isabelle: src/HOL/Hyperreal/HRealAbs.ML@ee360f910ec8 (annotated)

10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	1	(* Title : HRealAbs.ML
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	2	Author : Jacques D. Fleuriot
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	3	Copyright : 1998 University of Cambridge
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	4	Description : Absolute value function for the hyperreals
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	5	Similar to RealAbs.thy
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	6	*)
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	7
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	8	(*------------------------------------------------------------
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	9	absolute value on hyperreals as pointwise operation on
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	10	equivalence class representative
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	11	------------------------------------------------------------*)
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	12
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	13	Goalw [hrabs_def]
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	14	"abs (number_of v :: hypreal) = \
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	15	\ (if neg (number_of v) then number_of (bin_minus v) \
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	16	\ else number_of v)";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	17	by (Simp_tac 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	18	qed "hrabs_number_of";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	19	Addsimps [hrabs_number_of];
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	20
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	21	Goalw [hrabs_def]
10834 a7897aebbffc * empty log message * nipkow parents: 10797 diff changeset	22	"abs (Abs_hypreal (hyprel `` {X})) = \
a7897aebbffc * empty log message * nipkow parents: 10797 diff changeset	23	\ Abs_hypreal(hyprel `` {%n. abs (X n)})";
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	24	by (auto_tac (claset(),
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	25	simpset_of HyperDef.thy
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	26	addsimps [hypreal_zero_def, hypreal_le,hypreal_minus]));
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	27	by (ALLGOALS(Ultra_tac THEN' arith_tac ));
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	28	qed "hypreal_hrabs";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	29
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	30	(*------------------------------------------------------------
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	31	Properties of the absolute value function over the reals
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	32	(adapted version of previously proved theorems about abs)
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	33	------------------------------------------------------------*)
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	34
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	35	Goal "abs (0::hypreal) = 0";
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	36	by (simp_tac (simpset() addsimps [hrabs_def]) 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	37	qed "hrabs_zero";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	38	Addsimps [hrabs_zero];
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	39
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	40	Goal "abs (1::hypreal) = 1";
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	41	by (simp_tac (simpset() addsimps [hrabs_def]) 1);
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	42	qed "hrabs_one";
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	43	Addsimps [hrabs_one];
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	44
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	45	Goal "(0::hypreal)<=x ==> abs x = x";
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	46	by (asm_simp_tac (simpset() addsimps [hrabs_def]) 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	47	qed "hrabs_eqI1";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	48
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	49	Goal "(0::hypreal)<x ==> abs x = x";
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	50	by (asm_simp_tac (simpset() addsimps [order_less_imp_le, hrabs_eqI1]) 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	51	qed "hrabs_eqI2";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	52
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	53	Goal "x<(0::hypreal) ==> abs x = -x";
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	54	by (asm_simp_tac (simpset() addsimps [hypreal_le_def, hrabs_def]) 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	55	qed "hrabs_minus_eqI2";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	56
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	57	Goal "x<=(0::hypreal) ==> abs x = -x";
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	58	by (auto_tac (claset() addDs [order_antisym], simpset() addsimps [hrabs_def]));qed "hrabs_minus_eqI1";
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	59
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	60	Goal "(0::hypreal)<= abs x";
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	61	by (simp_tac (simpset() addsimps [hrabs_def]) 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	62	qed "hrabs_ge_zero";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	63
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	64	Goal "abs(abs x) = abs (x::hypreal)";
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	65	by (simp_tac (simpset() addsimps [hrabs_def]) 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	66	qed "hrabs_idempotent";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	67	Addsimps [hrabs_idempotent];
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	68
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	69	Goalw [hrabs_def] "(abs x = (0::hypreal)) = (x=0)";
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	70	by (Simp_tac 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	71	qed "hrabs_zero_iff";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	72	AddIffs [hrabs_zero_iff];
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	73
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	74	Goalw [hrabs_def] "(x::hypreal) <= abs x";
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	75	by (Simp_tac 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	76	qed "hrabs_ge_self";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	77
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	78	Goalw [hrabs_def] "-(x::hypreal) <= abs x";
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	79	by (Simp_tac 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	80	qed "hrabs_ge_minus_self";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	81
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	82	(* proof by "transfer" *)
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	83	Goal "abs(x(y::hypreal)) = (abs x)(abs y)";
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	84	by (res_inst_tac [("z","x")] eq_Abs_hypreal 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	85	by (res_inst_tac [("z","y")] eq_Abs_hypreal 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	86	by (auto_tac (claset(),
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	87	simpset() addsimps [hypreal_hrabs, hypreal_mult,abs_mult]));
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	88	qed "hrabs_mult";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	89	Addsimps [hrabs_mult];
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	90
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	91	Goal "abs(inverse(x)) = inverse(abs(x::hypreal))";
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	92	by (simp_tac (simpset() addsimps [hypreal_minus_inverse, hrabs_def]) 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	93	qed "hrabs_inverse";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	94
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	95	Goalw [hrabs_def] "abs(x+(y::hypreal)) <= abs x + abs y";
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	96	by (Simp_tac 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	97	qed "hrabs_triangle_ineq";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	98
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	99	Goal "abs((w::hypreal) + x + y) <= abs(w) + abs(x) + abs(y)";
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	100	by (simp_tac (simpset() addsimps [hrabs_triangle_ineq RS order_trans]) 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	101	qed "hrabs_triangle_ineq_three";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	102
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	103	Goalw [hrabs_def] "abs(-x) = abs((x::hypreal))";
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	104	by (Simp_tac 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	105	qed "hrabs_minus_cancel";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	106	Addsimps [hrabs_minus_cancel];
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	107
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	108	Goalw [hrabs_def] "[\| abs x < r; abs y < s \|] ==> abs(x+y) < r + (s::hypreal)";
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	109	by (asm_full_simp_tac (simpset() addsplits [split_if_asm]) 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	110	qed "hrabs_add_less";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	111
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	112	Goal "[\| abs x<r; abs y<s \|] ==> abs x * abs y < r * (s::hypreal)";
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	113	by (subgoal_tac "0 < r" 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	114	by (asm_full_simp_tac (simpset() addsimps [hrabs_def]
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	115	addsplits [split_if_asm]) 2);
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	116	by (case_tac "y = 0" 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	117	by (asm_full_simp_tac (simpset() addsimps [hypreal_0_less_mult_iff]) 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	118	by (rtac hypreal_mult_less_mono 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	119	by (auto_tac (claset(),
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	120	simpset() addsimps [hrabs_def, linorder_neq_iff]
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	121	addsplits [split_if_asm]));
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	122	qed "hrabs_mult_less";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	123
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	124	Goal "((0::hypreal) < abs x) = (x ~= 0)";
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	125	by (simp_tac (simpset() addsimps [hrabs_def]) 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	126	by (arith_tac 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	127	qed "hypreal_0_less_abs_iff";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	128	Addsimps [hypreal_0_less_abs_iff];
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	129
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	130	Goal "abs x < r ==> (0::hypreal) < r";
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	131	by (blast_tac (claset() addSIs [order_le_less_trans, hrabs_ge_zero]) 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	132	qed "hrabs_less_gt_zero";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	133
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	134	Goal "abs x = (x::hypreal) \| abs x = -x";
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	135	by (simp_tac (simpset() addsimps [hrabs_def]) 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	136	qed "hrabs_disj";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	137
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	138	Goal "abs x = (y::hypreal) ==> x = y \| -x = y";
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	139	by (asm_full_simp_tac (simpset() addsimps [hrabs_def]
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	140	addsplits [split_if_asm]) 1);
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	141	qed "hrabs_eq_disj";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	142
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	143	Goalw [hrabs_def] "(abs x < (r::hypreal)) = (-r < x & x < r)";
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	144	by Auto_tac;
10750 a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	145	qed "hrabs_interval_iff";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	146
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	147	Goal "(abs x < (r::hypreal)) = (- x < r & x < r)";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	148	by (auto_tac (claset(), simpset() addsimps [hrabs_interval_iff]));
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	149	qed "hrabs_interval_iff2";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	150
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	151
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	152	(* Needed in Geom.ML *)
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	153	Goal "(y::hypreal) + - x + (y + - z) = abs (x + - z) ==> y = z \| x = y";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	154	by (asm_full_simp_tac (simpset() addsimps [hrabs_def]
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	155	addsplits [split_if_asm]) 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	156	qed "hrabs_add_lemma_disj";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	157
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	158	Goal "abs((x::hypreal) + -y) = abs (y + -x)";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	159	by (simp_tac (simpset() addsimps [hrabs_def]) 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	160	qed "hrabs_minus_add_cancel";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	161
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	162	(* Needed in Geom.ML?? *)
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	163	Goal "(x::hypreal) + - y + (z + - y) = abs (x + - z) ==> y = z \| x = y";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	164	by (asm_full_simp_tac (simpset() addsimps [hrabs_def]
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	165	addsplits [split_if_asm]) 1);
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	166	qed "hrabs_add_lemma_disj2";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	167
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	168
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	169	(*----------------------------------------------------------
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	170	Relating hrabs to abs through embedding of IR into IR*
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	171	----------------------------------------------------------*)
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	172	Goalw [hypreal_of_real_def]
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	173	"abs (hypreal_of_real r) = hypreal_of_real (abs r)";
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	174	by (auto_tac (claset(), simpset() addsimps [hypreal_hrabs]));
a681d3df1a39 separation of HOL-Hyperreal from HOL-Real paulson parents: diff changeset	175	qed "hypreal_of_real_hrabs";
10778 2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	176
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	177
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	178	(*----------------------------------------------------------------------------
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	179	Embedding of the naturals in the hyperreals
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	180	----------------------------------------------------------------------------*)
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	181
10784 27e4d90b35b5 more removal of obsolete rules paulson parents: 10778 diff changeset	182	Goal "hypreal_of_nat (m + n) = hypreal_of_nat m + hypreal_of_nat n";
27e4d90b35b5 more removal of obsolete rules paulson parents: 10778 diff changeset	183	by (simp_tac (simpset() addsimps [hypreal_of_nat_def]) 1);
10778 2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	184	qed "hypreal_of_nat_add";
10784 27e4d90b35b5 more removal of obsolete rules paulson parents: 10778 diff changeset	185	Addsimps [hypreal_of_nat_add];
27e4d90b35b5 more removal of obsolete rules paulson parents: 10778 diff changeset	186
27e4d90b35b5 more removal of obsolete rules paulson parents: 10778 diff changeset	187	Goal "hypreal_of_nat (m * n) = hypreal_of_nat m * hypreal_of_nat n";
27e4d90b35b5 more removal of obsolete rules paulson parents: 10778 diff changeset	188	by (simp_tac (simpset() addsimps [hypreal_of_nat_def]) 1);
27e4d90b35b5 more removal of obsolete rules paulson parents: 10778 diff changeset	189	qed "hypreal_of_nat_mult";
27e4d90b35b5 more removal of obsolete rules paulson parents: 10778 diff changeset	190	Addsimps [hypreal_of_nat_mult];
10778 2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	191
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	192	Goalw [hypreal_of_nat_def]
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	193	"(n < m) = (hypreal_of_nat n < hypreal_of_nat m)";
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	194	by (auto_tac (claset() addIs [hypreal_add_less_mono1], simpset()));
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	195	qed "hypreal_of_nat_less_iff";
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	196	Addsimps [hypreal_of_nat_less_iff RS sym];
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	197
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	198	(------------------------------------------------------------)
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	199	(* naturals embedded in hyperreals *)
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	200	(* is a hyperreal c.f. NS extension *)
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	201	(------------------------------------------------------------)
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	202
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	203	Goalw [hypreal_of_nat_def, hypreal_of_real_def, real_of_nat_def]
10919 144ede948e58 renamings: real_of_nat, real_of_int -> (overloaded) real paulson parents: 10834 diff changeset	204	"hypreal_of_nat m = Abs_hypreal(hyprel``{%n. real m})";
10778 2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	205	by Auto_tac;
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	206	qed "hypreal_of_nat_iff";
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	207
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	208	Goal "inj hypreal_of_nat";
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	209	by (simp_tac (simpset() addsimps [inj_on_def, hypreal_of_nat_def]) 1);
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	210	qed "inj_hypreal_of_nat";
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	211
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	212	Goalw [hypreal_of_nat_def]
11713 883d559b0b8c sane numerals (stage 3): provide generic "1" on all number types; wenzelm parents: 11701 diff changeset	213	"hypreal_of_nat (Suc n) = hypreal_of_nat n + (1::hypreal)";
10778 2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	214	by (simp_tac (simpset() addsimps [real_of_nat_Suc]) 1);
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	215	qed "hypreal_of_nat_Suc";
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	216
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	217	("neg" is used in rewrite rules for binary comparisons)
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	218	Goal "hypreal_of_nat (number_of v :: nat) = \
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	219	\ (if neg (number_of v) then 0 \
10778 2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	220	\ else (number_of v :: hypreal))";
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	221	by (simp_tac (simpset() addsimps [hypreal_of_nat_def]) 1);
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	222	qed "hypreal_of_nat_number_of";
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	223	Addsimps [hypreal_of_nat_number_of];
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	224
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	225	Goal "hypreal_of_nat 0 = 0";
10778 2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	226	by (simp_tac (simpset() delsimps [numeral_0_eq_0]
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	227	addsimps [numeral_0_eq_0 RS sym]) 1);
10778 2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	228	qed "hypreal_of_nat_zero";
2c6605049646 more tidying, especially to remove real_of_posnat paulson parents: 10750 diff changeset	229	Addsimps [hypreal_of_nat_zero];
12018 ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	230
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	231	Goal "hypreal_of_nat 1 = 1";
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	232	by (simp_tac (simpset() addsimps [hypreal_of_nat_Suc]) 1);
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	233	qed "hypreal_of_nat_one";
ec054019c910 Numerals and simprocs for types real and hypreal. The abstract paulson parents: 11713 diff changeset	234	Addsimps [hypreal_of_nat_one];

author	berghofe
	Mon, 19 Nov 2001 17:42:00 +0100
changeset 12239	ee360f910ec8
parent 12018	ec054019c910
child 14299	0b5c0b0a3eba
permissions	-rw-r--r--