isabelle: src/HOL/Power.ML@c5a7a7685826 (annotated)

3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	1	(* Title: HOL/Power.ML
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	2	ID: $Id$
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	3	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	4	Copyright 1997 University of Cambridge
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	5
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	6	The (overloaded) exponentiation operator, ^ :: [nat,nat]=>nat
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	7	Also binomial coefficents
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	8	*)
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	9
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	10
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	11	open Power;
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	12
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	13	(* Simple laws about Power *)
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	14
5069 3ea049f7979d isatool fixgoal; wenzelm parents: 4089 diff changeset	15	Goal "!!i::nat. i ^ (j+k) = (i^j) * (i^k)";
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	16	by (induct_tac "k" 1);
4089 96fba19bcbe2 isatool fixclasimp; wenzelm parents: 3457 diff changeset	17	by (ALLGOALS (asm_simp_tac (simpset() addsimps mult_ac)));
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	18	qed "power_add";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	19
5069 3ea049f7979d isatool fixgoal; wenzelm parents: 4089 diff changeset	20	Goal "!!i::nat. i ^ (j*k) = (i^j) ^ k";
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	21	by (induct_tac "k" 1);
4089 96fba19bcbe2 isatool fixclasimp; wenzelm parents: 3457 diff changeset	22	by (ALLGOALS (asm_simp_tac (simpset() addsimps [power_add])));
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	23	qed "power_mult";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	24
5143 b94cd208f073 Removal of leading "\!\!..." from most Goal commands paulson parents: 5069 diff changeset	25	Goal "0 < i ==> 0 < i^n";
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	26	by (induct_tac "n" 1);
4089 96fba19bcbe2 isatool fixclasimp; wenzelm parents: 3457 diff changeset	27	by (ALLGOALS (asm_simp_tac (simpset() addsimps [zero_less_mult_iff])));
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	28	qed "zero_less_power";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	29
5069 3ea049f7979d isatool fixgoal; wenzelm parents: 4089 diff changeset	30	Goalw [dvd_def] "!!m::nat. m<=n ==> i^m dvd i^n";
3457 a8ab7c64817c Ran expandshort paulson parents: 3396 diff changeset	31	by (etac (not_less_iff_le RS iffD2 RS add_diff_inverse RS subst) 1);
4089 96fba19bcbe2 isatool fixclasimp; wenzelm parents: 3457 diff changeset	32	by (asm_simp_tac (simpset() addsimps [power_add]) 1);
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	33	by (Blast_tac 1);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	34	qed "le_imp_power_dvd";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	35
5143 b94cd208f073 Removal of leading "\!\!..." from most Goal commands paulson parents: 5069 diff changeset	36	Goal "[\| 0 < i; i^m < i^n \|] ==> m<n";
3457 a8ab7c64817c Ran expandshort paulson parents: 3396 diff changeset	37	by (rtac ccontr 1);
a8ab7c64817c Ran expandshort paulson parents: 3396 diff changeset	38	by (dtac (leI RS le_imp_power_dvd RS dvd_imp_le RS leD) 1);
a8ab7c64817c Ran expandshort paulson parents: 3396 diff changeset	39	by (etac zero_less_power 1);
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	40	by (contr_tac 1);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	41	qed "power_less_imp_less";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	42
5143 b94cd208f073 Removal of leading "\!\!..." from most Goal commands paulson parents: 5069 diff changeset	43	Goal "k^j dvd n --> i<j --> k^i dvd n";
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	44	by (induct_tac "j" 1);
4089 96fba19bcbe2 isatool fixclasimp; wenzelm parents: 3457 diff changeset	45	by (ALLGOALS (simp_tac (simpset() addsimps [less_Suc_eq])));
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	46	by (stac mult_commute 1);
4089 96fba19bcbe2 isatool fixclasimp; wenzelm parents: 3457 diff changeset	47	by (blast_tac (claset() addSDs [dvd_mult_left]) 1);
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	48	qed_spec_mp "power_less_dvd";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	49
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	50
3396 aa74c71c3982 eliminated non-ASCII; wenzelm parents: 3390 diff changeset	51	(* Binomial Coefficients, following Andy Gordon and Florian Kammueller *)
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	52
5069 3ea049f7979d isatool fixgoal; wenzelm parents: 4089 diff changeset	53	Goal "(n choose 0) = 1";
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	54	by (exhaust_tac "n" 1);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	55	by (ALLGOALS Asm_simp_tac);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	56	qed "binomial_n_0";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	57
5069 3ea049f7979d isatool fixgoal; wenzelm parents: 4089 diff changeset	58	Goal "(0 choose Suc k) = 0";
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	59	by (Simp_tac 1);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	60	qed "binomial_0_Suc";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	61
5069 3ea049f7979d isatool fixgoal; wenzelm parents: 4089 diff changeset	62	Goal "(Suc n choose Suc k) = (n choose k) + (n choose Suc k)";
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	63	by (Simp_tac 1);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	64	qed "binomial_Suc_Suc";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	65
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	66	Addsimps [binomial_n_0, binomial_0_Suc, binomial_Suc_Suc];
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	67	Delsimps [binomial_0, binomial_Suc];
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	68
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	69
5069 3ea049f7979d isatool fixgoal; wenzelm parents: 4089 diff changeset	70	Goal "!k. n<k --> (n choose k) = 0";
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	71	by (induct_tac "n" 1);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	72	by (ALLGOALS (rtac allI THEN' exhaust_tac "k"));
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	73	by (ALLGOALS Asm_simp_tac);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	74	qed_spec_mp "less_imp_binomial_eq_0";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	75
5069 3ea049f7979d isatool fixgoal; wenzelm parents: 4089 diff changeset	76	Goal "(n choose n) = 1";
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	77	by (induct_tac "n" 1);
4089 96fba19bcbe2 isatool fixclasimp; wenzelm parents: 3457 diff changeset	78	by (ALLGOALS (asm_simp_tac (simpset() addsimps [less_imp_binomial_eq_0])));
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	79	qed "binomial_n_n";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	80	Addsimps [binomial_n_n];
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	81
5069 3ea049f7979d isatool fixgoal; wenzelm parents: 4089 diff changeset	82	Goal "(Suc n choose n) = Suc n";
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	83	by (induct_tac "n" 1);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	84	by (ALLGOALS Asm_simp_tac);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	85	qed "binomial_Suc_n";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	86	Addsimps [binomial_Suc_n];
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	87
5069 3ea049f7979d isatool fixgoal; wenzelm parents: 4089 diff changeset	88	Goal "(n choose 1) = n";
3390 0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	89	by (induct_tac "n" 1);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	90	by (ALLGOALS Asm_simp_tac);
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	91	qed "binomial_1";
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients) paulson parents: diff changeset	92	Addsimps [binomial_1];

author	paulson
	Wed, 25 Nov 1998 15:54:41 +0100
changeset 5971	c5a7a7685826
parent 5143	b94cd208f073
child 6865	5577ffe4c2f1
permissions	-rw-r--r--