isabelle: src/HOL/Matrix_LP/LP.thy@bdc2c6b40bf2 (annotated)

47455 26315a545e26 updated headers; wenzelm parents: 46988 diff changeset	1	(* Title: HOL/Matrix_LP/LP.thy
19453 e4f382a270ad added LP.thy obua parents: diff changeset	2	Author: Steven Obua
e4f382a270ad added LP.thy obua parents: diff changeset	3	*)
e4f382a270ad added LP.thy obua parents: diff changeset	4
e4f382a270ad added LP.thy obua parents: diff changeset	5	theory LP
41413 64cd30d6b0b8 explicit file specifications -- avoid secondary load path; wenzelm parents: 37884 diff changeset	6	imports Main "~~/src/HOL/Library/Lattice_Algebras"
19453 e4f382a270ad added LP.thy obua parents: diff changeset	7	begin
e4f382a270ad added LP.thy obua parents: diff changeset	8
37884 314a88278715 discontinued pretending that abel_cancel is logic-independent; cleaned up junk haftmann parents: 35032 diff changeset	9	lemma le_add_right_mono:
314a88278715 discontinued pretending that abel_cancel is logic-independent; cleaned up junk haftmann parents: 35032 diff changeset	10	assumes
314a88278715 discontinued pretending that abel_cancel is logic-independent; cleaned up junk haftmann parents: 35032 diff changeset	11	"a <= b + (c::'a::ordered_ab_group_add)"
314a88278715 discontinued pretending that abel_cancel is logic-independent; cleaned up junk haftmann parents: 35032 diff changeset	12	"c <= d"
314a88278715 discontinued pretending that abel_cancel is logic-independent; cleaned up junk haftmann parents: 35032 diff changeset	13	shows "a <= b + d"
314a88278715 discontinued pretending that abel_cancel is logic-independent; cleaned up junk haftmann parents: 35032 diff changeset	14	apply (rule_tac order_trans[where y = "b+c"])
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	15	apply (simp_all add: assms)
37884 314a88278715 discontinued pretending that abel_cancel is logic-independent; cleaned up junk haftmann parents: 35032 diff changeset	16	done
314a88278715 discontinued pretending that abel_cancel is logic-independent; cleaned up junk haftmann parents: 35032 diff changeset	17
19453 e4f382a270ad added LP.thy obua parents: diff changeset	18	lemma linprog_dual_estimate:
e4f382a270ad added LP.thy obua parents: diff changeset	19	assumes
35028 108662d50512 more consistent naming of type classes involving orderings (and lattices) -- c.f. NEWS haftmann parents: 32491 diff changeset	20	"A * x \<le> (b::'a::lattice_ring)"
19453 e4f382a270ad added LP.thy obua parents: diff changeset	21	"0 \<le> y"
50252 4aa34bd43228 eliminated slightly odd identifiers; wenzelm parents: 47455 diff changeset	22	"abs (A - A') \<le> \<delta>_A"
19453 e4f382a270ad added LP.thy obua parents: diff changeset	23	"b \<le> b'"
50252 4aa34bd43228 eliminated slightly odd identifiers; wenzelm parents: 47455 diff changeset	24	"abs (c - c') \<le> \<delta>_c"
19453 e4f382a270ad added LP.thy obua parents: diff changeset	25	"abs x \<le> r"
e4f382a270ad added LP.thy obua parents: diff changeset	26	shows
50252 4aa34bd43228 eliminated slightly odd identifiers; wenzelm parents: 47455 diff changeset	27	"c * x \<le> y * b' + (y * \<delta>_A + abs (y * A' - c') + \<delta>_c) * r"
19453 e4f382a270ad added LP.thy obua parents: diff changeset	28	proof -
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	29	from assms have 1: "y * b <= y * b'" by (simp add: mult_left_mono)
efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	30	from assms have 2: "y * (A * x) <= y * b" by (simp add: mult_left_mono)
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 23477 diff changeset	31	have 3: "y * (A * x) = c * x + (y * (A - A') + (y * A' - c') + (c'-c)) * x" by (simp add: algebra_simps)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	32	from 1 2 3 have 4: "c * x + (y * (A - A') + (y * A' - c') + (c'-c)) * x <= y * b'" by simp
e4f382a270ad added LP.thy obua parents: diff changeset	33	have 5: "c * x <= y * b' + abs((y * (A - A') + (y * A' - c') + (c'-c)) * x)"
e4f382a270ad added LP.thy obua parents: diff changeset	34	by (simp only: 4 estimate_by_abs)
e4f382a270ad added LP.thy obua parents: diff changeset	35	have 6: "abs((y * (A - A') + (y * A' - c') + (c'-c)) * x) <= abs (y * (A - A') + (y * A' - c') + (c'-c)) * abs x"
e4f382a270ad added LP.thy obua parents: diff changeset	36	by (simp add: abs_le_mult)
e4f382a270ad added LP.thy obua parents: diff changeset	37	have 7: "(abs (y * (A - A') + (y * A' - c') + (c'-c))) * abs x <= (abs (y * (A-A') + (yA'-c')) + abs(c'-c)) abs x"
e4f382a270ad added LP.thy obua parents: diff changeset	38	by(rule abs_triangle_ineq [THEN mult_right_mono]) simp
e4f382a270ad added LP.thy obua parents: diff changeset	39	have 8: " (abs (y * (A-A') + (yA'-c')) + abs(c'-c)) abs x <= (abs (y * (A-A')) + abs (yA'-c') + abs(c'-c)) abs x"
e4f382a270ad added LP.thy obua parents: diff changeset	40	by (simp add: abs_triangle_ineq mult_right_mono)
e4f382a270ad added LP.thy obua parents: diff changeset	41	have 9: "(abs (y * (A-A')) + abs (yA'-c') + abs(c'-c)) abs x <= (abs y * abs (A-A') + abs (yA'-c') + abs (c'-c)) abs x"
e4f382a270ad added LP.thy obua parents: diff changeset	42	by (simp add: abs_le_mult mult_right_mono)
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 23477 diff changeset	43	have 10: "c'-c = -(c-c')" by (simp add: algebra_simps)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	44	have 11: "abs (c'-c) = abs (c-c')"
e4f382a270ad added LP.thy obua parents: diff changeset	45	by (subst 10, subst abs_minus_cancel, simp)
50252 4aa34bd43228 eliminated slightly odd identifiers; wenzelm parents: 47455 diff changeset	46	have 12: "(abs y * abs (A-A') + abs (yA'-c') + abs (c'-c)) abs x <= (abs y * abs (A-A') + abs (yA'-c') + \<delta>_c) abs x"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	47	by (simp add: 11 assms mult_right_mono)
50252 4aa34bd43228 eliminated slightly odd identifiers; wenzelm parents: 47455 diff changeset	48	have 13: "(abs y * abs (A-A') + abs (yA'-c') + \<delta>_c) abs x <= (abs y * \<delta>_A + abs (yA'-c') + \<delta>_c) abs x"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	49	by (simp add: assms mult_right_mono mult_left_mono)
50252 4aa34bd43228 eliminated slightly odd identifiers; wenzelm parents: 47455 diff changeset	50	have r: "(abs y * \<delta>_A + abs (yA'-c') + \<delta>_c) abs x <= (abs y * \<delta>_A + abs (yA'-c') + \<delta>_c) r"
19453 e4f382a270ad added LP.thy obua parents: diff changeset	51	apply (rule mult_left_mono)
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	52	apply (simp add: assms)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	53	apply (rule_tac add_mono[of "0::'a" _ "0", simplified])+
50252 4aa34bd43228 eliminated slightly odd identifiers; wenzelm parents: 47455 diff changeset	54	apply (rule mult_left_mono[of "0" "\<delta>_A", simplified])
19453 e4f382a270ad added LP.thy obua parents: diff changeset	55	apply (simp_all)
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	56	apply (rule order_trans[where y="abs (A-A')"], simp_all add: assms)
efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	57	apply (rule order_trans[where y="abs (c-c')"], simp_all add: assms)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	58	done
50252 4aa34bd43228 eliminated slightly odd identifiers; wenzelm parents: 47455 diff changeset	59	from 6 7 8 9 12 13 r have 14:" abs((y * (A - A') + (y * A' - c') + (c'-c)) * x) <=(abs y * \<delta>_A + abs (yA'-c') + \<delta>_c) r"
19453 e4f382a270ad added LP.thy obua parents: diff changeset	60	by (simp)
37884 314a88278715 discontinued pretending that abel_cancel is logic-independent; cleaned up junk haftmann parents: 35032 diff changeset	61	show ?thesis
314a88278715 discontinued pretending that abel_cancel is logic-independent; cleaned up junk haftmann parents: 35032 diff changeset	62	apply (rule le_add_right_mono[of _ _ "abs((y * (A - A') + (y * A' - c') + (c'-c)) * x)"])
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	63	apply (simp_all only: 5 14[simplified abs_of_nonneg[of y, simplified assms]])
19453 e4f382a270ad added LP.thy obua parents: diff changeset	64	done
e4f382a270ad added LP.thy obua parents: diff changeset	65	qed
e4f382a270ad added LP.thy obua parents: diff changeset	66
e4f382a270ad added LP.thy obua parents: diff changeset	67	lemma le_ge_imp_abs_diff_1:
e4f382a270ad added LP.thy obua parents: diff changeset	68	assumes
35028 108662d50512 more consistent naming of type classes involving orderings (and lattices) -- c.f. NEWS haftmann parents: 32491 diff changeset	69	"A1 <= (A::'a::lattice_ring)"
19453 e4f382a270ad added LP.thy obua parents: diff changeset	70	"A <= A2"
e4f382a270ad added LP.thy obua parents: diff changeset	71	shows "abs (A-A1) <= A2-A1"
e4f382a270ad added LP.thy obua parents: diff changeset	72	proof -
e4f382a270ad added LP.thy obua parents: diff changeset	73	have "0 <= A - A1"
e4f382a270ad added LP.thy obua parents: diff changeset	74	proof -
54230 b1d955791529 more simplification rules on unary and binary minus haftmann parents: 50252 diff changeset	75	from assms add_right_mono [of A1 A "- A1"] show ?thesis by simp
19453 e4f382a270ad added LP.thy obua parents: diff changeset	76	qed
e4f382a270ad added LP.thy obua parents: diff changeset	77	then have "abs (A-A1) = A-A1" by (rule abs_of_nonneg)
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	78	with assms show "abs (A-A1) <= (A2-A1)" by simp
19453 e4f382a270ad added LP.thy obua parents: diff changeset	79	qed
e4f382a270ad added LP.thy obua parents: diff changeset	80
e4f382a270ad added LP.thy obua parents: diff changeset	81	lemma mult_le_prts:
e4f382a270ad added LP.thy obua parents: diff changeset	82	assumes
35028 108662d50512 more consistent naming of type classes involving orderings (and lattices) -- c.f. NEWS haftmann parents: 32491 diff changeset	83	"a1 <= (a::'a::lattice_ring)"
19453 e4f382a270ad added LP.thy obua parents: diff changeset	84	"a <= a2"
e4f382a270ad added LP.thy obua parents: diff changeset	85	"b1 <= b"
e4f382a270ad added LP.thy obua parents: diff changeset	86	"b <= b2"
e4f382a270ad added LP.thy obua parents: diff changeset	87	shows
e4f382a270ad added LP.thy obua parents: diff changeset	88	"a * b <= pprt a2 * pprt b2 + pprt a1 * nprt b2 + nprt a2 * pprt b1 + nprt a1 * nprt b1"
e4f382a270ad added LP.thy obua parents: diff changeset	89	proof -
e4f382a270ad added LP.thy obua parents: diff changeset	90	have "a * b = (pprt a + nprt a) * (pprt b + nprt b)"
e4f382a270ad added LP.thy obua parents: diff changeset	91	apply (subst prts[symmetric])+
e4f382a270ad added LP.thy obua parents: diff changeset	92	apply simp
e4f382a270ad added LP.thy obua parents: diff changeset	93	done
e4f382a270ad added LP.thy obua parents: diff changeset	94	then have "a * b = pprt a * pprt b + pprt a * nprt b + nprt a * pprt b + nprt a * nprt b"
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 23477 diff changeset	95	by (simp add: algebra_simps)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	96	moreover have "pprt a * pprt b <= pprt a2 * pprt b2"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	97	by (simp_all add: assms mult_mono)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	98	moreover have "pprt a * nprt b <= pprt a1 * nprt b2"
e4f382a270ad added LP.thy obua parents: diff changeset	99	proof -
e4f382a270ad added LP.thy obua parents: diff changeset	100	have "pprt a * nprt b <= pprt a * nprt b2"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	101	by (simp add: mult_left_mono assms)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	102	moreover have "pprt a * nprt b2 <= pprt a1 * nprt b2"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	103	by (simp add: mult_right_mono_neg assms)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	104	ultimately show ?thesis
e4f382a270ad added LP.thy obua parents: diff changeset	105	by simp
e4f382a270ad added LP.thy obua parents: diff changeset	106	qed
e4f382a270ad added LP.thy obua parents: diff changeset	107	moreover have "nprt a * pprt b <= nprt a2 * pprt b1"
e4f382a270ad added LP.thy obua parents: diff changeset	108	proof -
e4f382a270ad added LP.thy obua parents: diff changeset	109	have "nprt a * pprt b <= nprt a2 * pprt b"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	110	by (simp add: mult_right_mono assms)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	111	moreover have "nprt a2 * pprt b <= nprt a2 * pprt b1"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	112	by (simp add: mult_left_mono_neg assms)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	113	ultimately show ?thesis
e4f382a270ad added LP.thy obua parents: diff changeset	114	by simp
e4f382a270ad added LP.thy obua parents: diff changeset	115	qed
e4f382a270ad added LP.thy obua parents: diff changeset	116	moreover have "nprt a * nprt b <= nprt a1 * nprt b1"
e4f382a270ad added LP.thy obua parents: diff changeset	117	proof -
e4f382a270ad added LP.thy obua parents: diff changeset	118	have "nprt a * nprt b <= nprt a * nprt b1"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	119	by (simp add: mult_left_mono_neg assms)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	120	moreover have "nprt a * nprt b1 <= nprt a1 * nprt b1"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	121	by (simp add: mult_right_mono_neg assms)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	122	ultimately show ?thesis
e4f382a270ad added LP.thy obua parents: diff changeset	123	by simp
e4f382a270ad added LP.thy obua parents: diff changeset	124	qed
e4f382a270ad added LP.thy obua parents: diff changeset	125	ultimately show ?thesis
e4f382a270ad added LP.thy obua parents: diff changeset	126	by - (rule add_mono \| simp)+
e4f382a270ad added LP.thy obua parents: diff changeset	127	qed
e4f382a270ad added LP.thy obua parents: diff changeset	128
e4f382a270ad added LP.thy obua parents: diff changeset	129	lemma mult_le_dual_prts:
e4f382a270ad added LP.thy obua parents: diff changeset	130	assumes
35028 108662d50512 more consistent naming of type classes involving orderings (and lattices) -- c.f. NEWS haftmann parents: 32491 diff changeset	131	"A * x \<le> (b::'a::lattice_ring)"
19453 e4f382a270ad added LP.thy obua parents: diff changeset	132	"0 \<le> y"
e4f382a270ad added LP.thy obua parents: diff changeset	133	"A1 \<le> A"
e4f382a270ad added LP.thy obua parents: diff changeset	134	"A \<le> A2"
e4f382a270ad added LP.thy obua parents: diff changeset	135	"c1 \<le> c"
e4f382a270ad added LP.thy obua parents: diff changeset	136	"c \<le> c2"
e4f382a270ad added LP.thy obua parents: diff changeset	137	"r1 \<le> x"
e4f382a270ad added LP.thy obua parents: diff changeset	138	"x \<le> r2"
e4f382a270ad added LP.thy obua parents: diff changeset	139	shows
e4f382a270ad added LP.thy obua parents: diff changeset	140	"c * x \<le> y * b + (let s1 = c1 - y * A2; s2 = c2 - y * A1 in pprt s2 * pprt r2 + pprt s1 * nprt r2 + nprt s2 * pprt r1 + nprt s1 * nprt r1)"
e4f382a270ad added LP.thy obua parents: diff changeset	141	(is "_ <= _ + ?C")
e4f382a270ad added LP.thy obua parents: diff changeset	142	proof -
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	143	from assms have "y * (A * x) <= y * b" by (simp add: mult_left_mono)
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 23477 diff changeset	144	moreover have "y * (A * x) = c * x + (y * A - c) * x" by (simp add: algebra_simps)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	145	ultimately have "c * x + (y * A - c) * x <= y * b" by simp
e4f382a270ad added LP.thy obua parents: diff changeset	146	then have "c * x <= y * b - (y * A - c) * x" by (simp add: le_diff_eq)
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 23477 diff changeset	147	then have cx: "c * x <= y * b + (c - y * A) * x" by (simp add: algebra_simps)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	148	have s2: "c - y * A <= c2 - y * A1"
54230 b1d955791529 more simplification rules on unary and binary minus haftmann parents: 50252 diff changeset	149	by (simp add: assms add_mono mult_left_mono algebra_simps)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	150	have s1: "c1 - y * A2 <= c - y * A"
54230 b1d955791529 more simplification rules on unary and binary minus haftmann parents: 50252 diff changeset	151	by (simp add: assms add_mono mult_left_mono algebra_simps)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	152	have prts: "(c - y * A) * x <= ?C"
e4f382a270ad added LP.thy obua parents: diff changeset	153	apply (simp add: Let_def)
e4f382a270ad added LP.thy obua parents: diff changeset	154	apply (rule mult_le_prts)
41550 efa734d9b221 eliminated global prems; wenzelm parents: 41413 diff changeset	155	apply (simp_all add: assms s1 s2)
19453 e4f382a270ad added LP.thy obua parents: diff changeset	156	done
e4f382a270ad added LP.thy obua parents: diff changeset	157	then have "y * b + (c - y * A) * x <= y * b + ?C"
e4f382a270ad added LP.thy obua parents: diff changeset	158	by simp
e4f382a270ad added LP.thy obua parents: diff changeset	159	with cx show ?thesis
e4f382a270ad added LP.thy obua parents: diff changeset	160	by(simp only:)
e4f382a270ad added LP.thy obua parents: diff changeset	161	qed
e4f382a270ad added LP.thy obua parents: diff changeset	162
e4f382a270ad added LP.thy obua parents: diff changeset	163	end

author	haftmann
	Sat, 05 Jul 2014 11:01:53 +0200
changeset 57514	bdc2c6b40bf2
parent 54230	b1d955791529
child 61945	1135b8de26c3
permissions	-rw-r--r--