(* Title: HOL/Nonstandard_Analysis/NSCA.thy
Author: Jacques D. Fleuriot
Copyright: 2001, 2002 University of Edinburgh
*)
section\<open>Non-Standard Complex Analysis\<close>
theory NSCA
imports NSComplex HTranscendental
begin
abbreviation
(* standard complex numbers reagarded as an embedded subset of NS complex *)
SComplex :: "hcomplex set" where
"SComplex \<equiv> Standard"
definition \<comment>\<open>standard part map\<close>
stc :: "hcomplex => hcomplex" where
"stc x = (SOME r. x \<in> HFinite \<and> r\<in>SComplex \<and> r \<approx> x)"
subsection\<open>Closure Laws for SComplex, the Standard Complex Numbers\<close>
lemma SComplex_minus_iff [simp]: "(-x \<in> SComplex) = (x \<in> SComplex)"
by (auto, drule Standard_minus, auto)
lemma SComplex_add_cancel:
"[| x + y \<in> SComplex; y \<in> SComplex |] ==> x \<in> SComplex"
by (drule (1) Standard_diff, simp)
lemma SReal_hcmod_hcomplex_of_complex [simp]:
"hcmod (hcomplex_of_complex r) \<in> \<real>"
by (simp add: Reals_eq_Standard)
lemma SReal_hcmod_numeral [simp]: "hcmod (numeral w ::hcomplex) \<in> \<real>"
by (simp add: Reals_eq_Standard)
lemma SReal_hcmod_SComplex: "x \<in> SComplex ==> hcmod x \<in> \<real>"
by (simp add: Reals_eq_Standard)
lemma SComplex_divide_numeral:
"r \<in> SComplex ==> r/(numeral w::hcomplex) \<in> SComplex"
by simp
lemma SComplex_UNIV_complex:
"{x. hcomplex_of_complex x \<in> SComplex} = (UNIV::complex set)"
by simp
lemma SComplex_iff: "(x \<in> SComplex) = (\<exists>y. x = hcomplex_of_complex y)"
by (simp add: Standard_def image_def)
lemma hcomplex_of_complex_image:
"hcomplex_of_complex `(UNIV::complex set) = SComplex"
by (simp add: Standard_def)
lemma inv_hcomplex_of_complex_image: "inv hcomplex_of_complex `SComplex = UNIV"
by (auto simp add: Standard_def image_def) (metis inj_star_of inv_f_f)
lemma SComplex_hcomplex_of_complex_image:
"[| \<exists>x. x: P; P \<le> SComplex |] ==> \<exists>Q. P = hcomplex_of_complex ` Q"
apply (simp add: Standard_def, blast)
done
lemma SComplex_SReal_dense:
"[| x \<in> SComplex; y \<in> SComplex; hcmod x < hcmod y
|] ==> \<exists>r \<in> Reals. hcmod x< r \<and> r < hcmod y"
apply (auto intro: SReal_dense simp add: SReal_hcmod_SComplex)
done
subsection\<open>The Finite Elements form a Subring\<close>
lemma HFinite_hcmod_hcomplex_of_complex [simp]:
"hcmod (hcomplex_of_complex r) \<in> HFinite"
by (auto intro!: SReal_subset_HFinite [THEN subsetD])
lemma HFinite_hcmod_iff: "(x \<in> HFinite) = (hcmod x \<in> HFinite)"
by (simp add: HFinite_def)
lemma HFinite_bounded_hcmod:
"[|x \<in> HFinite; y \<le> hcmod x; 0 \<le> y |] ==> y: HFinite"
by (auto intro: HFinite_bounded simp add: HFinite_hcmod_iff)
subsection\<open>The Complex Infinitesimals form a Subring\<close>
lemma hcomplex_sum_of_halves: "x/(2::hcomplex) + x/(2::hcomplex) = x"
by auto
lemma Infinitesimal_hcmod_iff:
"(z \<in> Infinitesimal) = (hcmod z \<in> Infinitesimal)"
by (simp add: Infinitesimal_def)
lemma HInfinite_hcmod_iff: "(z \<in> HInfinite) = (hcmod z \<in> HInfinite)"
by (simp add: HInfinite_def)
lemma HFinite_diff_Infinitesimal_hcmod:
"x \<in> HFinite - Infinitesimal ==> hcmod x \<in> HFinite - Infinitesimal"
by (simp add: HFinite_hcmod_iff Infinitesimal_hcmod_iff)
lemma hcmod_less_Infinitesimal:
"[| e \<in> Infinitesimal; hcmod x < hcmod e |] ==> x \<in> Infinitesimal"
by (auto elim: hrabs_less_Infinitesimal simp add: Infinitesimal_hcmod_iff)
lemma hcmod_le_Infinitesimal:
"[| e \<in> Infinitesimal; hcmod x \<le> hcmod e |] ==> x \<in> Infinitesimal"
by (auto elim: hrabs_le_Infinitesimal simp add: Infinitesimal_hcmod_iff)
lemma Infinitesimal_interval_hcmod:
"[| e \<in> Infinitesimal;
e' \<in> Infinitesimal;
hcmod e' < hcmod x ; hcmod x < hcmod e
|] ==> x \<in> Infinitesimal"
by (auto intro: Infinitesimal_interval simp add: Infinitesimal_hcmod_iff)
lemma Infinitesimal_interval2_hcmod:
"[| e \<in> Infinitesimal;
e' \<in> Infinitesimal;
hcmod e' \<le> hcmod x ; hcmod x \<le> hcmod e
|] ==> x \<in> Infinitesimal"
by (auto intro: Infinitesimal_interval2 simp add: Infinitesimal_hcmod_iff)
subsection\<open>The ``Infinitely Close'' Relation\<close>
(*
Goalw [capprox_def,approx_def] "(z @c= w) = (hcmod z \<approx> hcmod w)"
by (auto_tac (claset(),simpset() addsimps [Infinitesimal_hcmod_iff]));
*)
lemma approx_SComplex_mult_cancel_zero:
"[| a \<in> SComplex; a \<noteq> 0; a*x \<approx> 0 |] ==> x \<approx> 0"
apply (drule Standard_inverse [THEN Standard_subset_HFinite [THEN subsetD]])
apply (auto dest: approx_mult2 simp add: mult.assoc [symmetric])
done
lemma approx_mult_SComplex1: "[| a \<in> SComplex; x \<approx> 0 |] ==> x*a \<approx> 0"
by (auto dest: Standard_subset_HFinite [THEN subsetD] approx_mult1)
lemma approx_mult_SComplex2: "[| a \<in> SComplex; x \<approx> 0 |] ==> a*x \<approx> 0"
by (auto dest: Standard_subset_HFinite [THEN subsetD] approx_mult2)
lemma approx_mult_SComplex_zero_cancel_iff [simp]:
"[|a \<in> SComplex; a \<noteq> 0 |] ==> (a*x \<approx> 0) = (x \<approx> 0)"
by (blast intro: approx_SComplex_mult_cancel_zero approx_mult_SComplex2)
lemma approx_SComplex_mult_cancel:
"[| a \<in> SComplex; a \<noteq> 0; a* w \<approx> a*z |] ==> w \<approx> z"
apply (drule Standard_inverse [THEN Standard_subset_HFinite [THEN subsetD]])
apply (auto dest: approx_mult2 simp add: mult.assoc [symmetric])
done
lemma approx_SComplex_mult_cancel_iff1 [simp]:
"[| a \<in> SComplex; a \<noteq> 0|] ==> (a* w \<approx> a*z) = (w \<approx> z)"
by (auto intro!: approx_mult2 Standard_subset_HFinite [THEN subsetD]
intro: approx_SComplex_mult_cancel)
(* TODO: generalize following theorems: hcmod -> hnorm *)
lemma approx_hcmod_approx_zero: "(x \<approx> y) = (hcmod (y - x) \<approx> 0)"
apply (subst hnorm_minus_commute)
apply (simp add: approx_def Infinitesimal_hcmod_iff)
done
lemma approx_approx_zero_iff: "(x \<approx> 0) = (hcmod x \<approx> 0)"
by (simp add: approx_hcmod_approx_zero)
lemma approx_minus_zero_cancel_iff [simp]: "(-x \<approx> 0) = (x \<approx> 0)"
by (simp add: approx_def)
lemma Infinitesimal_hcmod_add_diff:
"u \<approx> 0 ==> hcmod(x + u) - hcmod x \<in> Infinitesimal"
apply (drule approx_approx_zero_iff [THEN iffD1])
apply (rule_tac e = "hcmod u" and e' = "- hcmod u" in Infinitesimal_interval2)
apply (auto simp add: mem_infmal_iff [symmetric])
apply (rule_tac c1 = "hcmod x" in add_le_cancel_left [THEN iffD1])
apply auto
done
lemma approx_hcmod_add_hcmod: "u \<approx> 0 ==> hcmod(x + u) \<approx> hcmod x"
apply (rule approx_minus_iff [THEN iffD2])
apply (auto intro: Infinitesimal_hcmod_add_diff simp add: mem_infmal_iff [symmetric])
done
subsection\<open>Zero is the Only Infinitesimal Complex Number\<close>
lemma Infinitesimal_less_SComplex:
"[| x \<in> SComplex; y \<in> Infinitesimal; 0 < hcmod x |] ==> hcmod y < hcmod x"
by (auto intro: Infinitesimal_less_SReal SReal_hcmod_SComplex simp add: Infinitesimal_hcmod_iff)
lemma SComplex_Int_Infinitesimal_zero: "SComplex Int Infinitesimal = {0}"
by (auto simp add: Standard_def Infinitesimal_hcmod_iff)
lemma SComplex_Infinitesimal_zero:
"[| x \<in> SComplex; x \<in> Infinitesimal|] ==> x = 0"
by (cut_tac SComplex_Int_Infinitesimal_zero, blast)
lemma SComplex_HFinite_diff_Infinitesimal:
"[| x \<in> SComplex; x \<noteq> 0 |] ==> x \<in> HFinite - Infinitesimal"
by (auto dest: SComplex_Infinitesimal_zero Standard_subset_HFinite [THEN subsetD])
lemma hcomplex_of_complex_HFinite_diff_Infinitesimal:
"hcomplex_of_complex x \<noteq> 0
==> hcomplex_of_complex x \<in> HFinite - Infinitesimal"
by (rule SComplex_HFinite_diff_Infinitesimal, auto)
lemma numeral_not_Infinitesimal [simp]:
"numeral w \<noteq> (0::hcomplex) ==> (numeral w::hcomplex) \<notin> Infinitesimal"
by (fast dest: Standard_numeral [THEN SComplex_Infinitesimal_zero])
lemma approx_SComplex_not_zero:
"[| y \<in> SComplex; x \<approx> y; y\<noteq> 0 |] ==> x \<noteq> 0"
by (auto dest: SComplex_Infinitesimal_zero approx_sym [THEN mem_infmal_iff [THEN iffD2]])
lemma SComplex_approx_iff:
"[|x \<in> SComplex; y \<in> SComplex|] ==> (x \<approx> y) = (x = y)"
by (auto simp add: Standard_def)
lemma numeral_Infinitesimal_iff [simp]:
"((numeral w :: hcomplex) \<in> Infinitesimal) =
(numeral w = (0::hcomplex))"
apply (rule iffI)
apply (fast dest: Standard_numeral [THEN SComplex_Infinitesimal_zero])
apply (simp (no_asm_simp))
done
lemma approx_unique_complex:
"[| r \<in> SComplex; s \<in> SComplex; r \<approx> x; s \<approx> x|] ==> r = s"
by (blast intro: SComplex_approx_iff [THEN iffD1] approx_trans2)
subsection \<open>Properties of @{term hRe}, @{term hIm} and @{term HComplex}\<close>
lemma abs_hRe_le_hcmod: "\<And>x. \<bar>hRe x\<bar> \<le> hcmod x"
by transfer (rule abs_Re_le_cmod)
lemma abs_hIm_le_hcmod: "\<And>x. \<bar>hIm x\<bar> \<le> hcmod x"
by transfer (rule abs_Im_le_cmod)
lemma Infinitesimal_hRe: "x \<in> Infinitesimal \<Longrightarrow> hRe x \<in> Infinitesimal"
apply (rule InfinitesimalI2, simp)
apply (rule order_le_less_trans [OF abs_hRe_le_hcmod])
apply (erule (1) InfinitesimalD2)
done
lemma Infinitesimal_hIm: "x \<in> Infinitesimal \<Longrightarrow> hIm x \<in> Infinitesimal"
apply (rule InfinitesimalI2, simp)
apply (rule order_le_less_trans [OF abs_hIm_le_hcmod])
apply (erule (1) InfinitesimalD2)
done
lemma real_sqrt_lessI: "\<lbrakk>0 < u; x < u\<^sup>2\<rbrakk> \<Longrightarrow> sqrt x < u"
(* TODO: this belongs somewhere else *)
by (frule real_sqrt_less_mono) simp
lemma hypreal_sqrt_lessI:
"\<And>x u. \<lbrakk>0 < u; x < u\<^sup>2\<rbrakk> \<Longrightarrow> ( *f* sqrt) x < u"
by transfer (rule real_sqrt_lessI)
lemma hypreal_sqrt_ge_zero: "\<And>x. 0 \<le> x \<Longrightarrow> 0 \<le> ( *f* sqrt) x"
by transfer (rule real_sqrt_ge_zero)
lemma Infinitesimal_sqrt:
"\<lbrakk>x \<in> Infinitesimal; 0 \<le> x\<rbrakk> \<Longrightarrow> ( *f* sqrt) x \<in> Infinitesimal"
apply (rule InfinitesimalI2)
apply (drule_tac r="r\<^sup>2" in InfinitesimalD2, simp)
apply (simp add: hypreal_sqrt_ge_zero)
apply (rule hypreal_sqrt_lessI, simp_all)
done
lemma Infinitesimal_HComplex:
"\<lbrakk>x \<in> Infinitesimal; y \<in> Infinitesimal\<rbrakk> \<Longrightarrow> HComplex x y \<in> Infinitesimal"
apply (rule Infinitesimal_hcmod_iff [THEN iffD2])
apply (simp add: hcmod_i)
apply (rule Infinitesimal_add)
apply (erule Infinitesimal_hrealpow, simp)
apply (erule Infinitesimal_hrealpow, simp)
done
lemma hcomplex_Infinitesimal_iff:
"(x \<in> Infinitesimal) = (hRe x \<in> Infinitesimal \<and> hIm x \<in> Infinitesimal)"
apply (safe intro!: Infinitesimal_hRe Infinitesimal_hIm)
apply (drule (1) Infinitesimal_HComplex, simp)
done
lemma hRe_diff [simp]: "\<And>x y. hRe (x - y) = hRe x - hRe y"
by transfer simp
lemma hIm_diff [simp]: "\<And>x y. hIm (x - y) = hIm x - hIm y"
by transfer simp
lemma approx_hRe: "x \<approx> y \<Longrightarrow> hRe x \<approx> hRe y"
unfolding approx_def by (drule Infinitesimal_hRe) simp
lemma approx_hIm: "x \<approx> y \<Longrightarrow> hIm x \<approx> hIm y"
unfolding approx_def by (drule Infinitesimal_hIm) simp
lemma approx_HComplex:
"\<lbrakk>a \<approx> b; c \<approx> d\<rbrakk> \<Longrightarrow> HComplex a c \<approx> HComplex b d"
unfolding approx_def by (simp add: Infinitesimal_HComplex)
lemma hcomplex_approx_iff:
"(x \<approx> y) = (hRe x \<approx> hRe y \<and> hIm x \<approx> hIm y)"
unfolding approx_def by (simp add: hcomplex_Infinitesimal_iff)
lemma HFinite_hRe: "x \<in> HFinite \<Longrightarrow> hRe x \<in> HFinite"
apply (auto simp add: HFinite_def SReal_def)
apply (rule_tac x="star_of r" in exI, simp)
apply (erule order_le_less_trans [OF abs_hRe_le_hcmod])
done
lemma HFinite_hIm: "x \<in> HFinite \<Longrightarrow> hIm x \<in> HFinite"
apply (auto simp add: HFinite_def SReal_def)
apply (rule_tac x="star_of r" in exI, simp)
apply (erule order_le_less_trans [OF abs_hIm_le_hcmod])
done
lemma HFinite_HComplex:
"\<lbrakk>x \<in> HFinite; y \<in> HFinite\<rbrakk> \<Longrightarrow> HComplex x y \<in> HFinite"
apply (subgoal_tac "HComplex x 0 + HComplex 0 y \<in> HFinite", simp)
apply (rule HFinite_add)
apply (simp add: HFinite_hcmod_iff hcmod_i)
apply (simp add: HFinite_hcmod_iff hcmod_i)
done
lemma hcomplex_HFinite_iff:
"(x \<in> HFinite) = (hRe x \<in> HFinite \<and> hIm x \<in> HFinite)"
apply (safe intro!: HFinite_hRe HFinite_hIm)
apply (drule (1) HFinite_HComplex, simp)
done
lemma hcomplex_HInfinite_iff:
"(x \<in> HInfinite) = (hRe x \<in> HInfinite \<or> hIm x \<in> HInfinite)"
by (simp add: HInfinite_HFinite_iff hcomplex_HFinite_iff)
lemma hcomplex_of_hypreal_approx_iff [simp]:
"(hcomplex_of_hypreal x \<approx> hcomplex_of_hypreal z) = (x \<approx> z)"
by (simp add: hcomplex_approx_iff)
lemma Standard_HComplex:
"\<lbrakk>x \<in> Standard; y \<in> Standard\<rbrakk> \<Longrightarrow> HComplex x y \<in> Standard"
by (simp add: HComplex_def)
(* Here we go - easy proof now!! *)
lemma stc_part_Ex: "x:HFinite ==> \<exists>t \<in> SComplex. x \<approx> t"
apply (simp add: hcomplex_HFinite_iff hcomplex_approx_iff)
apply (rule_tac x="HComplex (st (hRe x)) (st (hIm x))" in bexI)
apply (simp add: st_approx_self [THEN approx_sym])
apply (simp add: Standard_HComplex st_SReal [unfolded Reals_eq_Standard])
done
lemma stc_part_Ex1: "x\<in>HFinite \<Longrightarrow> \<exists>!t. t \<in> SComplex \<and> x \<approx> t"
apply (drule stc_part_Ex, safe)
apply (drule_tac [2] approx_sym, drule_tac [2] approx_sym, drule_tac [2] approx_sym)
apply (auto intro!: approx_unique_complex)
done
lemmas hcomplex_of_complex_approx_inverse =
hcomplex_of_complex_HFinite_diff_Infinitesimal [THEN [2] approx_inverse]
subsection\<open>Theorems About Monads\<close>
lemma monad_zero_hcmod_iff: "(x \<in> monad 0) = (hcmod x:monad 0)"
by (simp add: Infinitesimal_monad_zero_iff [symmetric] Infinitesimal_hcmod_iff)
subsection\<open>Theorems About Standard Part\<close>
lemma stc_approx_self: "x \<in> HFinite ==> stc x \<approx> x"
apply (simp add: stc_def)
apply (frule stc_part_Ex, safe)
apply (rule someI2)
apply (auto intro: approx_sym)
done
lemma stc_SComplex: "x \<in> HFinite ==> stc x \<in> SComplex"
apply (simp add: stc_def)
apply (frule stc_part_Ex, safe)
apply (rule someI2)
apply (auto intro: approx_sym)
done
lemma stc_HFinite: "x \<in> HFinite ==> stc x \<in> HFinite"
by (erule stc_SComplex [THEN Standard_subset_HFinite [THEN subsetD]])
lemma stc_unique: "\<lbrakk>y \<in> SComplex; y \<approx> x\<rbrakk> \<Longrightarrow> stc x = y"
apply (frule Standard_subset_HFinite [THEN subsetD])
apply (drule (1) approx_HFinite)
apply (unfold stc_def)
apply (rule some_equality)
apply (auto intro: approx_unique_complex)
done
lemma stc_SComplex_eq [simp]: "x \<in> SComplex ==> stc x = x"
apply (erule stc_unique)
apply (rule approx_refl)
done
lemma stc_hcomplex_of_complex:
"stc (hcomplex_of_complex x) = hcomplex_of_complex x"
by auto
lemma stc_eq_approx:
"[| x \<in> HFinite; y \<in> HFinite; stc x = stc y |] ==> x \<approx> y"
by (auto dest!: stc_approx_self elim!: approx_trans3)
lemma approx_stc_eq:
"[| x \<in> HFinite; y \<in> HFinite; x \<approx> y |] ==> stc x = stc y"
by (blast intro: approx_trans approx_trans2 SComplex_approx_iff [THEN iffD1]
dest: stc_approx_self stc_SComplex)
lemma stc_eq_approx_iff:
"[| x \<in> HFinite; y \<in> HFinite|] ==> (x \<approx> y) = (stc x = stc y)"
by (blast intro: approx_stc_eq stc_eq_approx)
lemma stc_Infinitesimal_add_SComplex:
"[| x \<in> SComplex; e \<in> Infinitesimal |] ==> stc(x + e) = x"
apply (erule stc_unique)
apply (erule Infinitesimal_add_approx_self)
done
lemma stc_Infinitesimal_add_SComplex2:
"[| x \<in> SComplex; e \<in> Infinitesimal |] ==> stc(e + x) = x"
apply (erule stc_unique)
apply (erule Infinitesimal_add_approx_self2)
done
lemma HFinite_stc_Infinitesimal_add:
"x \<in> HFinite ==> \<exists>e \<in> Infinitesimal. x = stc(x) + e"
by (blast dest!: stc_approx_self [THEN approx_sym] bex_Infinitesimal_iff2 [THEN iffD2])
lemma stc_add:
"[| x \<in> HFinite; y \<in> HFinite |] ==> stc (x + y) = stc(x) + stc(y)"
by (simp add: stc_unique stc_SComplex stc_approx_self approx_add)
lemma stc_numeral [simp]: "stc (numeral w) = numeral w"
by (rule Standard_numeral [THEN stc_SComplex_eq])
lemma stc_zero [simp]: "stc 0 = 0"
by simp
lemma stc_one [simp]: "stc 1 = 1"
by simp
lemma stc_minus: "y \<in> HFinite ==> stc(-y) = -stc(y)"
by (simp add: stc_unique stc_SComplex stc_approx_self approx_minus)
lemma stc_diff:
"[| x \<in> HFinite; y \<in> HFinite |] ==> stc (x-y) = stc(x) - stc(y)"
by (simp add: stc_unique stc_SComplex stc_approx_self approx_diff)
lemma stc_mult:
"[| x \<in> HFinite; y \<in> HFinite |]
==> stc (x * y) = stc(x) * stc(y)"
by (simp add: stc_unique stc_SComplex stc_approx_self approx_mult_HFinite)
lemma stc_Infinitesimal: "x \<in> Infinitesimal ==> stc x = 0"
by (simp add: stc_unique mem_infmal_iff)
lemma stc_not_Infinitesimal: "stc(x) \<noteq> 0 ==> x \<notin> Infinitesimal"
by (fast intro: stc_Infinitesimal)
lemma stc_inverse:
"[| x \<in> HFinite; stc x \<noteq> 0 |]
==> stc(inverse x) = inverse (stc x)"
apply (drule stc_not_Infinitesimal)
apply (simp add: stc_unique stc_SComplex stc_approx_self approx_inverse)
done
lemma stc_divide [simp]:
"[| x \<in> HFinite; y \<in> HFinite; stc y \<noteq> 0 |]
==> stc(x/y) = (stc x) / (stc y)"
by (simp add: divide_inverse stc_mult stc_not_Infinitesimal HFinite_inverse stc_inverse)
lemma stc_idempotent [simp]: "x \<in> HFinite ==> stc(stc(x)) = stc(x)"
by (blast intro: stc_HFinite stc_approx_self approx_stc_eq)
lemma HFinite_HFinite_hcomplex_of_hypreal:
"z \<in> HFinite ==> hcomplex_of_hypreal z \<in> HFinite"
by (simp add: hcomplex_HFinite_iff)
lemma SComplex_SReal_hcomplex_of_hypreal:
"x \<in> \<real> ==> hcomplex_of_hypreal x \<in> SComplex"
apply (rule Standard_of_hypreal)
apply (simp add: Reals_eq_Standard)
done
lemma stc_hcomplex_of_hypreal:
"z \<in> HFinite ==> stc(hcomplex_of_hypreal z) = hcomplex_of_hypreal (st z)"
apply (rule stc_unique)
apply (rule SComplex_SReal_hcomplex_of_hypreal)
apply (erule st_SReal)
apply (simp add: hcomplex_of_hypreal_approx_iff st_approx_self)
done
(*
Goal "x \<in> HFinite ==> hcmod(stc x) = st(hcmod x)"
by (dtac stc_approx_self 1)
by (auto_tac (claset(),simpset() addsimps [bex_Infinitesimal_iff2 RS sym]));
approx_hcmod_add_hcmod
*)
lemma Infinitesimal_hcnj_iff [simp]:
"(hcnj z \<in> Infinitesimal) = (z \<in> Infinitesimal)"
by (simp add: Infinitesimal_hcmod_iff)
lemma Infinitesimal_hcomplex_of_hypreal_epsilon [simp]:
"hcomplex_of_hypreal \<epsilon> \<in> Infinitesimal"
by (simp add: Infinitesimal_hcmod_iff)
end