# HG changeset patch # User oheimb # Date 1081765128 -7200 # Node ID 7cb26928e70d0d678707bf6b62b991e30bc70271 # Parent 7a46bdcd92f2ca30a2a79743764ee3387563d150 added Streams.thy (with stream concatenation etc.) diff -r 7a46bdcd92f2 -r 7cb26928e70d src/HOLCF/FOCUS/Fstream.thy --- a/src/HOLCF/FOCUS/Fstream.thy Fri Apr 09 16:31:15 2004 +0200 +++ b/src/HOLCF/FOCUS/Fstream.thy Mon Apr 12 12:18:48 2004 +0200 @@ -8,7 +8,7 @@ (* FOCUS flat streams *) -Fstream = Stream + +Fstream = Streams + default type diff -r 7a46bdcd92f2 -r 7cb26928e70d src/HOLCF/FOCUS/ROOT.ML --- a/src/HOLCF/FOCUS/ROOT.ML Fri Apr 09 16:31:15 2004 +0200 +++ b/src/HOLCF/FOCUS/ROOT.ML Mon Apr 12 12:18:48 2004 +0200 @@ -9,7 +9,5 @@ val banner = "HOLCF/FOCUS"; writeln banner; -path_add "~~/src/HOLCF/ex"; - use_thy "FOCUS"; use_thy "Buffer_adm"; diff -r 7a46bdcd92f2 -r 7cb26928e70d src/HOLCF/IsaMakefile --- a/src/HOLCF/IsaMakefile Fri Apr 09 16:31:15 2004 +0200 +++ b/src/HOLCF/IsaMakefile Mon Apr 12 12:18:48 2004 +0200 @@ -38,7 +38,8 @@ Ssum1.thy Ssum2.ML Ssum2.thy Ssum3.ML Ssum3.thy Tr.ML Tr.thy Up1.ML \ Up1.thy Up2.ML Up2.thy Up3.ML Up3.thy adm.ML cont_consts.ML \ domain/axioms.ML domain/extender.ML domain/interface.ML \ - domain/library.ML domain/syntax.ML domain/theorems.ML holcf_logic.ML + domain/library.ML domain/syntax.ML domain/theorems.ML holcf_logic.ML \ + ex/Stream.thy ex/Stream.ML Streams.thy @$(ISATOOL) usedir -b -r $(OUT)/HOL HOLCF @@ -58,7 +59,7 @@ $(LOG)/HOLCF-ex.gz: $(OUT)/HOLCF ex/Dagstuhl.ML ex/Dagstuhl.thy \ ex/Dnat.thy ex/Fix2.ML ex/Fix2.thy ex/Focus_ex.ML \ ex/Focus_ex.thy ex/Hoare.ML ex/Hoare.thy ex/Loop.ML ex/Loop.thy \ - ex/ROOT.ML ex/Stream.ML ex/Stream.thy ex/loeckx.ML \ + ex/ROOT.ML ex/loeckx.ML \ ../HOL/Library/Nat_Infinity.thy @$(ISATOOL) usedir $(OUT)/HOLCF ex diff -r 7a46bdcd92f2 -r 7cb26928e70d src/HOLCF/ROOT.ML --- a/src/HOLCF/ROOT.ML Fri Apr 09 16:31:15 2004 +0200 +++ b/src/HOLCF/ROOT.ML Mon Apr 12 12:18:48 2004 +0200 @@ -24,4 +24,7 @@ use "domain/extender.ML"; use "domain/interface.ML"; +path_add "~~/src/HOLCF/ex"; +use_thy "Streams"; + print_depth 10; diff -r 7a46bdcd92f2 -r 7cb26928e70d src/HOLCF/Streams.thy --- /dev/null Thu Jan 01 00:00:00 1970 +0000 +++ b/src/HOLCF/Streams.thy Mon Apr 12 12:18:48 2004 +0200 @@ -0,0 +1,565 @@ +(* Title: HOLCF/Streams.thy + ID: $Id$ + Author: Borislav Gajanovic and David von Oheimb + License: GPL (GNU GENERAL PUBLIC LICENSE) + +Stream domains with concatenation. +TODO: HOLCF/ex/Stream.* should be integrated into this file. +*) + +theory Streams = Stream : + +(* ----------------------------------------------------------------------- *) + +lemma stream_neq_UU: "x~=UU ==> EX a as. x=a&&as & a~=UU" +by (simp add: stream_exhaust_eq,auto) + +lemma stream_prefix1: "[| x< x&&xs << y&&ys" +by (insert stream_prefix' [of y "x&&xs" ys],force) + +lemma stream_take_le_mono : "k<=n ==> stream_take k$s1 << stream_take n$s1" +apply (insert chain_stream_take [of s1]) +by (drule chain_mono3,auto) + +lemma mono_stream_take: "s1 << s2 ==> stream_take n$s1 << stream_take n$s2" +by (simp add: monofun_cfun_arg) + +lemma stream_take_prefix [simp]: "stream_take n$s << s" +apply (subgoal_tac "s=(LUB n. stream_take n$s)") + apply (erule ssubst, rule is_ub_thelub) + apply (simp only: chain_stream_take) +by (simp only: stream_reach2) + +lemma stream_take_take_less:"stream_take k$(stream_take n$s) << stream_take k$s" +by (rule monofun_cfun_arg,auto) + +(* ----------------------------------------------------------------------- *) + +lemma slen_rt_mono: "#s2 <= #s1 ==> #(rt$s2) <= #(rt$s1)" +apply (rule stream.casedist [of s1]) + apply (rule stream.casedist [of s2],simp+) +by (rule stream.casedist [of s2],auto) + +lemma slen_take_lemma4 [rule_format]: + "!s. stream_take n$s ~= s --> #(stream_take n$s) = Fin n" +apply (induct_tac n,auto simp add: Fin_0) +apply (case_tac "s=UU",simp) +by (drule stream_neq_UU,auto) + +lemma slen_take_lemma5: "#(stream_take n$s) <= Fin n"; +apply (case_tac "stream_take n$s = s") + apply (simp add: slen_take_eq_rev) +by (simp add: slen_take_lemma4) + +lemma stream_take_idempotent [simp]: + "stream_take n$(stream_take n$s) = stream_take n$s" +apply (case_tac "stream_take n$s = s") +apply (auto,insert slen_take_lemma4 [of n s]); +by (auto,insert slen_take_lemma1 [of "stream_take n$s" n],simp) + +lemma stream_take_take_Suc [simp]: "stream_take n$(stream_take (Suc n)$s) = + stream_take n$s" +apply (simp add: po_eq_conv,auto) + apply (simp add: stream_take_take_less) +apply (subgoal_tac "stream_take n$s = stream_take n$(stream_take n$s)") + apply (erule ssubst) + apply (rule_tac monofun_cfun_arg) + apply (insert chain_stream_take [of s]) +by (simp add: chain_def,simp) + +lemma mono_stream_take_pred: + "stream_take (Suc n)$s1 << stream_take (Suc n)$s2 ==> + stream_take n$s1 << stream_take n$s2" +by (drule mono_stream_take [of _ _ n],simp) + +lemma stream_take_lemma10 [rule_format]: + "ALL k<=n. stream_take n$s1 << stream_take n$s2 + --> stream_take k$s1 << stream_take k$s2" +apply (induct_tac n,simp,clarsimp) +apply (case_tac "k=Suc n",blast) +apply (erule_tac x="k" in allE) +by (drule mono_stream_take_pred,simp) + +lemma stream_take_finite [simp]: "stream_finite (stream_take n$s)" +apply (simp add: stream.finite_def) +by (rule_tac x="n" in exI,simp) + +lemma slen_stream_take_finite [simp]: "#(stream_take n$s) ~= \" +by (simp add: slen_def) + +lemma stream_take_Suc_neq: "stream_take (Suc n)$s ~=s ==> + stream_take n$s ~= stream_take (Suc n)$s" +apply auto +apply (subgoal_tac "stream_take n$s ~=s") + apply (insert slen_take_lemma4 [of n s],auto) +apply (rule stream.casedist [of s],simp) +apply (simp add: inat_defs split:inat_splits) +by (simp add: slen_take_lemma4) + + +(* ----------------------------------------------------------------------- *) + +consts + + i_rt :: "nat => 'a stream => 'a stream" (* chops the first i elements *) + i_th :: "nat => 'a stream => 'a" (* the i-th element *) + + sconc :: "'a stream => 'a stream => 'a stream" (infixr "ooo" 65) + constr_sconc :: "'a stream => 'a stream => 'a stream" (* constructive *) + constr_sconc' :: "nat => 'a stream => 'a stream => 'a stream" + +defs + i_rt_def: "i_rt == %i s. iterate i rt s" + i_th_def: "i_th == %i s. ft$(i_rt i s)" + + sconc_def: "s1 ooo s2 == case #s1 of + Fin n => (SOME s. (stream_take n$s=s1) & (i_rt n s = s2)) + | \ => s1" + + constr_sconc_def: "constr_sconc s1 s2 == case #s1 of + Fin n => constr_sconc' n s1 s2 + | \ => s1" +primrec + constr_sconc'_0: "constr_sconc' 0 s1 s2 = s2" + constr_sconc'_Suc: "constr_sconc' (Suc n) s1 s2 = ft$s1 && + constr_sconc' n (rt$s1) s2" + + +(* ----------------------------------------------------------------------- *) + section "i_rt" +(* ----------------------------------------------------------------------- *) + +lemma i_rt_UU [simp]: "i_rt n UU = UU" +apply (simp add: i_rt_def) +by (rule iterate.induct,auto) + +lemma i_rt_0 [simp]: "i_rt 0 s = s" +by (simp add: i_rt_def) + +lemma i_rt_Suc [simp]: "a ~= UU ==> i_rt (Suc n) (a&&s) = i_rt n s" +by (simp add: i_rt_def iterate_Suc2 del: iterate_Suc) + +lemma i_rt_Suc_forw: "i_rt (Suc n) s = i_rt n (rt$s)" +by (simp only: i_rt_def iterate_Suc2) + +lemma i_rt_Suc_back:"i_rt (Suc n) s = rt$(i_rt n s)" +by (simp only: i_rt_def,auto) + +lemma i_rt_mono: "x << s ==> i_rt n x << i_rt n s" +by (simp add: i_rt_def monofun_rt_mult) + +lemma i_rt_ij_lemma: "Fin (i + j) <= #x ==> Fin j <= #(i_rt i x)" +by (simp add: i_rt_def slen_rt_mult) + +lemma slen_i_rt_mono: "#s2 <= #s1 ==> #(i_rt n s2) <= #(i_rt n s1)" +apply (induct_tac n,auto) +apply (simp add: i_rt_Suc_back) +by (drule slen_rt_mono,simp) + +lemma i_rt_take_lemma1 [rule_format]: "ALL s. i_rt n (stream_take n$s) = UU" +apply (induct_tac n); + apply (simp add: i_rt_Suc_back,auto) +apply (case_tac "s=UU",auto) +by (drule stream_neq_UU,simp add: i_rt_Suc_forw,auto) + +lemma i_rt_slen: "(i_rt n s = UU) = (stream_take n$s = s)" +apply auto + apply (insert i_rt_ij_lemma [of n "Suc 0" s]); + apply (subgoal_tac "#(i_rt n s)=0") + apply (case_tac "stream_take n$s = s",simp+) + apply (insert slen_take_eq [of n s],simp) + apply (simp add: inat_defs split:inat_splits) + apply (simp add: slen_take_eq ) +by (simp, insert i_rt_take_lemma1 [of n s],simp) + +lemma i_rt_lemma_slen: "#s=Fin n ==> i_rt n s = UU" +by (simp add: i_rt_slen slen_take_lemma1) + +lemma stream_finite_i_rt [simp]: "stream_finite (i_rt n s) = stream_finite s" +apply (induct_tac n, auto) + apply (rule stream.casedist [of "s"], auto simp del: i_rt_Suc) +by (simp add: i_rt_Suc_back stream_finite_rt_eq)+ + +lemma take_i_rt_len_lemma: "ALL sl x j t. Fin sl = #x & n <= sl & + #(stream_take n$x) = Fin t & #(i_rt n x)= Fin j + --> Fin (j + t) = #x" +apply (induct_tac n,auto) + apply (simp add: inat_defs) +apply (case_tac "x=UU",auto) + apply (simp add: inat_defs) +apply (drule stream_neq_UU,auto) +apply (subgoal_tac "EX k. Fin k = #as",clarify) + apply (erule_tac x="k" in allE) + apply (erule_tac x="as" in allE,auto) + apply (erule_tac x="THE p. Suc p = t" in allE,auto) + apply (simp add: inat_defs split:inat_splits) + apply (simp add: inat_defs split:inat_splits) + apply (simp only: the_equality) + apply (simp add: inat_defs split:inat_splits) + apply force +by (simp add: inat_defs split:inat_splits) + +lemma take_i_rt_len: +"[| Fin sl = #x; n <= sl; #(stream_take n$x) = Fin t; #(i_rt n x) = Fin j |] ==> + Fin (j + t) = #x" +by (blast intro: take_i_rt_len_lemma [rule_format]) + + +(* ----------------------------------------------------------------------- *) + section "i_th" +(* ----------------------------------------------------------------------- *) + +lemma i_th_i_rt_step: +"[| i_th n s1 << i_th n s2; i_rt (Suc n) s1 << i_rt (Suc n) s2 |] ==> + i_rt n s1 << i_rt n s2" +apply (simp add: i_th_def i_rt_Suc_back) +apply (rule stream.casedist [of "i_rt n s1"],simp) +apply (rule stream.casedist [of "i_rt n s2"],auto) +by (drule stream_prefix1,auto) + +lemma i_th_stream_take_Suc [rule_format]: + "ALL s. i_th n (stream_take (Suc n)$s) = i_th n s" +apply (induct_tac n,auto) + apply (simp add: i_th_def) + apply (case_tac "s=UU",auto) + apply (drule stream_neq_UU,auto) +apply (case_tac "s=UU",simp add: i_th_def) +apply (drule stream_neq_UU,auto) +by (simp add: i_th_def i_rt_Suc_forw) + +lemma last_lemma10: "stream_take (Suc n)$s1 << stream_take (Suc n)$s2 ==> + i_th n s1 << i_th n s2" +apply (rule i_th_stream_take_Suc [THEN subst]) +apply (rule i_th_stream_take_Suc [THEN subst]) back +apply (simp add: i_th_def) +apply (rule monofun_cfun_arg) +by (erule i_rt_mono) + +lemma i_th_last: "i_th n s && UU = i_rt n (stream_take (Suc n)$s)" +apply (insert surjectiv_scons [of "i_rt n (stream_take (Suc n)$s)"]) +apply (rule i_th_stream_take_Suc [THEN subst]) +apply (simp add: i_th_def i_rt_Suc_back [symmetric]) +by (simp add: i_rt_take_lemma1) + +lemma i_th_last_eq: +"i_th n s1 = i_th n s2 ==> i_rt n (stream_take (Suc n)$s1) = i_rt n (stream_take (Suc n)$s2)" +apply (insert i_th_last [of n s1]) +apply (insert i_th_last [of n s2]) +by auto + +lemma i_th_prefix_lemma: +"[| k <= n; stream_take (Suc n)$s1 << stream_take (Suc n)$s2 |] ==> + i_th k s1 << i_th k s2" +apply (subgoal_tac "stream_take (Suc k)$s1 << stream_take (Suc k)$s2") + apply (simp add: last_lemma10) +by (blast intro: stream_take_lemma10) + +lemma take_i_rt_prefix_lemma1: + "stream_take (Suc n)$s1 << stream_take (Suc n)$s2 ==> + i_rt (Suc n) s1 << i_rt (Suc n) s2 ==> + i_rt n s1 << i_rt n s2 & stream_take n$s1 << stream_take n$s2" +apply auto + apply (insert i_th_prefix_lemma [of n n s1 s2]) + apply (rule i_th_i_rt_step,auto) +by (drule mono_stream_take_pred,simp) + +lemma take_i_rt_prefix_lemma: +"[| stream_take n$s1 << stream_take n$s2; i_rt n s1 << i_rt n s2 |] ==> s1 << s2" +apply (case_tac "n=0",simp) +apply (insert neq0_conv [of n]) +apply (insert not0_implies_Suc [of n],auto) +apply (subgoal_tac "stream_take 0$s1 << stream_take 0$s2 & + i_rt 0 s1 << i_rt 0 s2") + defer 1 + apply (rule zero_induct,blast) + apply (blast dest: take_i_rt_prefix_lemma1) +by simp + +lemma streams_prefix_lemma: "(s1 << s2) = + (stream_take n$s1 << stream_take n$s2 & i_rt n s1 << i_rt n s2)"; +apply auto + apply (simp add: monofun_cfun_arg) + apply (simp add: i_rt_mono) +by (erule take_i_rt_prefix_lemma,simp) + +lemma streams_prefix_lemma1: + "[| stream_take n$s1 = stream_take n$s2; i_rt n s1 = i_rt n s2 |] ==> s1 = s2" +apply (simp add: po_eq_conv,auto) + apply (insert streams_prefix_lemma) + by blast+ + + +(* ----------------------------------------------------------------------- *) + section "sconc" +(* ----------------------------------------------------------------------- *) + +lemma UU_sconc [simp]: " UU ooo s = s " +by (simp add: sconc_def inat_defs) + +lemma scons_neq_UU: "a~=UU ==> a && s ~=UU" +by auto + +lemma singleton_sconc [rule_format, simp]: "x~=UU --> (x && UU) ooo y = x && y" +apply (simp add: sconc_def inat_defs split:inat_splits,auto) +apply (rule someI2_ex,auto) + apply (rule_tac x="x && y" in exI,auto) +apply (simp add: i_rt_Suc_forw) +apply (case_tac "xa=UU",simp) +by (drule stream_neq_UU,auto) + +lemma ex_sconc [rule_format]: + "ALL k y. #x = Fin k --> (EX w. stream_take k$w = x & i_rt k w = y)" +apply (case_tac "#x") + apply (rule stream_finite_ind [of x],auto) + apply (simp add: stream.finite_def) + apply (drule slen_take_lemma1,blast) + apply (simp add: inat_defs split:inat_splits)+ +apply (erule_tac x="y" in allE,auto) +by (rule_tac x="a && w" in exI,auto) + +lemma rt_sconc1: "Fin n = #x ==> i_rt n (x ooo y) = y"; +apply (simp add: sconc_def inat_defs split:inat_splits , arith?,auto) +apply (rule someI2_ex,auto) +by (drule ex_sconc,simp) + +lemma sconc_inj2: "\Fin n = #x; x ooo y = x ooo z\ \ y = z" +apply (frule_tac y=y in rt_sconc1) +by (auto elim: rt_sconc1) + +lemma sconc_UU [simp]:"s ooo UU = s" +apply (case_tac "#s") + apply (simp add: sconc_def inat_defs) + apply (rule someI2_ex) + apply (rule_tac x="s" in exI) + apply auto + apply (drule slen_take_lemma1,auto) + apply (simp add: i_rt_lemma_slen) + apply (drule slen_take_lemma1,auto) + apply (simp add: i_rt_slen) +by (simp add: sconc_def inat_defs) + +lemma stream_take_sconc [simp]: "Fin n = #x ==> stream_take n$(x ooo y) = x" +apply (simp add: sconc_def) +apply (simp add: inat_defs split:inat_splits,auto) +apply (rule someI2_ex,auto) +by (drule ex_sconc,simp) + +lemma scons_sconc [rule_format,simp]: "a~=UU --> (a && x) ooo y = a && x ooo y" +apply (case_tac "#x",auto) + apply (simp add: sconc_def) + apply (rule someI2_ex) + apply (drule ex_sconc,simp) + apply (rule someI2_ex,auto) + apply (simp add: i_rt_Suc_forw) + apply (rule_tac x="a && x" in exI,auto) + apply (case_tac "xa=UU",auto) + apply (drule_tac s="stream_take nat$x" in scons_neq_UU) + apply (simp add: i_rt_Suc_forw) + apply (drule stream_neq_UU,clarsimp) + apply (drule streams_prefix_lemma1,simp+) +by (simp add: sconc_def) + +lemma ft_sconc: "x ~= UU ==> ft$(x ooo y) = ft$x" +by (rule stream.casedist [of x],auto) + +lemma sconc_assoc: "(x ooo y) ooo z = x ooo y ooo z" +apply (case_tac "#x") + apply (rule stream_finite_ind [of x],auto simp del: scons_sconc) + apply (simp add: stream.finite_def del: scons_sconc) + apply (drule slen_take_lemma1,auto simp del: scons_sconc) + apply (case_tac "a = UU", auto) +by (simp add: sconc_def) + + +(* ----------------------------------------------------------------------- *) + +lemma sconc_mono: "y << y' ==> x ooo y << x ooo y'" +apply (case_tac "#x") + apply (rule stream_finite_ind [of "x"]) + apply (auto simp add: stream.finite_def) + apply (drule slen_take_lemma1,blast) + by (simp add: stream_prefix',auto simp add: sconc_def) + +lemma sconc_mono1 [simp]: "x << x ooo y" +by (rule sconc_mono [of UU, simplified]) + +(* ----------------------------------------------------------------------- *) + +lemma empty_sconc [simp]: "(x ooo y = UU) = (x = UU & y = UU)" +apply (case_tac "#x",auto) + by (insert sconc_mono1 [of x y],auto); + +(* ----------------------------------------------------------------------- *) + +lemma rt_sconc [rule_format, simp]: "s~=UU --> rt$(s ooo x) = rt$s ooo x" +by (rule stream.casedist,auto) + +(* ----------------------------------------------------------------------- *) + +lemma sconc_lemma [rule_format, simp]: "ALL s. stream_take n$s ooo i_rt n s = s" +apply (induct_tac n,auto) +apply (case_tac "s=UU",auto) +by (drule stream_neq_UU,auto) + +(* ----------------------------------------------------------------------- *) + subsection "pointwise equality" +(* ----------------------------------------------------------------------- *) + +lemma ex_last_stream_take_scons: "stream_take (Suc n)$s = + stream_take n$s ooo i_rt n (stream_take (Suc n)$s)" +by (insert sconc_lemma [of n "stream_take (Suc n)$s"],simp) + +lemma i_th_stream_take_eq: +"!!n. ALL n. i_th n s1 = i_th n s2 ==> stream_take n$s1 = stream_take n$s2" +apply (induct_tac n,auto) +apply (subgoal_tac "stream_take (Suc na)$s1 = + stream_take na$s1 ooo i_rt na (stream_take (Suc na)$s1)") + apply (subgoal_tac "i_rt na (stream_take (Suc na)$s1) = + i_rt na (stream_take (Suc na)$s2)") + apply (subgoal_tac "stream_take (Suc na)$s2 = + stream_take na$s2 ooo i_rt na (stream_take (Suc na)$s2)") + apply (insert ex_last_stream_take_scons,simp) + apply blast + apply (erule_tac x="na" in allE) + apply (insert i_th_last_eq [of _ s1 s2]) +by blast+ + +lemma pointwise_eq_lemma[rule_format]: "ALL n. i_th n s1 = i_th n s2 ==> s1 = s2" +by (insert i_th_stream_take_eq [THEN stream.take_lemmas],blast) + +(* ----------------------------------------------------------------------- *) + subsection "finiteness" +(* ----------------------------------------------------------------------- *) + +lemma slen_sconc_finite1: + "[| #(x ooo y) = Infty; Fin n = #x |] ==> #y = Infty" +apply (case_tac "#y ~= Infty",auto) +apply (simp only: slen_infinite [symmetric]) +apply (drule_tac y=y in rt_sconc1) +apply (insert stream_finite_i_rt [of n "x ooo y"]) +by (simp add: slen_infinite) + +lemma slen_sconc_infinite1: "#x=Infty ==> #(x ooo y) = Infty" +by (simp add: sconc_def) + +lemma slen_sconc_infinite2: "#y=Infty ==> #(x ooo y) = Infty" +apply (case_tac "#x") + apply (simp add: sconc_def) + apply (rule someI2_ex) + apply (drule ex_sconc,auto) + apply (erule contrapos_pp) + apply (insert stream_finite_i_rt) + apply (simp add: slen_infinite ,auto) +by (simp add: sconc_def) + +lemma sconc_finite: "(#x~=Infty & #y~=Infty) = (#(x ooo y)~=Infty)" +apply auto + apply (case_tac "#x",auto) + apply (erule contrapos_pp,simp) + apply (erule slen_sconc_finite1,simp) + apply (drule slen_sconc_infinite1 [of _ y],simp) +by (drule slen_sconc_infinite2 [of _ x],simp) + +(* ----------------------------------------------------------------------- *) + +lemma slen_sconc_mono3: "[| Fin n = #x; Fin k = #(x ooo y) |] ==> n <= k" +apply (insert slen_mono [of "x" "x ooo y"]) +by (simp add: inat_defs split: inat_splits) + +(* ----------------------------------------------------------------------- *) + subsection "finite slen" +(* ----------------------------------------------------------------------- *) + +lemma slen_sconc: "[| Fin n = #x; Fin m = #y |] ==> #(x ooo y) = Fin (n + m)" +apply (case_tac "#(x ooo y)") + apply (frule_tac y=y in rt_sconc1) + apply (insert take_i_rt_len [of "THE j. Fin j = #(x ooo y)" "x ooo y" n n m],simp) + apply (insert slen_sconc_mono3 [of n x _ y],simp) +by (insert sconc_finite [of x y],auto) + +(* ----------------------------------------------------------------------- *) + subsection "flat prefix" +(* ----------------------------------------------------------------------- *) + +lemma sconc_prefix: "(s1::'a::flat stream) << s2 ==> EX t. s1 ooo t = s2" +apply (case_tac "#s1") + apply (subgoal_tac "stream_take nat$s1 = stream_take nat$s2"); + apply (rule_tac x="i_rt nat s2" in exI) + apply (simp add: sconc_def) + apply (rule someI2_ex) + apply (drule ex_sconc) + apply (simp,clarsimp,drule streams_prefix_lemma1) + apply (simp+,rule slen_take_lemma3 [rule_format, of _ s1 s2]); + apply (simp+,rule_tac x="UU" in exI) +apply (insert slen_take_lemma3 [rule_format, of _ s1 s2]); +by (rule stream.take_lemmas,simp) + +(* ----------------------------------------------------------------------- *) + subsection "continuity" +(* ----------------------------------------------------------------------- *) + +lemma chain_sconc: "chain S ==> chain (%i. (x ooo S i))" +by (simp add: chain_def,auto simp add: sconc_mono) + +lemma chain_scons: "chain S ==> chain (%i. a && S i)" +apply (simp add: chain_def,auto) +by (rule monofun_cfun_arg,simp) + +lemma contlub_scons: "contlub (%x. a && x)" +by (simp add: contlub_Rep_CFun2) + +lemma contlub_scons_lemma: "chain S ==> (LUB i. a && S i) = a && (LUB i. S i)" +apply (insert contlub_scons [of a]) +by (simp only: contlub) + +lemma finite_lub_sconc: "chain Y ==> (stream_finite x) ==> + (LUB i. x ooo Y i) = (x ooo (LUB i. Y i))" +apply (rule stream_finite_ind [of x]) + apply (auto) +apply (subgoal_tac "(LUB i. a && (s ooo Y i)) = a && (LUB i. s ooo Y i)") + by (force,blast dest: contlub_scons_lemma chain_sconc) + +lemma contlub_sconc_lemma: + "chain Y ==> (LUB i. x ooo Y i) = (x ooo (LUB i. Y i))" +apply (case_tac "#x=Infty") + apply (simp add: sconc_def) + prefer 2 + apply (drule finite_lub_sconc,auto simp add: slen_infinite) +apply (simp add: slen_def) +apply (insert lub_const [of x] unique_lub [of _ x _]) +by (auto simp add: lub) + +lemma contlub_sconc: "contlub (%y. x ooo y)"; +by (rule contlubI, insert contlub_sconc_lemma [of _ x], simp); + +lemma monofun_sconc: "monofun (%y. x ooo y)" +by (simp add: monofun sconc_mono) + +lemma cont_sconc: "cont (%y. x ooo y)" +apply (rule monocontlub2cont) + apply (rule monofunI, simp add: sconc_mono) +by (rule contlub_sconc); + + +(* ----------------------------------------------------------------------- *) + section "constr_sconc" +(* ----------------------------------------------------------------------- *) + +lemma constr_sconc_UUs [simp]: "constr_sconc UU s = s" +by (simp add: constr_sconc_def inat_defs) + +lemma "x ooo y = constr_sconc x y" +apply (case_tac "#x") + apply (rule stream_finite_ind [of x],auto simp del: scons_sconc) + defer 1 + apply (simp add: constr_sconc_def del: scons_sconc) + apply (case_tac "#s") + apply (simp add: inat_defs) + apply (case_tac "a=UU",auto simp del: scons_sconc) + apply (simp) + apply (simp add: sconc_def) + apply (simp add: constr_sconc_def) +apply (simp add: stream.finite_def) +by (drule slen_take_lemma1,auto) + +end diff -r 7a46bdcd92f2 -r 7cb26928e70d src/HOLCF/ex/Stream.thy --- a/src/HOLCF/ex/Stream.thy Fri Apr 09 16:31:15 2004 +0200 +++ b/src/HOLCF/ex/Stream.thy Mon Apr 12 12:18:48 2004 +0200 @@ -4,6 +4,7 @@ License: GPL (GNU GENERAL PUBLIC LICENSE) General Stream domain. +TODO: should be integrated with HOLCF/Streams *) Stream = HOLCF + Nat_Infinity +