(* Title: HOL/BNF_Examples/IsaFoR_Datatypes.thy
Author: Rene Thiemann, UIBK
Copyright 2014
Benchmark consisting of datatypes defined in IsaFoR.
*)
header {* Benchmark Consisting of Datatypes Defined in IsaFoR *}
theory IsaFoR_Datatypes
imports Real
begin
datatype_new ('f, 'l) lab =
Lab "('f, 'l) lab" 'l
| FunLab "('f, 'l) lab" "('f, 'l) lab list"
| UnLab 'f
| Sharp "('f, 'l) lab"
datatype_new 'f projL = Projection "(('f \<times> nat) \<times> nat) list"
datatype_new ('f, 'v) "term" = Var 'v | Fun 'f "('f, 'v) term list"
datatype_new ('f, 'v) ctxt =
Hole ("\<box>")
| More 'f "('f, 'v) term list" "('f, 'v) ctxt" "('f, 'v) term list"
type_synonym ('f, 'v) rule = "('f, 'v) term \<times> ('f, 'v) term"
type_synonym ('f, 'v) trs = "('f, 'v) rule set"
type_synonym ('f, 'v) rules = "('f, 'v) rule list"
type_synonym ('f, 'l, 'v) ruleLL = "(('f, 'l) lab, 'v) rule"
type_synonym ('f, 'l, 'v) trsLL = "(('f, 'l) lab, 'v) rules"
type_synonym ('f, 'l, 'v) termsLL = "(('f, 'l) lab, 'v) term list"
datatype_new pos = Empty ("\<epsilon>") | PCons "nat" "pos" (infixr "<#" 70)
type_synonym ('f, 'v) prseq = "(pos \<times> ('f, 'v) rule \<times> bool \<times> ('f, 'v) term) list"
type_synonym ('f, 'v) rseq = "(pos \<times> ('f, 'v) rule \<times> ('f, 'v) term) list"
type_synonym ('f, 'l, 'v) rseqL = "((('f, 'l) lab, 'v) rule \<times> (('f, 'l) lab, 'v) rseq) list"
type_synonym ('f, 'l, 'v) dppLL =
"bool \<times> bool \<times> ('f, 'l, 'v) trsLL \<times> ('f, 'l, 'v) trsLL \<times>
('f, 'l, 'v) termsLL \<times>
('f, 'l, 'v) trsLL \<times> ('f, 'l, 'v) trsLL"
type_synonym ('f, 'l, 'v) qreltrsLL =
"bool \<times> ('f, 'l, 'v) termsLL \<times> ('f, 'l, 'v) trsLL \<times> ('f, 'l, 'v) trsLL"
type_synonym ('f, 'l, 'v) qtrsLL =
"bool \<times> ('f, 'l, 'v) termsLL \<times> ('f, 'l, 'v) trsLL"
datatype_new location = H | A | B | R
type_synonym ('f, 'v) forb_pattern = "('f, 'v) ctxt \<times> ('f, 'v) term \<times> location"
type_synonym ('f, 'v) forb_patterns = "('f, 'v) forb_pattern set"
type_synonym ('f, 'l, 'v) fptrsLL =
"(('f, 'l) lab, 'v) forb_pattern list \<times> ('f, 'l, 'v) trsLL"
type_synonym ('f, 'l, 'v) prob = "('f, 'l, 'v) qreltrsLL + ('f, 'l, 'v) dppLL"
type_synonym ('f, 'a) lpoly_inter = "'f \<times> nat \<Rightarrow> ('a \<times> 'a list)"
type_synonym ('f, 'a) lpoly_interL = "(('f \<times> nat) \<times> ('a \<times> 'a list)) list"
type_synonym 'v monom = "('v \<times> nat) list"
type_synonym ('v, 'a) poly = "('v monom \<times> 'a) list"
type_synonym ('f, 'a) poly_inter_list = "(('f \<times> nat) \<times> (nat, 'a) poly) list"
type_synonym 'a vec = "'a list"
type_synonym 'a mat = "'a vec list"
datatype_new arctic = MinInfty | Num_arc int
datatype_new 'a arctic_delta = MinInfty_delta | Num_arc_delta 'a
datatype_new order_tag = Lex | Mul
type_synonym 'f status_prec_repr = "(('f \<times> nat) \<times> (nat \<times> order_tag)) list"
datatype_new af_entry =
Collapse nat
| AFList "nat list"
type_synonym 'f afs_list = "(('f \<times> nat) \<times> af_entry) list"
type_synonym 'f prec_weight_repr = "(('f \<times> nat) \<times> (nat \<times> nat \<times> (nat list option))) list \<times> nat"
datatype_new 'f redtriple_impl =
Int_carrier "('f, int) lpoly_interL"
| Int_nl_carrier "('f, int) poly_inter_list"
| Rat_carrier "('f, rat) lpoly_interL"
| Rat_nl_carrier rat "('f, rat) poly_inter_list"
| Real_carrier "('f, real) lpoly_interL"
| Real_nl_carrier real "('f, real) poly_inter_list"
| Arctic_carrier "('f, arctic) lpoly_interL"
| Arctic_rat_carrier "('f, rat arctic_delta) lpoly_interL"
| Int_mat_carrier nat nat "('f, int mat) lpoly_interL"
| Rat_mat_carrier nat nat "('f, rat mat) lpoly_interL"
| Real_mat_carrier nat nat "('f, real mat) lpoly_interL"
| Arctic_mat_carrier nat "('f, arctic mat) lpoly_interL"
| Arctic_rat_mat_carrier nat "('f, rat arctic_delta mat) lpoly_interL"
| RPO "'f status_prec_repr" "'f afs_list"
| KBO "'f prec_weight_repr" "'f afs_list"
datatype_new list_order_type = MS_Ext | Max_Ext | Min_Ext | Dms_Ext
type_synonym 'f scnp_af = "(('f \<times> nat) \<times> (nat \<times> nat) list) list"
datatype_new 'f root_redtriple_impl = SCNP list_order_type "'f scnp_af" "'f redtriple_impl"
type_synonym 'f sig_map_list = "(('f \<times> nat) \<times> 'f list) list"
type_synonym ('f, 'v) uncurry_info = "'f \<times> 'f sig_map_list \<times> ('f, 'v) rules \<times> ('f, 'v) rules"
datatype_new arithFun =
Arg nat
| Const nat
| Sum "arithFun list"
| Max "arithFun list"
| Min "arithFun list"
| Prod "arithFun list"
| IfEqual arithFun arithFun arithFun arithFun
datatype_new 'f sl_inter = SL_Inter nat "(('f \<times> nat) \<times> arithFun) list"
datatype_new ('f, 'v) sl_variant =
Rootlab "('f \<times> nat) option"
| Finitelab "'f sl_inter"
| QuasiFinitelab "'f sl_inter" 'v
type_synonym ('f, 'v) crit_pair_joins = "(('f, 'v) term \<times> ('f, 'v) rseq \<times> ('f, 'v) term \<times> ('f, 'v) rseq) list"
datatype_new 'f join_info = Guided "('f, string) crit_pair_joins" | Join_NF | Join_BFS nat
type_synonym unknown_info = string
type_synonym dummy_prf = unit
datatype_new ('f, 'v) complex_constant_removal_prf = Complex_Constant_Removal_Proof
"('f, 'v) term"
"(('f, 'v) rule \<times> ('f, 'v) rule) list"
datatype_new ('f, 'v) cond_constraint =
CC_cond bool "('f, 'v) rule"
| CC_rewr "('f, 'v) term" "('f, 'v) term"
| CC_impl "('f, 'v) cond_constraint list" "('f, 'v) cond_constraint"
| CC_all 'v "('f, 'v) cond_constraint"
type_synonym ('f, 'v, 'w) gsubstL = "('v \<times> ('f, 'w) term) list"
type_synonym ('f, 'v) substL = "('f, 'v, 'v) gsubstL"
datatype_new ('f, 'v) cond_constraint_prf =
Final
| Delete_Condition "('f, 'v) cond_constraint" "('f, 'v) cond_constraint_prf"
| Different_Constructor "('f, 'v) cond_constraint"
| Same_Constructor "('f, 'v) cond_constraint" "('f, 'v) cond_constraint" "('f, 'v) cond_constraint_prf"
| Variable_Equation 'v "('f, 'v) term" "('f, 'v) cond_constraint" "('f, 'v) cond_constraint_prf"
| Funarg_Into_Var "('f, 'v) cond_constraint" nat 'v "('f, 'v) cond_constraint" "('f, 'v) cond_constraint_prf"
| Simplify_Condition "('f, 'v) cond_constraint" "('f, 'v) substL" "('f, 'v) cond_constraint" "('f, 'v) cond_constraint_prf"
| Induction "('f, 'v) cond_constraint" "('f, 'v) cond_constraint list" "(('f, 'v) rule \<times> (('f, 'v) term \<times> 'v list) list \<times> ('f, 'v) cond_constraint \<times> ('f, 'v) cond_constraint_prf) list"
datatype_new ('f, 'v) cond_red_pair_prf =
Cond_Red_Pair_Prf
'f "(('f, 'v) cond_constraint \<times> ('f, 'v) rules \<times> ('f, 'v) cond_constraint_prf) list" nat nat
datatype_new ('q, 'f) ta_rule = TA_rule 'f "'q list" 'q ("_ _ \<rightarrow> _")
datatype_new ('q, 'f) tree_automaton = Tree_Automaton "'q list" "('q, 'f) ta_rule list" "('q \<times> 'q) list"
datatype_new 'q ta_relation =
Decision_Proc
| Id_Relation
| Some_Relation "('q \<times> 'q) list"
datatype_new boundstype = Roof | Match
datatype_new ('f, 'q) bounds_info = Bounds_Info boundstype nat "'q list" "('q, 'f \<times> nat) tree_automaton" "'q ta_relation"
datatype_new ('f, 'v) pat_eqv_prf =
Pat_Dom_Renaming "('f, 'v) substL"
| Pat_Irrelevant "('f, 'v) substL" "('f, 'v) substL"
| Pat_Simplify "('f, 'v) substL" "('f, 'v) substL"
datatype_new pat_rule_pos = Pat_Base | Pat_Pump | Pat_Close
datatype_new ('f, 'v) pat_rule_prf =
Pat_OrigRule "('f, 'v) rule" bool
| Pat_InitPump "('f, 'v) pat_rule_prf" "('f, 'v) substL" "('f, 'v) substL"
| Pat_InitPumpCtxt "('f, 'v) pat_rule_prf" "('f, 'v) substL" pos 'v
| Pat_Equiv "('f, 'v) pat_rule_prf" bool "('f, 'v) pat_eqv_prf"
| Pat_Narrow "('f, 'v) pat_rule_prf" "('f, 'v) pat_rule_prf" pos
| Pat_Inst "('f, 'v) pat_rule_prf" "('f, 'v) substL" pat_rule_pos
| Pat_Rewr "('f, 'v) pat_rule_prf" "('f, 'v) term \<times> ('f, 'v) rseq" pat_rule_pos 'v
| Pat_Exp_Sigma "('f, 'v) pat_rule_prf" nat
datatype_new ('f, 'v) non_loop_prf =
Non_Loop_Prf "('f, 'v) pat_rule_prf" "('f, 'v) substL" "('f, 'v) substL" nat nat pos
datatype_new ('f, 'l, 'v) problem =
SN_TRS "('f, 'l, 'v) qreltrsLL"
| SN_FP_TRS "('f, 'l, 'v) fptrsLL"
| Finite_DPP "('f, 'l, 'v) dppLL"
| Unknown_Problem unknown_info
| Not_SN_TRS "('f, 'l, 'v) qtrsLL"
| Not_RelSN_TRS "('f, 'l, 'v) qreltrsLL"
| Infinite_DPP "('f, 'l, 'v) dppLL"
| Not_SN_FP_TRS "('f, 'l, 'v) fptrsLL"
declare [[bnf_timing]]
datatype_new ('f, 'l, 'v, 'a, 'b, 'c, 'd, 'e) generic_assm_proof =
SN_assm_proof "('f, 'l, 'v) qreltrsLL" 'a
| Finite_assm_proof "('f, 'l, 'v) dppLL" 'b
| SN_FP_assm_proof "('f, 'l, 'v) fptrsLL" 'c
| Not_SN_assm_proof "('f, 'l, 'v) qtrsLL" 'a
| Infinite_assm_proof "('f, 'l, 'v) dppLL" 'b
| Not_RelSN_assm_proof "('f, 'l, 'v) qreltrsLL" 'c
| Not_SN_FP_assm_proof "('f, 'l, 'v) fptrsLL" 'd
| Unknown_assm_proof unknown_info 'e
type_synonym ('f, 'l, 'v, 'a, 'b, 'c, 'd) assm_proof = "('f, 'l, 'v, 'a, 'b, 'c, dummy_prf, 'd) generic_assm_proof"
datatype_new ('f, 'l, 'v) assm =
SN_assm "('f, 'l, 'v) problem list" "('f, 'l, 'v) qreltrsLL"
| SN_FP_assm "('f, 'l, 'v) problem list" "('f, 'l, 'v) fptrsLL"
| Finite_assm "('f, 'l, 'v) problem list" "('f, 'l, 'v) dppLL"
| Unknown_assm "('f, 'l, 'v) problem list" unknown_info
| Not_SN_assm "('f, 'l, 'v) problem list" "('f, 'l, 'v) qtrsLL"
| Not_RelSN_assm "('f, 'l, 'v) problem list" "('f, 'l, 'v) qreltrsLL"
| Not_SN_FP_assm "('f, 'l, 'v) problem list" "('f, 'l, 'v) fptrsLL"
| Infinite_assm "('f, 'l, 'v) problem list" "('f, 'l, 'v) dppLL"
fun satisfied :: "('f, 'l, 'v) problem \<Rightarrow> bool" where
"satisfied (SN_TRS t) = (t = t)"
| "satisfied (SN_FP_TRS t) = (t \<noteq> t)"
| "satisfied (Finite_DPP d) = (d \<noteq> d)"
| "satisfied (Unknown_Problem s) = (s = ''foo'')"
| "satisfied (Not_SN_TRS (nfs, q, r)) = (length q = length r)"
| "satisfied (Not_RelSN_TRS (nfs, q, r, rw)) = (r = rw)"
| "satisfied (Infinite_DPP d) = (d = d)"
| "satisfied (Not_SN_FP_TRS t) = (t = t)"
fun collect_assms :: "('tp \<Rightarrow> ('f, 'l, 'v) assm list)
\<Rightarrow> ('dpp \<Rightarrow> ('f, 'l, 'v) assm list)
\<Rightarrow> ('fptp \<Rightarrow> ('f, 'l, 'v) assm list)
\<Rightarrow> ('unk \<Rightarrow> ('f, 'l, 'v) assm list)
\<Rightarrow> ('f, 'l, 'v, 'tp, 'dpp, 'fptp, 'unk) assm_proof \<Rightarrow> ('f, 'l, 'v) assm list" where
"collect_assms tp dpp fptp unk (SN_assm_proof t prf) = tp prf"
| "collect_assms tp dpp fptp unk (SN_FP_assm_proof t prf) = fptp prf"
| "collect_assms tp dpp fptp unk (Finite_assm_proof d prf) = dpp prf"
| "collect_assms tp dpp fptp unk (Unknown_assm_proof p prf) = unk prf"
| "collect_assms _ _ _ _ _ = []"
fun collect_neg_assms :: "('tp \<Rightarrow> ('f, 'l, 'v) assm list)
\<Rightarrow> ('dpp \<Rightarrow> ('f, 'l, 'v) assm list)
\<Rightarrow> ('rtp \<Rightarrow> ('f, 'l, 'v) assm list)
\<Rightarrow> ('fptp \<Rightarrow> ('f, 'l, 'v) assm list)
\<Rightarrow> ('unk \<Rightarrow> ('f, 'l, 'v) assm list)
\<Rightarrow> ('f, 'l, 'v, 'tp, 'dpp, 'rtp, 'fptp, 'unk) generic_assm_proof \<Rightarrow> ('f, 'l, 'v) assm list" where
"collect_neg_assms tp dpp rtp fptp unk (Not_SN_assm_proof t prf) = tp prf"
| "collect_neg_assms tp dpp rtp fptp unk (Infinite_assm_proof d prf) = dpp prf"
| "collect_neg_assms tp dpp rtp fptp unk (Not_RelSN_assm_proof t prf) = rtp prf"
| "collect_neg_assms tp dpp rtp fptp unk (Not_SN_FP_assm_proof t prf) = fptp prf"
| "collect_neg_assms tp dpp rtp fptp unk (Unknown_assm_proof p prf) = unk prf"
| "collect_neg_assms tp dpp rtp fptp unk _ = []"
datatype_new ('f, 'l, 'v) dp_nontermination_proof =
DP_Loop "(('f, 'l) lab, 'v) term" "(('f, 'l) lab, 'v) prseq" "(('f, 'l) lab, 'v) substL" "(('f, 'l) lab, 'v) ctxt"
| DP_Nonloop "(('f, 'l) lab, 'v) non_loop_prf"
| DP_Rule_Removal "('f, 'l, 'v) trsLL option" "('f, 'l, 'v) trsLL option" "('f, 'l, 'v) dp_nontermination_proof"
| DP_Q_Increase "('f, 'l, 'v) termsLL" "('f, 'l, 'v) dp_nontermination_proof"
| DP_Q_Reduction "('f, 'l, 'v) termsLL" "('f, 'l, 'v) dp_nontermination_proof"
| DP_Termination_Switch "('f, 'l) lab join_info" "('f, 'l, 'v) dp_nontermination_proof"
| DP_Instantiation "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_nontermination_proof"
| DP_Rewriting "('f, 'l, 'v) trsLL option" "('f, 'l, 'v) ruleLL" "('f, 'l, 'v) ruleLL" "('f, 'l, 'v) ruleLL" "(('f, 'l) lab, 'v) rule" pos "('f, 'l, 'v) dp_nontermination_proof"
| DP_Narrowing "('f, 'l, 'v) ruleLL" pos "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_nontermination_proof"
| DP_Assume_Infinite "('f, 'l, 'v) dppLL"
"('f, 'l, 'v, ('f, 'l, 'v) trs_nontermination_proof,
('f, 'l, 'v) dp_nontermination_proof,
('f, 'l, 'v) reltrs_nontermination_proof,
('f, 'l, 'v) fp_nontermination_proof,
('f, 'l, 'v) neg_unknown_proof) generic_assm_proof list"
and ('f, 'l, 'v) "trs_nontermination_proof" =
TRS_Loop "(('f, 'l) lab, 'v) term" "(('f, 'l) lab, 'v) rseq" "(('f, 'l) lab, 'v) substL" "(('f, 'l) lab, 'v) ctxt"
| TRS_Not_Well_Formed
| TRS_Rule_Removal "('f, 'l, 'v) trsLL" "('f, 'l, 'v) trs_nontermination_proof"
| TRS_String_Reversal "('f, 'l, 'v) trs_nontermination_proof"
| TRS_DP_Trans "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_nontermination_proof"
| TRS_Nonloop "(('f, 'l) lab, 'v) non_loop_prf"
| TRS_Q_Increase "('f, 'l, 'v) termsLL" "('f, 'l, 'v) trs_nontermination_proof"
| TRS_Assume_Not_SN "('f, 'l, 'v) qtrsLL"
"('f, 'l, 'v, ('f, 'l, 'v) trs_nontermination_proof,
('f, 'l, 'v) dp_nontermination_proof,
('f, 'l, 'v) reltrs_nontermination_proof,
('f, 'l, 'v) fp_nontermination_proof,
('f, 'l, 'v) neg_unknown_proof) generic_assm_proof list"
and ('f, 'l, 'v)"reltrs_nontermination_proof" =
Rel_Loop "(('f, 'l) lab, 'v) term" "(('f, 'l) lab, 'v) prseq" "(('f, 'l) lab, 'v) substL" "(('f, 'l) lab, 'v) ctxt"
| Rel_Not_Well_Formed
| Rel_Rule_Removal "('f, 'l, 'v) trsLL option" "('f, 'l, 'v) trsLL option" "('f, 'l, 'v) reltrs_nontermination_proof"
| Rel_R_Not_SN "('f, 'l, 'v) trs_nontermination_proof"
| Rel_TRS_Assume_Not_SN "('f, 'l, 'v) qreltrsLL"
"('f, 'l, 'v, ('f, 'l, 'v) trs_nontermination_proof,
('f, 'l, 'v) dp_nontermination_proof,
('f, 'l, 'v) reltrs_nontermination_proof,
('f, 'l, 'v) fp_nontermination_proof,
('f, 'l, 'v) neg_unknown_proof) generic_assm_proof list"
and ('f, 'l, 'v) "fp_nontermination_proof" =
FPTRS_Loop "(('f, 'l) lab, 'v) term" "(('f, 'l) lab, 'v) rseq" "(('f, 'l) lab, 'v) substL" "(('f, 'l) lab, 'v) ctxt"
| FPTRS_Rule_Removal "('f, 'l, 'v) trsLL" "('f, 'l, 'v) fp_nontermination_proof"
| FPTRS_Assume_Not_SN "('f, 'l, 'v) fptrsLL"
"('f, 'l, 'v, ('f, 'l, 'v) trs_nontermination_proof,
('f, 'l, 'v) dp_nontermination_proof,
('f, 'l, 'v) reltrs_nontermination_proof,
('f, 'l, 'v) fp_nontermination_proof,
('f, 'l, 'v) neg_unknown_proof) generic_assm_proof list"
and ('f, 'l, 'v) neg_unknown_proof =
Assume_NT_Unknown unknown_info
"('f, 'l, 'v, ('f, 'l, 'v) trs_nontermination_proof,
('f, 'l, 'v) dp_nontermination_proof,
('f, 'l, 'v) reltrs_nontermination_proof,
('f, 'l, 'v) fp_nontermination_proof,
('f, 'l, 'v) neg_unknown_proof) generic_assm_proof list"
datatype_new ('f, 'l, 'v) dp_termination_proof =
P_is_Empty
| Subterm_Criterion_Proc "('f, 'l) lab projL" "('f, 'l, 'v) rseqL"
"('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_termination_proof"
| Redpair_Proc "('f, 'l) lab root_redtriple_impl + ('f, 'l) lab redtriple_impl" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_termination_proof"
| Redpair_UR_Proc "('f, 'l) lab root_redtriple_impl + ('f, 'l) lab redtriple_impl"
"('f, 'l, 'v) trsLL" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_termination_proof"
| Usable_Rules_Proc "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_termination_proof"
| Dep_Graph_Proc "(('f, 'l, 'v) dp_termination_proof option \<times> ('f, 'l, 'v) trsLL) list"
| Mono_Redpair_Proc "('f, 'l) lab redtriple_impl"
"('f, 'l, 'v) trsLL" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_termination_proof"
| Mono_Redpair_UR_Proc "('f, 'l) lab redtriple_impl"
"('f, 'l, 'v) trsLL" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_termination_proof"
| Size_Change_Subterm_Proc "((('f, 'l) lab, 'v) rule \<times> ((nat \<times> nat) list \<times> (nat \<times> nat) list)) list"
| Size_Change_Redpair_Proc "('f, 'l) lab redtriple_impl" "('f, 'l, 'v) trsLL option"
"((('f, 'l) lab, 'v) rule \<times> ((nat \<times> nat) list \<times> (nat \<times> nat) list)) list"
| Uncurry_Proc "nat option" "(('f, 'l) lab, 'v) uncurry_info"
"('f, 'l, 'v) trsLL" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_termination_proof"
| Fcc_Proc "('f, 'l) lab" "(('f, 'l) lab, 'v) ctxt list"
"('f, 'l, 'v) trsLL" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_termination_proof"
| Split_Proc
"('f, 'l, 'v) trsLL" "('f, 'l, 'v) trsLL"
"('f, 'l, 'v) dp_termination_proof" "('f, 'l, 'v) dp_termination_proof"
| Semlab_Proc
"(('f, 'l) lab, 'v) sl_variant" "('f, 'l, 'v) trsLL"
"(('f, 'l) lab, 'v) term list" "('f, 'l, 'v) trsLL"
"('f, 'l, 'v) dp_termination_proof"
| Switch_Innermost_Proc "('f, 'l) lab join_info" "('f, 'l, 'v) dp_termination_proof"
| Rewriting_Proc
"('f, 'l, 'v) trsLL option" "('f, 'l, 'v) ruleLL" "('f, 'l, 'v) ruleLL"
"('f, 'l, 'v) ruleLL" "('f, 'l, 'v) ruleLL" pos "('f, 'l, 'v) dp_termination_proof"
| Instantiation_Proc "('f, 'l, 'v) ruleLL" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_termination_proof"
| Forward_Instantiation_Proc
"('f, 'l, 'v) ruleLL" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) trsLL option" "('f, 'l, 'v) dp_termination_proof"
| Narrowing_Proc "('f, 'l, 'v) ruleLL" pos "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_termination_proof"
| Assume_Finite
"('f, 'l, 'v) dppLL" "('f, 'l, 'v, ('f, 'l, 'v) trs_termination_proof, ('f, 'l, 'v) dp_termination_proof, ('f, 'l, 'v) fptrs_termination_proof, ('f, 'l, 'v) unknown_proof) assm_proof list"
| Unlab_Proc "('f, 'l, 'v) trsLL" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) dp_termination_proof"
| Q_Reduction_Proc "('f, 'l, 'v) termsLL" "('f, 'l, 'v) dp_termination_proof"
| Complex_Constant_Removal_Proc "(('f, 'l) lab, 'v) complex_constant_removal_prf" "('f, 'l, 'v) dp_termination_proof"
| General_Redpair_Proc
"('f, 'l) lab redtriple_impl" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) trsLL"
"(('f, 'l) lab, 'v) cond_red_pair_prf" "('f, 'l, 'v) dp_termination_proof list"
| To_Trs_Proc "('f, 'l, 'v) trs_termination_proof"
and ('f, 'l, 'v) trs_termination_proof =
DP_Trans bool bool "(('f, 'l) lab, 'v) rules" "('f, 'l, 'v) dp_termination_proof"
| Rule_Removal "('f, 'l) lab redtriple_impl" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) trs_termination_proof"
| String_Reversal "('f, 'l, 'v) trs_termination_proof"
| Bounds "(('f, 'l) lab, 'v) bounds_info"
| Uncurry "(('f, 'l) lab, 'v) uncurry_info" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) trs_termination_proof"
| Semlab
"(('f, 'l) lab, 'v) sl_variant" "(('f, 'l) lab, 'v) term list"
"('f, 'l, 'v) trsLL" "('f, 'l, 'v) trs_termination_proof"
| R_is_Empty
| Fcc "(('f, 'l) lab, 'v) ctxt list" "('f, 'l, 'v) trsLL" "('f, 'l, 'v) trs_termination_proof"
| Split "('f, 'l, 'v) trsLL" "('f, 'l, 'v) trs_termination_proof" "('f, 'l, 'v) trs_termination_proof"
| Switch_Innermost "('f, 'l) lab join_info" "('f, 'l, 'v) trs_termination_proof"
| Drop_Equality "('f, 'l, 'v) trs_termination_proof"
| Remove_Nonapplicable_Rules "('f, 'l, 'v) trsLL" "('f, 'l, 'v) trs_termination_proof"
| Assume_SN "('f, 'l, 'v) qreltrsLL" "('f, 'l, 'v, ('f, 'l, 'v) trs_termination_proof, ('f, 'l, 'v) dp_termination_proof, ('f, 'l, 'v) fptrs_termination_proof, ('f, 'l, 'v) unknown_proof) assm_proof list"
and ('f, 'l, 'v) unknown_proof =
Assume_Unknown unknown_info "('f, 'l, 'v, ('f, 'l, 'v) trs_termination_proof, ('f, 'l, 'v) dp_termination_proof, ('f, 'l, 'v) fptrs_termination_proof, ('f, 'l, 'v) unknown_proof) assm_proof list"
and ('f, 'l, 'v) fptrs_termination_proof =
Assume_FP_SN "('f, 'l, 'v) fptrsLL" "('f, 'l, 'v, ('f, 'l, 'v) trs_termination_proof, ('f, 'l, 'v) dp_termination_proof, ('f, 'l, 'v) fptrs_termination_proof, ('f, 'l, 'v) unknown_proof) assm_proof list"
end