(* ========================================================================= *) (* FLYSPECK - BOOK FORMALIZATION *) (* *) (* Authour : VU KHAC KY *) (* Book lemma: TEZFFSK *) (* Chaper : Packing (Marchal cells) *) (* *) (* ========================================================================= *) (* ========================================================================= *) (* FILES NEED TO BE LOADED *) (* *) module Tezffsk = struct open Rogers;; open Vukhacky_tactics;; open Pack_defs;; open Pack_concl;; open Pack1;; open Sphere;; open Marchal_cells;; open Emnwuus;; open Marchal_cells_2_new;; open Lepjbdj;; open Njiutiu;; let TEZFFSK_concl = `!V ul vl k. saturated V /\ packing V /\ barV V 3 ul /\ barV V 3 vl /\ rogers V ul = rogers V vl /\ aff_dim (rogers V ul) = &3 /\ k <= 3 /\ hl (truncate_simplex k ul) < sqrt (&2) ==> truncate_simplex k ul = truncate_simplex k vl`;; let TEZFFSK = prove_by_refinement (TEZFFSK_concl, [(REPEAT STRIP_TAC); (ABBREV_TAC `s1 = omega_list_n V ul 1`); (ABBREV_TAC `s2 = omega_list_n V ul 2`); (ABBREV_TAC `s3 = omega_list_n V ul 3`); (NEW_GOAL `?u0 u1 u2 u3. ul = [u0;u1;u2;u3:real^3]`); (MATCH_MP_TAC BARV_3_EXPLICIT); (EXISTS_TAC `V:real^3->bool` THEN ASM_REWRITE_TAC[]); (UP_ASM_TAC THEN STRIP_TAC); (NEW_GOAL `?v0 v1 v2 v3. vl = [v0;v1;v2;v3:real^3]`); (MATCH_MP_TAC BARV_3_EXPLICIT); (EXISTS_TAC `V:real^3->bool` THEN ASM_REWRITE_TAC[]); (UP_ASM_TAC THEN STRIP_TAC); (NEW_GOAL `!i. i <= k ==> hl (truncate_simplex i (ul:(real^3)list)) < sqrt (&2)`); (REPEAT STRIP_TAC); (ABBREV_TAC `wl:(real^3)list = truncate_simplex k ul`); (REWRITE_WITH `truncate_simplex i ul = truncate_simplex i (wl:(real^3)list)`); (EXPAND_TAC "wl" THEN ONCE_REWRITE_TAC[EQ_SYM_EQ]); (MATCH_MP_TAC Packing3.TRUNCATE_TRUNCATE_SIMPLEX); (ASM_REWRITE_TAC[LENGTH]); (ASM_ARITH_TAC); (NEW_GOAL `hl (truncate_simplex i wl) <= hl (wl:(real^3)list)`); (MATCH_MP_TAC Rogers.HL_DECREASE); (EXISTS_TAC `V:real^3->bool` THEN EXISTS_TAC `k:num`); (ASM_REWRITE_TAC[IN]); (EXPAND_TAC "wl" THEN MATCH_MP_TAC Packing3.TRUNCATE_SIMPLEX_BARV); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[ARITH_RULE `3 <= 3`]); (ASM_REAL_ARITH_TAC); (NEW_GOAL `!i. i <= k ==> omega_list_n V ul i = circumcenter (set_of_list (truncate_simplex i ul))`); (REPEAT STRIP_TAC); (REWRITE_WITH `omega_list_n V ul i = omega_list V (truncate_simplex i ul)`); (ONCE_REWRITE_TAC[EQ_SYM_EQ]); (MATCH_MP_TAC Packing3.OMEGA_LIST_LEMMA); (ASM_REWRITE_TAC[LENGTH] THEN ASM_ARITH_TAC); (MATCH_MP_TAC XNHPWAB1); (EXISTS_TAC `i:num` THEN REPEAT STRIP_TAC); (ASM_REWRITE_TAC[]); (REWRITE_TAC[IN]); (MATCH_MP_TAC Packing3.TRUNCATE_SIMPLEX_BARV); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[]); (ASM_ARITH_TAC); (ASM_SIMP_TAC[]); (NEW_GOAL `!i. 0 <= i /\ i <= 3 ==> omega_list_n V ul i = omega_list_n V vl i`); (MATCH_MP_TAC NJIUTIU); (ASM_REWRITE_TAC[]); (NEW_GOAL `s1 = omega_list_n V vl 1`); (EXPAND_TAC "s1" THEN FIRST_ASSUM MATCH_MP_TAC THEN ARITH_TAC); (NEW_GOAL `s2 = omega_list_n V vl 2`); (EXPAND_TAC "s2" THEN FIRST_ASSUM MATCH_MP_TAC THEN ARITH_TAC); (NEW_GOAL `s3 = omega_list_n V vl 3`); (EXPAND_TAC "s3" THEN FIRST_ASSUM MATCH_MP_TAC THEN ARITH_TAC); (NEW_GOAL `HD ul = HD (vl:(real^3)list)`); (REWRITE_TAC[HD; ASSUME `ul = [u0;u1;u2;u3:real^3]`]); (MATCH_MP_TAC ROGERS_INTER_V_LEMMA); (EXISTS_TAC `V:real^3->bool`); (REPEAT STRIP_TAC); (ASM_REWRITE_TAC[]); (ASM_REWRITE_TAC[]); (ASM_REWRITE_TAC[]); (SUBGOAL_THEN `set_of_list (ul:(real^3)list) SUBSET V` MP_TAC); (MATCH_MP_TAC Packing3.BARV_SUBSET); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[]); (ASM_REWRITE_TAC[set_of_list] THEN SET_TAC[]); (REWRITE_TAC[GSYM (ASSUME `rogers V ul = rogers V vl`)]); (REWRITE_TAC[MESON[IN] `rogers V ul u0 <=> u0 IN rogers V ul`]); (REWRITE_WITH `rogers V ul = convex hull {HD ul, omega_list_n V ul 1, omega_list_n V ul 2, omega_list_n V ul 3}`); (MATCH_MP_TAC ROGERS_EXPLICIT); (ASM_REWRITE_TAC[]); (MATCH_MP_TAC IN_SET_IMP_IN_CONVEX_HULL_SET); (ASM_REWRITE_TAC[HD] THEN SET_TAC[]); (ASM_CASES_TAC `1 <= k`); (ABBREV_TAC `wl:(real^3)list = truncate_simplex k ul`); (NEW_GOAL `hl (wl:(real^3)list) = dist (omega_list V wl,HD wl)`); (MATCH_MP_TAC Rogers.WAUFCHE2); (EXISTS_TAC `k:num` THEN ASM_REWRITE_TAC[IN]); (EXPAND_TAC "wl" THEN MATCH_MP_TAC Packing3.TRUNCATE_SIMPLEX_BARV); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[]); (UP_ASM_TAC THEN REWRITE_WITH `omega_list V wl = omega_list_n V ul k`); (EXPAND_TAC "wl" THEN MATCH_MP_TAC Packing3.OMEGA_LIST_LEMMA); (ASM_REWRITE_TAC[LENGTH] THEN ASM_ARITH_TAC); (REWRITE_WITH `HD wl = HD (ul:(real^3)list)`); (EXPAND_TAC "wl" THEN MATCH_MP_TAC Packing3.HD_TRUNCATE_SIMPLEX); (ASM_REWRITE_TAC[LENGTH] THEN ASM_ARITH_TAC); (DISCH_TAC); (ABBREV_TAC `zl = truncate_simplex k (vl:(real^3)list)`); (NEW_GOAL `hl (zl:(real^3)list) < sqrt (&2)`); (NEW_GOAL `hl (zl:(real^3)list) <= dist (omega_list_n V ul k, HD ul)`); (REWRITE_WITH `omega_list_n V ul k = omega_list_n V vl k`); (NEW_GOAL `k = 1 \/ k = 2 \/ k = 3`); (ASM_ARITH_TAC); (UP_ASM_TAC THEN ASM_MESON_TAC[]); (REWRITE_TAC[ASSUME `HD (ul:(real^3)list) = HD vl`]); (REWRITE_WITH `omega_list_n V vl k = omega_list V zl`); (EXPAND_TAC "zl" THEN ONCE_REWRITE_TAC[EQ_SYM_EQ]); (MATCH_MP_TAC Packing3.OMEGA_LIST_LEMMA); (ASM_REWRITE_TAC[LENGTH] THEN ASM_ARITH_TAC); (REWRITE_WITH `HD vl = HD (zl:(real^3)list)`); (EXPAND_TAC "zl" THEN ONCE_REWRITE_TAC[EQ_SYM_EQ]); (MATCH_MP_TAC Packing3.HD_TRUNCATE_SIMPLEX); (ASM_REWRITE_TAC[LENGTH] THEN ASM_ARITH_TAC); (MATCH_MP_TAC WAUFCHE1); (EXISTS_TAC `k:num` THEN REWRITE_TAC[IN] THEN EXPAND_TAC "zl"); (STRIP_TAC); (ASM_REWRITE_TAC[]); (MATCH_MP_TAC Packing3.TRUNCATE_SIMPLEX_BARV); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[]); (ASM_REAL_ARITH_TAC); (NEW_GOAL `!i. i <= k ==> hl (truncate_simplex i (vl:(real^3)list)) < sqrt (&2)`); (REPEAT STRIP_TAC); (REWRITE_WITH `truncate_simplex i vl = truncate_simplex i (zl:(real^3)list)`); (EXPAND_TAC "zl" THEN ONCE_REWRITE_TAC[EQ_SYM_EQ]); (MATCH_MP_TAC Packing3.TRUNCATE_TRUNCATE_SIMPLEX); (ASM_REWRITE_TAC[LENGTH]); (ASM_ARITH_TAC); (NEW_GOAL `hl (truncate_simplex i zl) <= hl (zl:(real^3)list)`); (MATCH_MP_TAC Rogers.HL_DECREASE); (EXISTS_TAC `V:real^3->bool` THEN EXISTS_TAC `k:num`); (ASM_REWRITE_TAC[IN]); (EXPAND_TAC "zl" THEN MATCH_MP_TAC Packing3.TRUNCATE_SIMPLEX_BARV); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[ARITH_RULE `3 <= 3`]); (ASM_REAL_ARITH_TAC); (* ------------------------------------------------------------------------- *) (NEW_GOAL `~(affine_dependent {v0,v1,v2,v3:real^3})`); (REWRITE_WITH `{v0,v1,v2,v3:real^3} = set_of_list vl`); (ASM_REWRITE_TAC[set_of_list]); (MATCH_MP_TAC Rogers.BARV_AFFINE_INDEPENDENT); (EXISTS_TAC `V:real^3->bool` THEN EXISTS_TAC `3:num`); (ASM_REWRITE_TAC[]); (NEW_GOAL `rogers V ul = convex hull {HD ul, omega_list_n V ul 1, omega_list_n V ul 2, omega_list_n V ul 3}`); (MATCH_MP_TAC ROGERS_EXPLICIT); (ASM_REWRITE_TAC[]); (NEW_GOAL `~(affine_dependent {HD ul, omega_list_n V ul 1, omega_list_n V ul 2, omega_list_n V ul 3})`); (STRIP_TAC); (NEW_GOAL `aff_dim {HD ul, omega_list_n V ul 1, omega_list_n V ul 2, omega_list_n V ul 3} <= &2`); (ASM_SIMP_TAC [AFF_DEPENDENT_AFF_DIM_4]); (UP_ASM_TAC THEN REWRITE_TAC[] THEN ONCE_REWRITE_TAC[GSYM AFF_DIM_AFFINE_HULL]); (STRIP_TAC); (NEW_GOAL `aff_dim (rogers V ul) <= aff_dim (affine hull {HD ul, omega_list_n V ul 1, omega_list_n V ul 2, omega_list_n V ul 3})`); (MATCH_MP_TAC AFF_DIM_SUBSET); (REWRITE_TAC[ASSUME `rogers V ul = convex hull {HD ul, omega_list_n V ul 1, omega_list_n V ul 2, omega_list_n V ul 3}`; CONVEX_HULL_SUBSET_AFFINE_HULL]); (ASM_ARITH_TAC); (NEW_GOAL `~(affine_dependent ( set_of_list (truncate_simplex k (ul:(real^3)list))))`); (MATCH_MP_TAC Rogers.BARV_AFFINE_INDEPENDENT); (EXISTS_TAC `V:real^3->bool` THEN EXISTS_TAC `k:num`); (STRIP_TAC); (ASM_REWRITE_TAC[]); (MATCH_MP_TAC Packing3.TRUNCATE_SIMPLEX_BARV); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[]); (NEW_GOAL `CARD {v0,v1,v2,v3:real^3} = 4`); (REWRITE_WITH `{v0,v1,v2,v3:real^3} = set_of_list vl`); (ASM_REWRITE_TAC[set_of_list]); (REWRITE_WITH `LENGTH (vl:(real^3)list) = 3 + 1 /\ CARD (set_of_list vl) = 3 + 1`); (MATCH_MP_TAC Rogers.BARV_IMP_LENGTH_EQ_CARD); (EXISTS_TAC `V:real^3->bool` THEN ASM_REWRITE_TAC[]); (ARITH_TAC); (* ------------------------------------------------------------------------- *) (NEW_GOAL `u0 = v0:real^3`); (UNDISCH_TAC `HD ul = HD (vl:(real^3)list)` THEN ASM_REWRITE_TAC[HD]); (NEW_GOAL `u1 = v1:real^3`); (ABBREV_TAC `S1 = {u0, u1:real^3}`); (NEW_GOAL `!u:real^3 v. u IN S1 /\ v IN V DIFF S1 ==> dist (v,s1) > dist (u,s1)`); (MATCH_MP_TAC XYOFCGX); (REPEAT STRIP_TAC); (* 5 new subgoals *) (ASM_REWRITE_TAC[]); (* finish subgoal 1 *) (REWRITE_WITH `S1:real^3->bool = set_of_list (truncate_simplex 1 ul)`); (ASM_REWRITE_TAC[set_of_list; TRUNCATE_SIMPLEX_EXPLICIT_1]); (ASM_MESON_TAC[]); (MATCH_MP_TAC Packing3.BARV_SUBSET); (EXISTS_TAC `1` THEN MATCH_MP_TAC Packing3.TRUNCATE_SIMPLEX_BARV); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[ARITH_RULE `1 <= 3`]); (* finish subgoal 2 *) (UP_ASM_TAC THEN REWRITE_TAC[] THEN MATCH_MP_TAC AFFINE_INDEPENDENT_SUBSET); (EXISTS_TAC `set_of_list (truncate_simplex k (ul:(real^3)list))`); (ASM_REWRITE_TAC[]); (EXPAND_TAC "wl"); (ASM_CASES_TAC `k = 1`); (REWRITE_TAC[set_of_list; TRUNCATE_SIMPLEX_EXPLICIT_1; ASSUME `ul = [u0;u1;u2;u3:real^3]`; ASSUME `k = 1`]); (ASM_SET_TAC[]); (ASM_CASES_TAC `k = 2`); (REWRITE_TAC[set_of_list; TRUNCATE_SIMPLEX_EXPLICIT_2; ASSUME `ul = [u0;u1;u2;u3:real^3]`; ASSUME `k = 2`]); (ASM_SET_TAC[]); (ASM_CASES_TAC `k = 3`); (REWRITE_TAC[set_of_list; TRUNCATE_SIMPLEX_EXPLICIT_3; ASSUME `ul = [u0;u1;u2;u3:real^3]`; ASSUME `k = 3`]); (ASM_SET_TAC[]); (NEW_GOAL `F`); (ASM_ARITH_TAC); (ASM_MESON_TAC[]); (* finish subgoal 3 *) (EXPAND_TAC "s1" THEN EXPAND_TAC "S1"); (MATCH_MP_TAC OMEGA_LIST_1_EXPLICIT_NEW); (EXISTS_TAC `u2:real^3` THEN EXISTS_TAC `u3:real^3`); (REWRITE_WITH `[u0;u1:real^3] = truncate_simplex 1 ul`); (ASM_REWRITE_TAC[TRUNCATE_SIMPLEX_EXPLICIT_1]); (REWRITE_TAC[IN; MESON[] `A/\B/\C/\D/\E <=> (A/\B/\C/\D)/\E`]); (STRIP_TAC); (ASM_REWRITE_TAC[]); (FIRST_ASSUM MATCH_MP_TAC); (ASM_REWRITE_TAC[]); (REWRITE_WITH `radV (S1:real^3->bool) = hl (truncate_simplex 1 (ul:(real^3)list))`); (ASM_REWRITE_TAC[HL;TRUNCATE_SIMPLEX_EXPLICIT_1;set_of_list]); (EXPAND_TAC "S1" THEN REWRITE_TAC[ASSUME `u0 = v0:real^3`]); (FIRST_ASSUM MATCH_MP_TAC); (ASM_REWRITE_TAC[]); (* finish subgoal 5 *) (NEW_GOAL `v1:real^3 IN S1`); (ASM_CASES_TAC `v1:real^3 IN S1`); (UP_ASM_TAC THEN MESON_TAC[]); (NEW_GOAL `F`); (NEW_GOAL `dist (v1,s1) > dist (u0,s1:real^3)`); (FIRST_ASSUM MATCH_MP_TAC); (STRIP_TAC); (EXPAND_TAC "S1" THEN SET_TAC[]); (ASM_REWRITE_TAC[IN_DIFF]); (NEW_GOAL `set_of_list vl SUBSET V:real^3->bool`); (MATCH_MP_TAC Packing3.BARV_SUBSET); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[]); (UP_ASM_TAC THEN ASM_REWRITE_TAC[set_of_list]); (SET_TAC[]); (NEW_GOAL `s1 = circumcenter {v0,v1:real^3}`); (REWRITE_TAC[ASSUME `s1 = omega_list_n V vl 1`]); (MATCH_MP_TAC OMEGA_LIST_1_EXPLICIT_NEW); (EXISTS_TAC `v2:real^3` THEN EXISTS_TAC `v3:real^3`); (REWRITE_WITH `[v0;v1:real^3] = truncate_simplex 1 vl`); (ASM_REWRITE_TAC[TRUNCATE_SIMPLEX_EXPLICIT_1]); (REWRITE_TAC[IN; MESON[] `A/\B/\C/\D/\E <=> (A/\B/\C/\D)/\E`]); (STRIP_TAC); (ASM_REWRITE_TAC[]); (FIRST_ASSUM MATCH_MP_TAC); (ASM_REWRITE_TAC[]); (UP_ASM_TAC THEN REWRITE_TAC[Rogers.CIRCUMCENTER_2; midpoint]); (STRIP_TAC THEN SWITCH_TAC THEN UP_ASM_TAC THEN REWRITE_TAC[ ASSUME `s1:real^3 = inv (&2) % (v0 + v1)`; ASSUME `u0 = v0:real^3`;dist]); (REWRITE_TAC[VECTOR_ARITH `v1 - inv (&2) % (v0 + v1) = inv (&2) % (v1 - v0) /\ v0 - inv (&2) % (v0 + v1) = (-- inv (&2)) % (v1 - v0)`; NORM_MUL; REAL_ABS_NEG] THEN REAL_ARITH_TAC); (ASM_MESON_TAC[]); (NEW_GOAL `~(v1 = u0:real^3)`); (REWRITE_TAC[ASSUME `u0 = v0:real^3`]); (STRIP_TAC); (UNDISCH_TAC `CARD {v0,v1,v2,v3:real^3} = 4`); (ASM_REWRITE_TAC[SET_RULE `{a,a,b,c} = {a,b,c}`]); (NEW_GOAL `CARD {v0,v2,v3:real^3} <= 3`); (REWRITE_TAC[Geomdetail.CARD3]); (UP_ASM_TAC THEN ARITH_TAC); (ASM_SET_TAC[]); (ASM_CASES_TAC `k = 1`); (EXPAND_TAC "wl" THEN EXPAND_TAC "zl" THEN REWRITE_TAC[ASSUME `k = 1`]); (ASM_REWRITE_TAC[TRUNCATE_SIMPLEX_EXPLICIT_1]); (* ======================================================================= *) (NEW_GOAL `u2 = v2:real^3`); (ABBREV_TAC `S2 = {u0, u1, u2:real^3}`); (NEW_GOAL `!u:real^3 v. u IN S2 /\ v IN V DIFF S2 ==> dist (v,s2) > dist (u,s2)`); (MATCH_MP_TAC XYOFCGX); (REPEAT STRIP_TAC); (* 5 new subgoals *) (ASM_REWRITE_TAC[]); (* finish subgoal 1 *) (REWRITE_WITH `S2:real^3->bool = set_of_list (truncate_simplex 2 ul)`); (ASM_REWRITE_TAC[set_of_list; TRUNCATE_SIMPLEX_EXPLICIT_2]); (ASM_MESON_TAC[]); (MATCH_MP_TAC Packing3.BARV_SUBSET); (EXISTS_TAC `2` THEN MATCH_MP_TAC Packing3.TRUNCATE_SIMPLEX_BARV); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[ARITH_RULE `2 <= 3`]); (* finish subgoal 2 *) (UP_ASM_TAC THEN REWRITE_TAC[] THEN MATCH_MP_TAC AFFINE_INDEPENDENT_SUBSET); (EXISTS_TAC `set_of_list (truncate_simplex k (ul:(real^3)list))`); (ASM_REWRITE_TAC[]); (EXPAND_TAC "wl"); (ASM_CASES_TAC `k = 2`); (REWRITE_TAC[set_of_list; TRUNCATE_SIMPLEX_EXPLICIT_2; ASSUME `ul = [u0;u1;u2;u3:real^3]`; ASSUME `k = 2`]); (ASM_SET_TAC[]); (ASM_CASES_TAC `k = 3`); (REWRITE_TAC[set_of_list; TRUNCATE_SIMPLEX_EXPLICIT_3; ASSUME `ul = [u0;u1;u2;u3:real^3]`; ASSUME `k = 3`]); (ASM_SET_TAC[]); (NEW_GOAL `F`); (ASM_ARITH_TAC); (ASM_MESON_TAC[]); (* finish subgoal 3 *) (EXPAND_TAC "s2" THEN EXPAND_TAC "S2"); (MATCH_MP_TAC OMEGA_LIST_2_EXPLICIT_NEW); (EXISTS_TAC `u3:real^3`); (REWRITE_WITH `[u0;u1;u2:real^3] = truncate_simplex 2 ul`); (ASM_REWRITE_TAC[TRUNCATE_SIMPLEX_EXPLICIT_2]); (REWRITE_TAC[IN; MESON[] `A/\B/\C/\D/\E <=> (A/\B/\C/\D)/\E`]); (STRIP_TAC); (ASM_REWRITE_TAC[]); (FIRST_ASSUM MATCH_MP_TAC); (ASM_ARITH_TAC); (REWRITE_WITH `radV (S2:real^3->bool) = hl (truncate_simplex 2 (ul:(real^3)list))`); (ASM_REWRITE_TAC[HL;TRUNCATE_SIMPLEX_EXPLICIT_2;set_of_list]); (EXPAND_TAC "S2" THEN REWRITE_TAC[ASSUME `u0 = v0:real^3`; ASSUME `u1 = v1:real^3`]); (FIRST_ASSUM MATCH_MP_TAC); (ASM_ARITH_TAC); (* finish subgoal 5 *) (NEW_GOAL `v2:real^3 IN S2`); (ASM_CASES_TAC `v2:real^3 IN S2`); (UP_ASM_TAC THEN MESON_TAC[]); (NEW_GOAL `F`); (NEW_GOAL `dist (v2,s2) > dist (u0,s2:real^3)`); (FIRST_ASSUM MATCH_MP_TAC); (STRIP_TAC); (EXPAND_TAC "S2" THEN SET_TAC[]); (ASM_REWRITE_TAC[IN_DIFF]); (NEW_GOAL `set_of_list vl SUBSET V:real^3->bool`); (MATCH_MP_TAC Packing3.BARV_SUBSET); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[]); (UP_ASM_TAC THEN ASM_REWRITE_TAC[set_of_list]); (SET_TAC[]); (NEW_GOAL `s2 = circumcenter {v0,v1,v2:real^3}`); (REWRITE_TAC[ASSUME `s2 = omega_list_n V vl 2`]); (MATCH_MP_TAC OMEGA_LIST_2_EXPLICIT_NEW); (EXISTS_TAC `v3:real^3`); (REWRITE_WITH `[v0;v1;v2:real^3] = truncate_simplex 2 vl`); (ASM_REWRITE_TAC[TRUNCATE_SIMPLEX_EXPLICIT_2]); (REWRITE_TAC[IN; MESON[] `A/\B/\C/\D/\E <=> (A/\B/\C/\D)/\E`]); (STRIP_TAC); (ASM_REWRITE_TAC[]); (FIRST_ASSUM MATCH_MP_TAC); (ASM_ARITH_TAC); (NEW_GOAL `!w:real^3. w IN {v0,v1,v2} ==> radV {v0,v1,v2} = dist (s2:real^3,w)`); (REWRITE_TAC[ASSUME `s2 = circumcenter {v0, v1, v2:real^3}`]); (MATCH_MP_TAC Rogers.OAPVION2); (MATCH_MP_TAC AFFINE_INDEPENDENT_SUBSET); (EXISTS_TAC `{v0,v1,v2,v3:real^3}`); (ASM_REWRITE_TAC[] THEN SET_TAC[]); (NEW_GOAL `dist (u0,s2:real^3) = radV {v0, v1, v2:real^3}`); (ONCE_REWRITE_TAC[DIST_SYM]); (ONCE_REWRITE_TAC[EQ_SYM_EQ]); (FIRST_ASSUM MATCH_MP_TAC); (ASM_SET_TAC[]); (NEW_GOAL `dist (v2,s2:real^3) = radV {v0, v1, v2:real^3}`); (ONCE_REWRITE_TAC[DIST_SYM]); (ONCE_REWRITE_TAC[EQ_SYM_EQ]); (FIRST_ASSUM MATCH_MP_TAC); (SET_TAC[]); (ASM_REAL_ARITH_TAC); (ASM_MESON_TAC[]); (NEW_GOAL `~(v2 = u0:real^3)`); (REWRITE_TAC[ASSUME `u0 = v0:real^3`]); (STRIP_TAC); (UNDISCH_TAC `CARD {v0,v1,v2,v3:real^3} = 4`); (ASM_REWRITE_TAC[SET_RULE `{a,b,a,c} = {a,b,c}`]); (NEW_GOAL `CARD {v0,v1,v3:real^3} <= 3`); (REWRITE_TAC[Geomdetail.CARD3]); (UP_ASM_TAC THEN ARITH_TAC); (NEW_GOAL `~(v2 = u1:real^3)`); (REWRITE_TAC[ASSUME `u1 = v1:real^3`]); (STRIP_TAC); (UNDISCH_TAC `CARD {v0,v1,v2,v3:real^3} = 4`); (ASM_REWRITE_TAC[SET_RULE `{a,b,b,c} = {a,b,c}`]); (NEW_GOAL `CARD {v0,v1,v3:real^3} <= 3`); (REWRITE_TAC[Geomdetail.CARD3]); (UP_ASM_TAC THEN ARITH_TAC); (ASM_SET_TAC[]); (ASM_CASES_TAC `k = 2`); (EXPAND_TAC "wl" THEN EXPAND_TAC "zl" THEN REWRITE_TAC[ASSUME `k = 2`]); (ASM_REWRITE_TAC[TRUNCATE_SIMPLEX_EXPLICIT_2]); (* ------------------------------------------------------------------------ *) (NEW_GOAL `k = 3`); (ASM_ARITH_TAC); (NEW_GOAL `u3 = v3:real^3`); (ABBREV_TAC `S3 = {u0, u1, u2, u3:real^3}`); (NEW_GOAL `!u:real^3 v. u IN S3 /\ v IN V DIFF S3 ==> dist (v,s3) > dist (u,s3)`); (MATCH_MP_TAC XYOFCGX); (REPEAT STRIP_TAC); (* 5 new subgoals *) (ASM_REWRITE_TAC[]); (* finish subgoal 1 *) (REWRITE_WITH `S3:real^3->bool = set_of_list ul`); (ASM_REWRITE_TAC[set_of_list]); (ASM_MESON_TAC[]); (MATCH_MP_TAC Packing3.BARV_SUBSET); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[]); (* finish subgoal 2 *) (UP_ASM_TAC THEN EXPAND_TAC "S3"); (REWRITE_WITH `{u0, u1, u2, u3:real^3} = set_of_list (truncate_simplex k ul)`); (REWRITE_TAC[ASSUME `k = 3`; ASSUME `ul = [u0;u1;u2;u3:real^3]`; set_of_list; TRUNCATE_SIMPLEX_EXPLICIT_3]); (ASM_REWRITE_TAC[]); (* finish subgoal 3 *) (EXPAND_TAC "s3" THEN EXPAND_TAC "S3"); (MATCH_MP_TAC OMEGA_LIST_3_EXPLICIT); (REWRITE_TAC[IN; MESON[] `A/\B/\C/\D/\E <=>(A/\B/\C/\E)/\D`] THEN STRIP_TAC); (ASM_REWRITE_TAC[]); (REWRITE_WITH `hl (ul:(real^3)list) = hl (wl:(real^3)list)`); (EXPAND_TAC "wl" THEN REWRITE_TAC[ASSUME `k = 3`]); (ASM_REWRITE_TAC[TRUNCATE_SIMPLEX_EXPLICIT_3]); (ASM_REWRITE_TAC[]); (REWRITE_WITH `radV (S3:real^3->bool) = hl (truncate_simplex 3 (ul:(real^3)list))`); (ASM_REWRITE_TAC[HL;TRUNCATE_SIMPLEX_EXPLICIT_3;set_of_list]); (EXPAND_TAC "S3" THEN REWRITE_TAC[ASSUME `u0 = v0:real^3`; ASSUME `u1 = v1:real^3`; ASSUME `u2 = v2:real^3`]); (FIRST_ASSUM MATCH_MP_TAC); (ASM_ARITH_TAC); (* finish subgoal 5 *) (NEW_GOAL `v3:real^3 IN S3`); (ASM_CASES_TAC `v3:real^3 IN S3`); (UP_ASM_TAC THEN MESON_TAC[]); (NEW_GOAL `F`); (NEW_GOAL `dist (v3,s3) > dist (u0,s3:real^3)`); (FIRST_ASSUM MATCH_MP_TAC); (STRIP_TAC); (EXPAND_TAC "S3" THEN SET_TAC[]); (ASM_REWRITE_TAC[IN_DIFF]); (NEW_GOAL `set_of_list vl SUBSET V:real^3->bool`); (MATCH_MP_TAC Packing3.BARV_SUBSET); (EXISTS_TAC `3` THEN ASM_REWRITE_TAC[]); (UP_ASM_TAC THEN ASM_REWRITE_TAC[set_of_list]); (SET_TAC[]); (NEW_GOAL `s3 = circumcenter {v0,v1,v2, v3:real^3}`); (REWRITE_TAC[ASSUME `s3 = omega_list_n V vl 3`]); (MATCH_MP_TAC OMEGA_LIST_3_EXPLICIT); (REWRITE_TAC[IN; MESON[] `A/\B/\C/\D/\E <=>(A/\B/\C/\E)/\D`] THEN STRIP_TAC); (ASM_REWRITE_TAC[]); (REWRITE_WITH `hl (vl:(real^3)list) = hl (zl:(real^3)list)`); (EXPAND_TAC "zl" THEN REWRITE_TAC[ASSUME `k = 3`]); (ASM_REWRITE_TAC[TRUNCATE_SIMPLEX_EXPLICIT_3]); (ASM_REWRITE_TAC[]); (NEW_GOAL `!w:real^3. w IN {v0,v1,v2,v3} ==> radV {v0,v1,v2,v3} = dist (s3:real^3,w)`); (REWRITE_TAC[ASSUME `s3 = circumcenter {v0, v1, v2, v3:real^3}`]); (MATCH_MP_TAC Rogers.OAPVION2); (ASM_REWRITE_TAC[]); (NEW_GOAL `dist (u0,s3:real^3) = radV {v0, v1, v2, v3:real^3}`); (ONCE_REWRITE_TAC[DIST_SYM]); (ONCE_REWRITE_TAC[EQ_SYM_EQ]); (FIRST_ASSUM MATCH_MP_TAC); (ASM_SET_TAC[]); (NEW_GOAL `dist (v3,s3:real^3) = radV {v0, v1, v2, v3:real^3}`); (ONCE_REWRITE_TAC[DIST_SYM]); (ONCE_REWRITE_TAC[EQ_SYM_EQ]); (FIRST_ASSUM MATCH_MP_TAC); (SET_TAC[]); (ASM_REAL_ARITH_TAC); (ASM_MESON_TAC[]); (NEW_GOAL `~(v3 = u0:real^3)`); (REWRITE_TAC[ASSUME `u0 = v0:real^3`]); (STRIP_TAC); (UNDISCH_TAC `CARD {v0,v1,v2,v3:real^3} = 4`); (ASM_REWRITE_TAC[SET_RULE `{a,b,c,a} = {a,b,c}`]); (NEW_GOAL `CARD {v0,v1,v2:real^3} <= 3`); (REWRITE_TAC[Geomdetail.CARD3]); (UP_ASM_TAC THEN ARITH_TAC); (NEW_GOAL `~(v3 = u1:real^3)`); (REWRITE_TAC[ASSUME `u1 = v1:real^3`]); (STRIP_TAC); (UNDISCH_TAC `CARD {v0,v1,v2,v3:real^3} = 4`); (ASM_REWRITE_TAC[SET_RULE `{a,b,c,b} = {a,b,c}`]); (NEW_GOAL `CARD {v0,v1,v2:real^3} <= 3`); (REWRITE_TAC[Geomdetail.CARD3]); (UP_ASM_TAC THEN ARITH_TAC); (NEW_GOAL `~(v3 = u2:real^3)`); (REWRITE_TAC[ASSUME `u2 = v2:real^3`]); (STRIP_TAC); (UNDISCH_TAC `CARD {v0,v1,v2,v3:real^3} = 4`); (ASM_REWRITE_TAC[SET_RULE `{a,b,c,c} = {a,b,c}`]); (NEW_GOAL `CARD {v0,v1,v2:real^3} <= 3`); (REWRITE_TAC[Geomdetail.CARD3]); (UP_ASM_TAC THEN ARITH_TAC); (ASM_SET_TAC[]); (EXPAND_TAC "wl" THEN EXPAND_TAC "zl" THEN REWRITE_TAC[ASSUME `k = 3`]); (ASM_REWRITE_TAC[TRUNCATE_SIMPLEX_EXPLICIT_3]); (* ------------------------------------------------------------------------ *) (NEW_GOAL `k = 0`); (ASM_ARITH_TAC); (ASM_REWRITE_TAC[TRUNCATE_SIMPLEX_EXPLICIT_0]); (REWRITE_WITH `u0:real^3 = HD ul /\ v0:real^3 = HD vl`); (ASM_MESON_TAC[HD]); (ASM_REWRITE_TAC[])]);; (* ========================================================================= *) end;;