(* Title : HyperPow.ML
Author : Jacques D. Fleuriot
Copyright : 1998 University of Cambridge
Description : Natural Powers of hyperreals theory
Exponentials on the hyperreals
*)
Goal "(#0::hypreal) ^ (Suc n) = 0";
by (Auto_tac);
qed "hrealpow_zero";
Addsimps [hrealpow_zero];
Goal "r ~= (#0::hypreal) --> r ^ n ~= 0";
by (induct_tac "n" 1);
by Auto_tac;
qed_spec_mp "hrealpow_not_zero";
Goal "r ~= (#0::hypreal) --> inverse(r ^ n) = (inverse r) ^ n";
by (induct_tac "n" 1);
by (Auto_tac);
by (forw_inst_tac [("n","n")] hrealpow_not_zero 1);
by (auto_tac (claset(), simpset() addsimps [hypreal_inverse_distrib]));
qed_spec_mp "hrealpow_inverse";
Goal "abs (r::hypreal) ^ n = abs (r ^ n)";
by (induct_tac "n" 1);
by (auto_tac (claset(), simpset() addsimps [hrabs_mult]));
qed "hrealpow_hrabs";
Goal "(r::hypreal) ^ (n + m) = (r ^ n) * (r ^ m)";
by (induct_tac "n" 1);
by (auto_tac (claset(), simpset() addsimps hypreal_mult_ac));
qed "hrealpow_add";
Goal "(r::hypreal) ^ 1 = r";
by (Simp_tac 1);
qed "hrealpow_one";
Addsimps [hrealpow_one];
Goal "(r::hypreal) ^ 2 = r * r";
by (Simp_tac 1);
qed "hrealpow_two";
Goal "(#0::hypreal) <= r --> #0 <= r ^ n";
by (induct_tac "n" 1);
by (auto_tac (claset(), simpset() addsimps [hypreal_0_le_mult_iff]));
qed_spec_mp "hrealpow_ge_zero";
Goal "(#0::hypreal) < r --> #0 < r ^ n";
by (induct_tac "n" 1);
by (auto_tac (claset(), simpset() addsimps [hypreal_0_less_mult_iff]));
qed_spec_mp "hrealpow_gt_zero";
Goal "x <= y & (#0::hypreal) < x --> x ^ n <= y ^ n";
by (induct_tac "n" 1);
by (auto_tac (claset() addSIs [hypreal_mult_le_mono], simpset()));
by (asm_simp_tac (simpset() addsimps [hrealpow_ge_zero]) 1);
qed_spec_mp "hrealpow_le";
Goal "x < y & (#0::hypreal) < x & 0 < n --> x ^ n < y ^ n";
by (induct_tac "n" 1);
by (auto_tac (claset() addIs [hypreal_mult_less_mono,gr0I],
simpset() addsimps [hrealpow_gt_zero]));
qed "hrealpow_less";
Goal "#1 ^ n = (#1::hypreal)";
by (induct_tac "n" 1);
by (Auto_tac);
qed "hrealpow_eq_one";
Addsimps [hrealpow_eq_one];
Goal "abs(-(#1 ^ n)) = (#1::hypreal)";
by Auto_tac;
qed "hrabs_minus_hrealpow_one";
Addsimps [hrabs_minus_hrealpow_one];
Goal "abs(#-1 ^ n) = (#1::hypreal)";
by (induct_tac "n" 1);
by Auto_tac;
qed "hrabs_hrealpow_minus_one";
Addsimps [hrabs_hrealpow_minus_one];
Goal "((r::hypreal) * s) ^ n = (r ^ n) * (s ^ n)";
by (induct_tac "n" 1);
by (auto_tac (claset(), simpset() addsimps hypreal_mult_ac));
qed "hrealpow_mult";
Goal "(#0::hypreal) <= r ^ 2";
by (auto_tac (claset(), simpset() addsimps [hypreal_0_le_mult_iff]));
qed "hrealpow_two_le";
Addsimps [hrealpow_two_le];
Goal "(#0::hypreal) <= u ^ 2 + v ^ 2";
by (simp_tac (HOL_ss addsimps [hrealpow_two_le,
rename_numerals hypreal_le_add_order]) 1);
qed "hrealpow_two_le_add_order";
Addsimps [hrealpow_two_le_add_order];
Goal "(#0::hypreal) <= u ^ 2 + v ^ 2 + w ^ 2";
by (simp_tac (HOL_ss addsimps [hrealpow_two_le,
rename_numerals hypreal_le_add_order]) 1);
qed "hrealpow_two_le_add_order2";
Addsimps [hrealpow_two_le_add_order2];
Goal "(x ^ 2 + y ^ 2 + z ^ 2 = (#0::hypreal)) = (x = #0 & y = #0 & z = #0)";
by (simp_tac (HOL_ss addsimps
[rename_numerals hypreal_three_squares_add_zero_iff, hrealpow_two]) 1);
qed "hrealpow_three_squares_add_zero_iff";
Addsimps [hrealpow_three_squares_add_zero_iff];
Goal "abs(x ^ 2) = (x::hypreal) ^ 2";
by (auto_tac (claset(),
simpset() addsimps [hrabs_def, hypreal_0_le_mult_iff]));
qed "hrabs_hrealpow_two";
Addsimps [hrabs_hrealpow_two];
Goal "abs(x) ^ 2 = (x::hypreal) ^ 2";
by (simp_tac (simpset() addsimps [hrealpow_hrabs, hrabs_eqI1]
delsimps [hpowr_Suc]) 1);
qed "hrealpow_two_hrabs";
Addsimps [hrealpow_two_hrabs];
Goal "(#1::hypreal) < r ==> #1 < r ^ 2";
by (auto_tac (claset(), simpset() addsimps [hrealpow_two]));
by (res_inst_tac [("y","#1*#1")] order_le_less_trans 1);
by (rtac hypreal_mult_less_mono 2);
by Auto_tac;
qed "hrealpow_two_gt_one";
Goal "(#1::hypreal) <= r ==> #1 <= r ^ 2";
by (etac (order_le_imp_less_or_eq RS disjE) 1);
by (etac (hrealpow_two_gt_one RS order_less_imp_le) 1);
by Auto_tac;
qed "hrealpow_two_ge_one";
Goal "(#1::hypreal) <= #2 ^ n";
by (res_inst_tac [("y","#1 ^ n")] order_trans 1);
by (rtac hrealpow_le 2);
by Auto_tac;
qed "two_hrealpow_ge_one";
Goal "hypreal_of_nat n < #2 ^ n";
by (induct_tac "n" 1);
by (auto_tac (claset(),
simpset() addsimps [hypreal_of_nat_Suc, hypreal_add_mult_distrib]));
by (cut_inst_tac [("n","n")] two_hrealpow_ge_one 1);
by (arith_tac 1);
qed "two_hrealpow_gt";
Addsimps [two_hrealpow_gt,two_hrealpow_ge_one];
Goal "#-1 ^ (2*n) = (#1::hypreal)";
by (induct_tac "n" 1);
by (Auto_tac);
qed "hrealpow_minus_one";
Goal "#-1 ^ (n + n) = (#1::hypreal)";
by (induct_tac "n" 1);
by (Auto_tac);
qed "hrealpow_minus_one2";
Addsimps [hrealpow_minus_one2];
Goal "(-(x::hypreal)) ^ 2 = x ^ 2";
by (Auto_tac);
qed "hrealpow_minus_two";
Addsimps [hrealpow_minus_two];
Goal "(#0::hypreal) < r & r < #1 --> r ^ Suc n < r ^ n";
by (induct_tac "n" 1);
by (auto_tac (claset(),
simpset() addsimps [hypreal_mult_less_mono2]));
qed_spec_mp "hrealpow_Suc_less";
Goal "(#0::hypreal) <= r & r < #1 --> r ^ Suc n <= r ^ n";
by (induct_tac "n" 1);
by (auto_tac (claset() addIs [order_less_imp_le]
addSDs [order_le_imp_less_or_eq,hrealpow_Suc_less],
simpset() addsimps [hypreal_mult_less_mono2]));
qed_spec_mp "hrealpow_Suc_le";
Goal "Abs_hypreal(hyprel``{%n. X n}) ^ m = Abs_hypreal(hyprel``{%n. (X n) ^ m})";
by (induct_tac "m" 1);
by (auto_tac (claset(),
simpset() delsimps [one_eq_numeral_1]
addsimps [hypreal_one_def, hypreal_mult,
one_eq_numeral_1 RS sym]));
qed "hrealpow";
Goal "(x + (y::hypreal)) ^ 2 = \
\ x ^ 2 + y ^ 2 + (hypreal_of_nat 2)*x*y";
by (simp_tac (simpset() addsimps
[hypreal_add_mult_distrib2, hypreal_add_mult_distrib,
hypreal_of_nat_zero, hypreal_of_nat_Suc]) 1);
qed "hrealpow_sum_square_expand";
(*---------------------------------------------------------------
we'll prove the following theorem by going down to the
level of the ultrafilter and relying on the analogous
property for the real rather than prove it directly
using induction: proof is much simpler this way!
---------------------------------------------------------------*)
Goal "[|(#0::hypreal) <= x; #0 <= y;x ^ Suc n <= y ^ Suc n |] ==> x <= y";
by (full_simp_tac (simpset() addsimps [rename_numerals hypreal_zero_def]) 1);
by (res_inst_tac [("z","x")] eq_Abs_hypreal 1);
by (res_inst_tac [("z","y")] eq_Abs_hypreal 1);
by (auto_tac (claset(),
simpset() addsimps [hrealpow,hypreal_le,hypreal_mult]));
by (ultra_tac (claset() addIs [realpow_increasing], simpset()) 1);
qed "hrealpow_increasing";
(*By antisymmetry with the above we conclude x=y, replacing the deleted
theorem hrealpow_Suc_cancel_eq*)
Goal "x : HFinite --> x ^ n : HFinite";
by (induct_tac "n" 1);
by (auto_tac (claset() addIs [HFinite_mult], simpset()));
qed_spec_mp "hrealpow_HFinite";
(*---------------------------------------------------------------
Hypernaturals Powers
--------------------------------------------------------------*)
Goalw [congruent_def]
"congruent hyprel \
\ (%X Y. hyprel``{%n. ((X::nat=>real) n ^ (Y::nat=>nat) n)})";
by (safe_tac (claset() addSIs [ext]));
by (ALLGOALS(Fuf_tac));
qed "hyperpow_congruent";
Goalw [hyperpow_def]
"Abs_hypreal(hyprel``{%n. X n}) pow Abs_hypnat(hypnatrel``{%n. Y n}) = \
\ Abs_hypreal(hyprel``{%n. X n ^ Y n})";
by (res_inst_tac [("f","Abs_hypreal")] arg_cong 1);
by (auto_tac (claset() addSIs [lemma_hyprel_refl,bexI],
simpset() addsimps [hyprel_in_hypreal RS
Abs_hypreal_inverse,equiv_hyprel,hyperpow_congruent]));
by (Fuf_tac 1);
qed "hyperpow";
Goalw [hypnat_one_def] "(#0::hypreal) pow (n + 1hn) = #0";
by (simp_tac (simpset() addsimps [rename_numerals hypreal_zero_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (auto_tac (claset(), simpset() addsimps [hyperpow,hypnat_add]));
qed "hyperpow_zero";
Addsimps [hyperpow_zero];
Goal "r ~= (#0::hypreal) --> r pow n ~= #0";
by (simp_tac (simpset() addsimps [rename_numerals hypreal_zero_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (auto_tac (claset(), simpset() addsimps [hyperpow]));
by (dtac FreeUltrafilterNat_Compl_mem 1);
by (fuf_empty_tac (claset() addIs [realpow_not_zero RS notE],
simpset()) 1);
qed_spec_mp "hyperpow_not_zero";
Goal "r ~= (#0::hypreal) --> inverse(r pow n) = (inverse r) pow n";
by (simp_tac (simpset() addsimps [rename_numerals hypreal_zero_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (auto_tac (claset() addSDs [FreeUltrafilterNat_Compl_mem],
simpset() addsimps [hypreal_inverse,hyperpow]));
by (rtac FreeUltrafilterNat_subset 1);
by (auto_tac (claset() addDs [realpow_not_zero]
addIs [realpow_inverse],
simpset()));
qed "hyperpow_inverse";
Goal "abs r pow n = abs (r pow n)";
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (auto_tac (claset(),
simpset() addsimps [hypreal_hrabs, hyperpow,realpow_abs]));
qed "hyperpow_hrabs";
Goal "r pow (n + m) = (r pow n) * (r pow m)";
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","m")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (auto_tac (claset(),
simpset() addsimps [hyperpow,hypnat_add, hypreal_mult,realpow_add]));
qed "hyperpow_add";
Goalw [hypnat_one_def] "r pow 1hn = r";
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (auto_tac (claset(), simpset() addsimps [hyperpow]));
qed "hyperpow_one";
Addsimps [hyperpow_one];
Goalw [hypnat_one_def]
"r pow (1hn + 1hn) = r * r";
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (auto_tac (claset(),
simpset() addsimps [hyperpow,hypnat_add, hypreal_mult]));
qed "hyperpow_two";
Goal "(#0::hypreal) < r --> #0 < r pow n";
by (simp_tac (simpset() addsimps [rename_numerals hypreal_zero_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (auto_tac (claset() addSEs [FreeUltrafilterNat_subset, realpow_gt_zero],
simpset() addsimps [hyperpow,hypreal_less, hypreal_le]));
qed_spec_mp "hyperpow_gt_zero";
Goal "(#0::hypreal) <= r --> #0 <= r pow n";
by (simp_tac (simpset() addsimps [rename_numerals hypreal_zero_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (auto_tac (claset() addSEs [FreeUltrafilterNat_subset, realpow_ge_zero],
simpset() addsimps [hyperpow,hypreal_le]));
qed "hyperpow_ge_zero";
Goal "(#0::hypreal) < x & x <= y --> x pow n <= y pow n";
by (full_simp_tac (simpset() addsimps [rename_numerals hypreal_zero_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","x")] eq_Abs_hypreal 1);
by (res_inst_tac [("z","y")] eq_Abs_hypreal 1);
by (auto_tac (claset(),
simpset() addsimps [hyperpow,hypreal_le,hypreal_less]));
by (etac (FreeUltrafilterNat_Int RS FreeUltrafilterNat_subset) 1
THEN assume_tac 1);
by (auto_tac (claset() addIs [realpow_le], simpset()));
qed_spec_mp "hyperpow_le";
Goal "#1 pow n = (#1::hypreal)";
by (simp_tac (HOL_ss addsimps [one_eq_numeral_1 RS sym, hypreal_one_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (auto_tac (claset(), simpset() addsimps [hyperpow]));
qed "hyperpow_eq_one";
Addsimps [hyperpow_eq_one];
Goal "abs(-(#1 pow n)) = (#1::hypreal)";
by (simp_tac (HOL_ss addsimps [one_eq_numeral_1 RS sym, hypreal_one_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (auto_tac (claset(), simpset() addsimps [hyperpow,hypreal_hrabs]));
qed "hrabs_minus_hyperpow_one";
Addsimps [hrabs_minus_hyperpow_one];
Goal "abs(#-1 pow n) = (#1::hypreal)";
by (subgoal_tac "abs((-1hr) pow n) = 1hr" 1);
by (Asm_full_simp_tac 1);
by (simp_tac (HOL_ss addsimps [hypreal_one_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (auto_tac (claset(),
simpset() addsimps [hyperpow,hypreal_minus,hypreal_hrabs]));
qed "hrabs_hyperpow_minus_one";
Addsimps [hrabs_hyperpow_minus_one];
Goal "(r * s) pow n = (r pow n) * (s pow n)";
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (res_inst_tac [("z","s")] eq_Abs_hypreal 1);
by (auto_tac (claset(),
simpset() addsimps [hyperpow, hypreal_mult,realpow_mult]));
qed "hyperpow_mult";
Goal "(#0::hypreal) <= r pow (1hn + 1hn)";
by (auto_tac (claset(),
simpset() addsimps [hyperpow_two, hypreal_0_le_mult_iff]));
qed "hyperpow_two_le";
Addsimps [hyperpow_two_le];
Goal "abs(x pow (1hn + 1hn)) = x pow (1hn + 1hn)";
by (simp_tac (simpset() addsimps [hrabs_eqI1]) 1);
qed "hrabs_hyperpow_two";
Addsimps [hrabs_hyperpow_two];
Goal "abs(x) pow (1hn + 1hn) = x pow (1hn + 1hn)";
by (simp_tac (simpset() addsimps [hyperpow_hrabs,hrabs_eqI1]) 1);
qed "hyperpow_two_hrabs";
Addsimps [hyperpow_two_hrabs];
(*? very similar to hrealpow_two_gt_one *)
Goal "(#1::hypreal) < r ==> #1 < r pow (1hn + 1hn)";
by (auto_tac (claset(), simpset() addsimps [hyperpow_two]));
by (res_inst_tac [("y","#1*#1")] order_le_less_trans 1);
by (rtac hypreal_mult_less_mono 2);
by Auto_tac;
qed "hyperpow_two_gt_one";
Goal "(#1::hypreal) <= r ==> #1 <= r pow (1hn + 1hn)";
by (auto_tac (claset() addSDs [order_le_imp_less_or_eq]
addIs [hyperpow_two_gt_one,order_less_imp_le],
simpset()));
qed "hyperpow_two_ge_one";
Goal "(#1::hypreal) <= #2 pow n";
by (res_inst_tac [("y","#1 pow n")] order_trans 1);
by (rtac hyperpow_le 2);
by Auto_tac;
qed "two_hyperpow_ge_one";
Addsimps [two_hyperpow_ge_one];
Addsimps [simplify (simpset()) realpow_minus_one];
Goal "#-1 pow ((1hn + 1hn)*n) = (#1::hypreal)";
by (subgoal_tac "(-(1hr)) pow ((1hn + 1hn)*n) = 1hr" 1);
by (Asm_full_simp_tac 1);
by (simp_tac (HOL_ss addsimps [hypreal_one_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (auto_tac (claset(),
simpset() addsimps [hyperpow, hypnat_add,hypreal_minus]));
qed "hyperpow_minus_one2";
Addsimps [hyperpow_minus_one2];
Goalw [hypnat_one_def]
"(#0::hypreal) < r & r < #1 --> r pow (n + 1hn) < r pow n";
by (full_simp_tac
(HOL_ss addsimps [zero_eq_numeral_0 RS sym, hypreal_zero_def,
one_eq_numeral_1 RS sym, hypreal_one_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (auto_tac (claset() addSDs [conjI RS realpow_Suc_less]
addEs [FreeUltrafilterNat_Int RS FreeUltrafilterNat_subset],
simpset() addsimps [hyperpow,hypreal_less,hypnat_add]));
qed_spec_mp "hyperpow_Suc_less";
Goalw [hypnat_one_def]
"#0 <= r & r < (#1::hypreal) --> r pow (n + 1hn) <= r pow n";
by (full_simp_tac
(HOL_ss addsimps [zero_eq_numeral_0 RS sym, hypreal_zero_def,
one_eq_numeral_1 RS sym, hypreal_one_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (auto_tac (claset() addSDs [conjI RS realpow_Suc_le] addEs
[FreeUltrafilterNat_Int RS FreeUltrafilterNat_subset ],
simpset() addsimps [hyperpow,hypreal_le,hypnat_add,
hypreal_less]));
qed_spec_mp "hyperpow_Suc_le";
Goalw [hypnat_one_def]
"(#0::hypreal) <= r & r < #1 & n < N --> r pow N <= r pow n";
by (full_simp_tac
(HOL_ss addsimps [zero_eq_numeral_0 RS sym, hypreal_zero_def,
one_eq_numeral_1 RS sym, hypreal_one_def]) 1);
by (res_inst_tac [("z","n")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","N")] eq_Abs_hypnat 1);
by (res_inst_tac [("z","r")] eq_Abs_hypreal 1);
by (auto_tac (claset(),
simpset() addsimps [hyperpow, hypreal_le,hypreal_less,hypnat_less]));
by (etac (FreeUltrafilterNat_Int RS FreeUltrafilterNat_subset) 1);
by (etac FreeUltrafilterNat_Int 1);
by (auto_tac (claset() addSDs [conjI RS realpow_less_le],
simpset()));
qed_spec_mp "hyperpow_less_le";
Goal "[| (#0::hypreal) <= r; r < #1 |] \
\ ==> ALL N n. n < N --> r pow N <= r pow n";
by (blast_tac (claset() addSIs [hyperpow_less_le]) 1);
qed "hyperpow_less_le2";
Goal "[| #0 <= r; r < (#1::hypreal); N : HNatInfinite |] \
\ ==> ALL n: SNat. r pow N <= r pow n";
by (auto_tac (claset() addSIs [hyperpow_less_le],
simpset() addsimps [HNatInfinite_iff]));
qed "hyperpow_SHNat_le";
Goalw [hypreal_of_real_def,hypnat_of_nat_def]
"(hypreal_of_real r) pow (hypnat_of_nat n) = hypreal_of_real (r ^ n)";
by (auto_tac (claset(), simpset() addsimps [hyperpow]));
qed "hyperpow_realpow";
Goalw [SReal_def]
"(hypreal_of_real r) pow (hypnat_of_nat n) : SReal";
by (auto_tac (claset(), simpset() addsimps [hyperpow_realpow]));
qed "hyperpow_SReal";
Addsimps [hyperpow_SReal];
Goal "N : HNatInfinite ==> (#0::hypreal) pow N = 0";
by (dtac HNatInfinite_is_Suc 1);
by (Auto_tac);
qed "hyperpow_zero_HNatInfinite";
Addsimps [hyperpow_zero_HNatInfinite];
Goal "[| (#0::hypreal) <= r; r < #1; n <= N |] ==> r pow N <= r pow n";
by (dres_inst_tac [("y","N")] hypnat_le_imp_less_or_eq 1);
by (auto_tac (claset() addIs [hyperpow_less_le], simpset()));
qed "hyperpow_le_le";
Goal "[| (#0::hypreal) < r; r < #1 |] ==> r pow (n + 1hn) <= r";
by (dres_inst_tac [("n","1hn")] (order_less_imp_le RS hyperpow_le_le) 1);
by (Auto_tac);
qed "hyperpow_Suc_le_self";
Goal "[| (#0::hypreal) <= r; r < #1 |] ==> r pow (n + 1hn) <= r";
by (dres_inst_tac [("n","1hn")] hyperpow_le_le 1);
by (Auto_tac);
qed "hyperpow_Suc_le_self2";
Goalw [Infinitesimal_def]
"[| x : Infinitesimal; 0 < N |] ==> abs (x pow N) <= abs x";
by (auto_tac (claset() addSIs [hyperpow_Suc_le_self2],
simpset() addsimps [hyperpow_hrabs RS sym,
hypnat_gt_zero_iff2, hrabs_ge_zero]));
qed "lemma_Infinitesimal_hyperpow";
Goal "[| x : Infinitesimal; 0 < N |] ==> x pow N : Infinitesimal";
by (rtac hrabs_le_Infinitesimal 1);
by (rtac lemma_Infinitesimal_hyperpow 2);
by Auto_tac;
qed "Infinitesimal_hyperpow";
Goalw [hypnat_of_nat_def]
"(x ^ n : Infinitesimal) = (x pow (hypnat_of_nat n) : Infinitesimal)";
by (res_inst_tac [("z","x")] eq_Abs_hypreal 1);
by (auto_tac (claset(), simpset() addsimps [hrealpow, hyperpow]));
qed "hrealpow_hyperpow_Infinitesimal_iff";
Goal "[| x : Infinitesimal; 0 < n |] ==> x ^ n : Infinitesimal";
by (auto_tac (claset() addSIs [Infinitesimal_hyperpow],
simpset() addsimps [hrealpow_hyperpow_Infinitesimal_iff,
hypnat_of_nat_less_iff,hypnat_of_nat_zero]
delsimps [hypnat_of_nat_less_iff RS sym]));
qed "Infinitesimal_hrealpow";