mm}} {{mm}} (n-push {m} {{mm}} n) (pushOnce m)) popOnce : Meta @$\rightarrow$@ Meta popOnce m = M.exec popSingleLinkedStackCS m n-pop : {m : Meta} {{_ : M.DataSegment Meta}} (n : @$\mathbb{N}$@) @$\rightarrow$@ M.CodeSegment Meta Meta n-pop {{mm}} (zero) = M.cs {{mm}} {{mm}} id n-pop {m} {{mm}} (suc n) = M.cs {{mm}} {{mm}} (\m @$\rightarrow$@ M.exec {{mm}} {{mm}} (n-pop {m} {{mm}} n) (popOnce m)) initMeta : @$\mathbb{N}$@ @$\rightarrow$@ Maybe @$\mathbb{N}$@ @$\rightarrow$@ N.CodeSegment Context Context @$\rightarrow$@ Meta initMeta n mn code = record { context = record { n = n ; element = mn} ; stack = emptySingleLinkedStack ; nextCS = code } n-push-cs-exec = M.exec (n-push {meta} 3) meta where meta = (initMeta 5 (just 9) pushNum) n-push-cs-exec-equiv : n-push-cs-exec @$\equiv$@ record { nextCS = pushNum ; context = record {n = 2 ; element = just 3} ; stack = record {top = just (cons 4 (just (cons 5 (just (cons 9 nothing)))))}} n-push-cs-exec-equiv = refl n-pop-cs-exec = M.exec (n-pop {meta} 4) meta where meta = record { nextCS = N.cs id ; context = record { n = 0 ; element = nothing} ; stack = record {top = just (cons 9 (just (cons 8 (just (cons 7 (just (cons 6 (just (cons 5 nothing)))))))))} } n-pop-cs-exec-equiv : n-pop-cs-exec @$\equiv$@ record { nextCS = N.cs id ; context = record { n = 0 ; element = just 6} ; stack = record { top = just (cons 5 nothing)} } n-pop-cs-exec-equiv = refl open @$\equiv$@-Reasoning id-meta : @$\mathbb{N}$@ @$\rightarrow$@ @$\mathbb{N}$@ @$\rightarrow$@ SingleLinkedStack @$\mathbb{N}$@ @$\rightarrow$@ Meta id-meta n e s = record { context = record {n = n ; element = just e} ; nextCS = (N.cs id) ; stack = s} exec-comp : (f g : M.CodeSegment Meta Meta) (m : Meta) @$\rightarrow$@ M.exec (M.csComp {m} f g) m @$\equiv$@ M.exec f (M.exec g m) exec-comp (M.cs x) (M.cs _) m = refl push-pop-type : @$\mathbb{N}$@ @$\rightarrow$@ @$\mathbb{N}$@ @$\rightarrow$@ @$\mathbb{N}$@ @$\rightarrow$@ Element @$\mathbb{N}$@ @$\rightarrow$@ Set@$\text{1}$@ push-pop-type n e x s = M.exec (M.csComp {meta} (M.cs popOnce) (M.cs pushOnce)) meta @$\equiv$@ meta where meta = id-meta n e record {top = just (cons x (just s))} push-pop : (n e x : @$\mathbb{N}$@) @$\rightarrow$@ (s : Element @$\mathbb{N}$@) @$\rightarrow$@ push-pop-type n e x s push-pop n e x s = refl pop-n-push-type : @$\mathbb{N}$@ @$\rightarrow$@ @$\mathbb{N}$@ @$\rightarrow$@ @$\mathbb{N}$@ @$\rightarrow$@ SingleLinkedStack @$\mathbb{N}$@ @$\rightarrow$@ Set@$\text{1}$@ pop-n-push-type n cn ce s = M.exec (M.csComp {meta} (M.cs popOnce) (n-push {meta} (suc n))) meta @$\equiv$@ M.exec (n-push {meta} n) meta where meta = id-meta cn ce s pop-n-push : (n cn ce : @$\mathbb{N}$@) @$\rightarrow$@ (s : SingleLinkedStack @$\mathbb{N}$@) @$\rightarrow$@ pop-n-push-type n cn ce s pop-n-push zero cn ce s = refl pop-n-push (suc n) cn ce s = begin M.exec (M.csComp {id-meta cn ce s} (M.cs popOnce) (n-push {id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))})} (suc (suc n)))) (id-meta cn ce s) @$\equiv$@@$\langle$@ refl @$\rangle$@ M.exec (M.csComp {id-meta cn ce s} (M.cs popOnce) (M.csComp {id-meta cn ce s} (n-push {id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))})} (suc n)) (M.cs pushOnce))) (id-meta cn ce s) @$\equiv$@@$\langle$@ exec-comp (M.cs popOnce) (M.csComp {id-meta cn ce s} (n-push {id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))})} (suc n)) (M.cs pushOnce)) (id-meta cn ce s) @$\rangle$@ M.exec (M.cs popOnce) (M.exec (M.csComp {id-meta cn ce s} (n-push {id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))})} (suc n)) (M.cs pushOnce)) (id-meta cn ce s)) @$\equiv$@@$\langle$@ cong (\x @$\rightarrow$@ M.exec (M.cs popOnce) x) (exec-comp (n-push {id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))})} (suc n)) (M.cs pushOnce) (id-meta cn ce s)) @$\rangle$@ M.exec (M.cs popOnce) (M.exec (n-push {id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))})} (suc n))(M.exec (M.cs pushOnce) (id-meta cn ce s))) @$\equiv$@@$\langle$@ refl @$\rangle$@ M.exec (M.cs popOnce) (M.exec (n-push {id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))})} (suc n)) (id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))}))) @$\equiv$@@$\langle$@ sym (exec-comp (M.cs popOnce) (n-push {id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))})} (suc n)) (id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))}))) @$\rangle$@ M.exec (M.csComp {id-meta cn ce s} (M.cs popOnce) (n-push {id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))})} (suc n))) (id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))})) @$\equiv$@@$\langle$@ pop-n-push n cn ce (record {top = just (cons ce (SingleLinkedStack.top s))}) @$\rangle$@ M.exec (n-push n) (id-meta cn ce (record {top = just (cons ce (SingleLinkedStack.top s))})) @$\equiv$@@$\langle$@ refl @$\rangle$@ M.exec (n-push n) (pushOnce (id-meta cn ce s)) @$\equiv$@@$\langle$@ refl @$\rangle$@ M.exec (n-push n) (M.exec (M.cs pushOnce) (id-meta cn ce s)) @$\equiv$@@$\langle$@ refl @$\rangle$@ M.exec (n-push {id-meta cn ce s} (suc n)) (id-meta cn ce s) @$\blacksquare$@ n-push-pop-type : @$\mathbb{N}$@ @$\rightarrow$@ @$\mathbb{N}$@ @$\rightarrow$@ @$\mathbb{N}$@ @$\rightarrow$@ SingleLinkedStack @$\mathbb{N}$@ @$\rightarrow$@ Set@$\text{1}$@ n-push-pop-type n cn ce st = M.exec (M.csComp {meta} (n-pop {meta} n) (n-push {meta} n)) meta @$\equiv$@ meta where meta = id-meta cn ce st n-push-pop : (n cn ce : @$\mathbb{N}$@) @$\rightarrow$@ (s : SingleLinkedStack @$\mathbb{N}$@) @$\rightarrow$@ n-push-pop-type n cn ce s n-push-pop zero cn ce s = refl n-push-pop (suc n) cn ce s = begin M.exec (M.csComp {id-meta cn ce s} (n-pop {id-meta cn ce s} (suc n)) (n-push {id-meta cn ce s} (suc n))) (id-meta cn ce s) @$\equiv$@@$\langle$@ refl @$\rangle$@ M.exec (M.csComp {id-meta cn ce s} (M.cs (\m @$\rightarrow$@ M.exec (n-pop {id-meta cn ce s} n) (popOnce m))) (n-push {id-meta cn ce s} (suc n))) (id-meta cn ce s) @$\equiv$@@$\langle$@ exec-comp (M.cs (\m @$\rightarrow$@ M.exec (n-pop n) (popOnce m))) (n-push {id-meta cn ce s} (suc n)) (id-meta cn ce s) @$\rangle$@ M.exec (M.cs (\m @$\rightarrow$@ M.exec (n-pop {id-meta cn ce s} n) (popOnce m))) (M.exec (n-push {id-meta cn ce s} (suc n)) (id-meta cn ce s)) @$\equiv$@@$\langle$@ refl @$\rangle$@ M.exec (n-pop n) (popOnce (M.exec (n-push {id-meta cn ce s} (suc n)) (id-meta cn ce s))) @$\equiv$@@$\langle$@ refl @$\rangle$@ M.exec (n-pop n) (M.exec (M.cs popOnce) (M.exec (n-push {id-meta cn ce s} (suc n)) (id-meta cn ce s))) @$\equiv$@@$\langle$@ cong (\x @$\rightarrow$@ M.exec (n-pop {id-meta cn ce s} n) x) (sym (exec-comp (M.cs popOnce) (n-push {id-meta cn ce s} (suc n)) (id-meta cn ce s))) @$\rangle$@ M.exec (n-pop n) (M.exec (M.csComp {id-meta cn ce s} (M.cs popOnce) (n-push {id-meta cn ce s} (suc n))) (id-meta cn ce s)) @$\equiv$@@$\langle$@ cong (\x @$\rightarrow$@ M.exec (n-pop {id-meta cn ce s} n) x) (pop-n-push n cn ce s) @$\rangle$@ M.exec (n-pop n) (M.exec (n-push n) (id-meta cn ce s)) @$\equiv$@@$\langle$@ sym (exec-comp (n-pop n) (n-push n) (id-meta cn ce s)) @$\rangle$@ M.exec (M.csComp (n-pop n) (n-push n)) (id-meta cn ce s) @$\equiv$@@$\langle$@ n-push-pop n cn ce s @$\rangle$@ id-meta cn ce s @$\blacksquare$@