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version 1.3, 2000/01/13 08:29:56

version 1.6, 2003/04/20 08:01:25

Line 1

@comment $OpenXM: OpenXM/src/asir-doc/parts/ff.texi,v 1.2 1999/12/21 02:47:31 noro Exp $

@comment $OpenXM: OpenXM/src/asir-doc/parts/ff.texi,v 1.5 2003/04/19 15:44:56 noro Exp $

\BJP

@node $BM-8BBN$K4X$9$k1i;;(B,,, Top

@chapter $BM-8BBN$K4X$9$k1i;;(B

Line 12

\BJP

* $BM-8BBN$NI=8=$*$h$S1i;;(B::

* $BM-8BBN>e$G$N(B 1 $BJQ?tB?9`<0$N1i;;(B::

* $B>.I8?tM-8BBN>e$G$NB?9`<0$N1i;;(B::

* $BM-8BBN>e$NBJ1_6J@~$K4X$9$k1i;;(B::

* $BM-8BBN$K4X$9$kH!?t$N$^$H$a(B::

\BEG

* Representation of finite fields::

* Univariate polynomials on finite fields::

* Polynomials on small finite fields::

* Elliptic curves on finite fields::

* Functions for Finite fields::

Line 34

Line 36

@noindent

\BJP

@b{Asir} $B$K$*$$$F$O(B, $BM-8BBN$O(B, $B@5I8?tAGBN(B GF(p), $BI8?t(B 2 $B$NM-8BBN(B GF(2^n)

@b{Asir} $B$K$*$$$F$O(B, $BM-8BBN$O(B, $B@5I8?tAGBN(B GF(@var{p}), $BI8?t(B 2 $B$NM-8BBN(B GF(2^@var{n}),

GF(@var{p}) $B$N(B @var{n} $B<!3HBg(B GF(@var{p^n})

$B$,Dj5A$G$-$k(B. $B$3$l$i$OA4$F(B, @code{setmod_ff()} $B$K$h$jDj5A$5$l$k(B.

\BEG

On @b{Asir} @var{GF(p)} and @var{GF(2^n)} can be defined, where

On @b{Asir} GF(@var{p}), GF(2^@var{n}), GF(@var{p^n}) can be defined, where

@var{GF(p)} is a finite prime field of charateristic @var{p} and

GF(@var{p}) is a finite prime field of charateristic @var{p},

@var{GF(2^n)} is a finite field of characteristic 2. These are

GF(2^@var{n}) is a finite field of characteristic 2 and

GF(@var{p^n}) is a finite extension of GF(@var{p}). These are

all defined by @code{setmod_ff()}.

Line 59 x^50+x^4+x^3+x^2+1

Line 63 x^50+x^4+x^3+x^2+1

x^50+x^4+x^3+x^2+1

[6] field_type_ff();

[7] setmod_ff(x^3+x+1,1125899906842679);

[1*x^3+1*x+1,1125899906842679]

[8] field_type_ff();

[9] setmod_ff(3,5);

[3,x^5+2*x+1,x]

[10] field_type_ff();

@end example

\BJP

@code{setmod_ff()} $B$O(B, $B0z?t$,@5@0?t(B p $B$N>l9g(B GF(p), n $B<!B?9`<0(B f(x) $B$N>l(B

@code{setmod_ff()} $B$O(B, $B$5$^$6$^$J%?%$%W$NM-8BBN$r4pACBN$H$7$F%;%C%H$9$k(B.

$B9g(B, f(x) mod 2 $B$rDj5AB?9`<0$H$9$k(B GF(2^n) $B$r$=$l$>$l4pACBN$H$7$F%;%C%H$9(B

$B0z?t$,@5@0?t(B @var{p} $B$N>l9g(B GF(@var{p}), @var{n} $B<!B?9`<0(B f(x) $B$N>l(B

$B$k(B. @code{setmod_ff()} $B$K$*$$$F$O0z?t$N4{Ls%A%'%C%/$O9T$o$:(B, $B8F$S=P$7B&(B

$B9g(B, f(x) mod 2 $B$rDj5AB?9`<0$H$9$k(B GF(2^@var{n}) $B$r$=$l$>$l4pACBN$H$7$F%;%C%H$9(B

$B$k(B. $B$^$?(B, $BM-8BAGBN$NM-8B<!3HBg$bDj5A$G$-$k(B. $B>\$7$/$O(B @xref{$B?t$N7?(B}.

@code{setmod_ff()} $B$K$*$$$F$O0z?t$N4{Ls%A%'%C%/$O9T$o$:(B, $B8F$S=P$7B&(B

$B$,@UG$$r;}$D(B.

$B4pACBN$H$O(B, $B$"$/$^$GM-8BBN$N85$H$7$F@k8@$"$k$$$ODj5A$5$l$?%*%V%8%'%/%H$,(B,

Line 73 x^50+x^4+x^3+x^2+1

Line 87 x^50+x^4+x^3+x^2+1

$B$k(B.

0 $B$G$J$$M-8BBN$N85$O(B, $B?t%*%V%8%'%/%H$G$"$j(B, $B<1JL;R$NCM$O(B 1 $B$G$"$k(B.

$B$5$i$K(B, 0 $B$G$J$$M-8BBN$N85$N?t<1JL;R$O(B, GF(p) $B$N>l9g(B 6, GF(2^n) $B$N>l9g(B 7

$B$5$i$K(B, 0 $B$G$J$$M-8BBN$N85$N?t<1JL;R$O(B, GF(@var{p}) $B$N>l9g(B 6, GF(2^@var{n}) $B$N>l9g(B 7

$B$H$J$k(B.

$BM-8BBN$N85$NF~NOJ}K!$O(B, $BM-8BBN$N<oN`$K$h$jMM!9$G$"$k(B. GF(p) $B$N>l9g(B,

$BM-8BBN$N85$NF~NOJ}K!$O(B, $BM-8BBN$N<oN`$K$h$jMM!9$G$"$k(B. GF(@var{p}) $B$N>l9g(B,

@code{simp_ff()} $B$K$h$k(B.

\BEG

If @var{p} is a positive integer, @code{setmod_ff(@var{p})} sets

@var{GF(p)} as the current base field.

GF(@var{p}) as the current base field.

If @var{f} is a univariate polynomial of degree @var{n},

@code{setmod_ff(@var{f})} sets @var{GF(2^n)} as the current

@code{setmod_ff(@var{f})} sets GF(2^@var{n}) as the current

base field. @var{GF(2^n)} is represented

base field. GF(2^@var{n}) is represented

as an algebraic extension of @var{GF(2)} with the defining polynomial

as an algebraic extension of GF(2) with the defining polynomial

@var{f mod 2}. In both cases the primality check of the argument is

@var{f mod 2}. Furthermore, finite extensions of prime finite fields

can be defined. @xref{Types of numbers}.

In all cases the primality check of the argument is

not done and the caller is responsible for it.

Correctly speaking there is no actual object corresponding to a 'base field'.

Line 99 a finite field, then the other is automatically regard

Line 115 a finite field, then the other is automatically regard

same finite field and the operation is done in the finite field.

A non zero element of a finite field belongs to the number and has object

identifier 1. Its number identifier is 6 if the finite field is @var{GF(p)},

identifier 1. Its number identifier is 6 if the finite field is GF(@var{p}),

7 if it is @var{GF(2^n)}.

7 if it is GF(2^@var{n}).

There are several methods to input an element of a finite field.

An element of @var{GF(p)} can be input by @code{simp_ff()}.

An element of GF(@var{p}) can be input by @code{simp_ff()}.

@example

Line 117 An element of @var{GF(p)} can be input by @code{simp_f

Line 133 An element of @var{GF(p)} can be input by @code{simp_f

@end example

\JP $B$^$?(B, GF(2^n) $B$N>l9g$$$/$D$+$NJ}K!$,$"$k(B.

\JP $B$^$?(B, GF(2^@var{n}) $B$N>l9g$$$/$D$+$NJ}K!$,$"$k(B.

\EG In the case of @var{GF(2^n)} the following methods are available.

\EG In the case of GF(2^@var{n}) the following methods are available.

@example

[0] setmod_ff(x^50+x^4+x^3+x^2+1);

Line 135 x^50+x^4+x^3+x^2+1

Line 151 x^50+x^4+x^3+x^2+1

\BJP

$BM-8BBN$N85$O?t$G$"$j(B, $BBN1i;;$,2DG=$G$"$k(B. @code{@@} $B$O(B

GF(2^n) $B$N(B, GF(2)$B>e$N@8@.85$G$"$k(B. $B>\$7$/$O(B @xref{$B?t$N7?(B}.

GF(2^@var{n}) $B$N(B, GF(2) $B>e$N@8@.85$G$"$k(B. $B>\$7$/$O(B @xref{$B?t$N7?(B}.

\BEG

Elements of finite fields are numbers and one can apply field arithmetics

to them. @code{@@} is a generator of @var{GF(2^n)} over @var{GF(2)}.

to them. @code{@@} is a generator of GF(2^@var{n}) over GF(2).

@xref{Types of numbers}.

Line 190 The irreducible factorization proceeds as follows.

Line 206 The irreducible factorization proceeds as follows.

@end enumerate

@noindent

\BJP

@node $B>.I8?tM-8BBN>e$G$NB?9`<0$N1i;;(B,,, $BM-8BBN$K4X$9$k1i;;(B

@section $B>.I8?tM-8BBN>e$G$NB?9`<0$N1i;;(B

\BEG

@node Polynomials on small finite fields,,, Finite fields

@section Polynomials on small finite fields

\BJP

$B>.I8?tM-8BBN78?t$NB?9`<0$K8B$j(B, $BB?JQ?tB?9`<0$N0x?tJ,2r$,(B

$BAH$_9~$_4X?t$H$7$F<BAu$5$l$F$$$k(B. $B4X?t$O(B @code{sffctr()}

$B$G$"$k(B. $B$^$?(B, @code{modfctr()} $B$b(B, $BM-8BAGBN>e$GB?JQ?t(B

$BB?9`<0$N0x?tJ,2r$r9T$&$,(B, $B<B:]$K$O(B, $BFbIt$G==J,Bg$-$J(B

$B3HBgBN$r@_Dj$7(B, @code{sffctr()} $B$r8F$S=P$7$F(B,

$B:G=*E*$KAGBN>e$N0x;R$r9=@.$9$k(B, $B$H$$$&J}K!$G7W;;$7$F$$$k(B.

\BEG

A multivariate polynomial over small finite field

set by @code{setmod_ff(p,n)} can be factorized by

using a builtin function @code{sffctr()}. @code{modfctr()}

also factorizes a polynomial over a finite prime field.

Internally, @code{modfctr()} creates a sufficiently large

field extension of the specified ground field, and

it calls @code{sffctr()}, then it constructs irreducible

factors over the ground field from the factors returned by

@code{sffctr()}.

\BJP

@node $BM-8BBN>e$NBJ1_6J@~$K4X$9$k1i;;(B,,, $BM-8BBN$K4X$9$k1i;;(B

@section $BM-8BBN>e$NBJ1_6J@~$K4X$9$k1i;;(B

Line 203 The irreducible factorization proceeds as follows.

Line 251 The irreducible factorization proceeds as follows.

$BM-8BBN>e$NBJ1_6J@~$K4X$9$k$$$/$D$+$N4pK\E*$J1i;;$,(B, $BAH$_9~$_4X?t$H$7$F(B

$BDs6!$5$l$F$$$k(B.

$BBJ1_6J@~$N;XDj$O(B, $BD9$5(B 2 $B$N%Y%/%H%k(B @var{[a b]} $B$G9T$&(B. @var{a}, @var{b}

$BBJ1_6J@~$N;XDj$O(B, $BD9$5(B 2 $B$N%Y%/%H%k(B [@var{a b}] $B$G9T$&(B. @var{a}, @var{b}

$B$OM-8BBN$N85$G(B,

@code{setmod_ff} $B$GDj5A$5$l$F$$$kM-8BBN$,AGBN$N>l9g(B, @var{y^2=x^3+ax+b},

$BI8?t(B 2 $B$NBN$N>l9g(B @var{y^2+xy=x^3+ax^2+b} $B$rI=$9(B.

Line 215 The irreducible factorization proceeds as follows.

Line 263 The irreducible factorization proceeds as follows.

@itemize @bullet

@item $BL58B1sE@$O(B 0.

@item $B$=$l0J30$NE@$O(B, $BD9$5(B 3 $B$N%Y%/%H%k(B @var{[x y z]}. $B$?$@$7(B, @var{z} $B$O(B

@item $B$=$l0J30$NE@$O(B, $BD9$5(B 3 $B$N%Y%/%H%k(B [@var{x y z}]. $B$?$@$7(B, @var{z} $B$O(B

0 $B$G$J$$(B.

@end itemize

$B$H$$$&E@$G$"$k(B. @var{[x y z]} $B$O@F<!:BI8$K$h$kI=8=$G$"$j(B, $B%"%U%#%s:BI8(B

$B$H$$$&E@$G$"$k(B. [@var{x y z}] $B$O@F<!:BI8$K$h$kI=8=$G$"$j(B, $B%"%U%#%s:BI8(B

$B$G$O(B @var{[x/z y/z]} $B$J$kE@$rI=$9(B. $B$h$C$F(B, $B%"%U%#%s:BI8(B @var{[x y]} $B$G(B

$B$G$O(B [@var{x/z y/z}] $B$J$kE@$rI=$9(B. $B$h$C$F(B, $B%"%U%#%s:BI8(B [@var{x y}] $B$G(B

$BI=8=$5$l$?E@$r1i;;BP>]$H$9$k$K$O(B, @var{[x y 1]} $B$J$k%Y%/%H%k$r(B

$BI=8=$5$l$?E@$r1i;;BP>]$H$9$k$K$O(B, [@var{x y 1}] $B$J$k%Y%/%H%k$r(B

$B@8@.$9$kI,MW$,$"$k(B.

$B1i;;7k2L$b@F<!:BI8$GF@$i$l$k$,(B, @var{z} $B:BI8$,(B 1 $B$H$O8B$i$J$$$?$a(B,

$B%"%U%#%s:BI8$r5a$a$k$?$a$K$O(B @var{x}, @var{y} $B:BI8$r(B @var{z} $B:BI8$G(B

Line 232 The irreducible factorization proceeds as follows.

Line 280 The irreducible factorization proceeds as follows.

Several fundamental operations on elliptic curves over finite fields

are provided as built-in functions.

An elliptic curve is specified by a vector @var{[a b]} of length 2,

An elliptic curve is specified by a vector [@var{a b}] of length 2,

where @var{a}, @var{b} are elements of finite fields.

If the current base field is a prime field, then @var{[a b]} represents

If the current base field is a prime field, then [@var{a b}] represents

@var{y^2=x^3+ax+b}. If the current base field is a finite field of

characteristic 2, then @var{[a b]} represents @var{y^2+xy=x^3+ax^2+b}.

characteristic 2, then [@var{a b}] represents @var{y^2+xy=x^3+ax^2+b}.

Points on an elliptic curve together with the point at infinity

forms an additive group. The addition, the subtraction and the

Line 246 Here the representation of points are as follows.

Line 294 Here the representation of points are as follows.

@itemize @bullet

@item 0 denotes the point at infinity.

@item The other points are represented by vectors @var{[x y z]} of

@item The other points are represented by vectors [@var{x y z}] of

length 3 with non-zero @var{z}.

@end itemize

@var{[x y z]} represents a projective coordinate and

[@var{x y z}] represents a projective coordinate and

it corresponds to @var{[x/z y/z]} in the affine coordinate.

it corresponds to [@var{x/z y/z}] in the affine coordinate.

To apply the above operations to a point @var{[x y]},

To apply the above operations to a point [@var{x y}],

@var{[x y 1]} should be used instead as an argument.

[@var{x y 1}] should be used instead as an argument.

The result of an operation is also represented by the projective

coordinate. As the third coordinate is not always equal to 1,

one has to divide the first and the scond coordinate by the third

Line 282 one to obtain the affine coordinate.

Line 330 one to obtain the affine coordinate.

* gf2nton::

* ptogf2n::

* gf2ntop::

* ptosfp sfptop::

* defpoly_mod2::

* sffctr::

* fctr_ff::

* irredcheck_ff::

* randpoly_ff::

Line 297 one to obtain the affine coordinate.

Line 347 one to obtain the affine coordinate.

@table @t

@item setmod_ff([@var{prime}|@var{poly}])

@itemx setmod_ff(@var{prime},@var{n}])

\JP :: $BM-8BBN$N@_Dj(B, $B@_Dj$5$l$F$$$kM-8BBN$NK!(B, $BDj5AB?9`<0$NI=<((B

\EG :: Sets/Gets the current base fields.

@end table

Line 311 one to obtain the affine coordinate.

Line 362 one to obtain the affine coordinate.

@item poly

\JP GF(2) $B>e4{Ls$J(B 1 $BJQ?tB?9`<0(B

\EG univariate polynomial irreducible over GF(2)

@item n

\JP $B3HBg<!?t(B

\EG the extension degree

@end table

@itemize @bullet

Line 322 one to obtain the affine coordinate.

Line 376 one to obtain the affine coordinate.

GF(2^deg(@var{poly} mod 2)) = GF(2)[t]/(@var{poly}(t) mod 2)

$B$r4pACBN$H$7$F@_Dj$9$k(B.

@item

$BL50z?t$N;~(B, $B@_Dj$5$l$F$$$k4pACBN$,(B GF(@var{prime}) $B$N>l9g(B @var{prime},

$B0z?t$,(B @var{p} $B$H(B @var{n} $B$N;~(B,

GF(2^n) $B$N>l9gDj5AB?9`<0$rJV$9(B.

GF(@var{p^n}) $B$r4pACBN$H$7$F@_Dj$9$k(B. @var{p^n} $B$O(B @var{2^29} $BL$K~$G(B

$B$J$1$l$P$J$i$J$$(B. $B$^$?(B, @var{p} $B$,(B @var{2^14} $B0J>e$N$H$-(B,

@var{n} $B$O(B 1 $B$G$J$1$l$P$J$i$J$$(B.

@item

GF(2^n) $B$NDj5AB?9`<0$O(B, GF(2) $B>e(B n $B<!4{Ls$J$i$J$s$G$bNI$$$,(B, $B8zN($K(B

$BL50z?t$N;~(B, $B@_Dj$5$l$F$$$k4pACBN$,(B GF(@var{prime})$B$N>l9g(B @var{prime},

GF(2^@var{n}) $B$N>l9gDj5AB?9`<0$rJV$9(B.

$B4pACBN$,(B GF(p^@var{n})

(@var{p^n} $B$,(B @var{2^14} $BL$K~(B) $B$N>l9g(B,

[@var{p},@var{defpoly},@var{prim_elem}] $B$rJV$9(B. $B$3$3$G(B, @var{defpoly}

$B$O(B, @var{n} $B<!3HBg$NDj5AB?9`<0(B, @var{prim_elem} $B$O(B, GF(@var{p^n})

$B>hK!72$N@8@.85$r0UL#$9$k(B.

@item

GF(2^@var{n}) $B$NDj5AB?9`<0$O(B, GF(2) $B>e(B n $B<!4{Ls$J$i$J$s$G$bNI$$$,(B, $B8zN($K(B

$B1F6A$9$k$?$a(B, @code{defpoly_mod2()} $B$G@8@.$9$k$N$,$h$$(B.

\BEG

Line 337 If the argument is a polynomial @var{poly},

Line 401 If the argument is a polynomial @var{poly},

GF(2^deg(@var{poly} mod 2)) = GF(2)[t]/(@var{poly}(t) mod2)

is set as the current base field.

@item

If the arguments are a prime @var{p} and an extension degree @var{n},

GF(@var{p^n}) is set as the current base field. @var{p^n} must be

less than @var{2^29} and if @var{p} is greater than or equal to @var{2^14},

then @var{n} must be equal to 1.

@item

If no argument is specified, the modulus indicating the current base field

is returned. If the current base field is GF(@var{prime}), @var{prime} is

returned. If it is GF(2^n), the defining polynomial is returned.

returned. If it is GF(2^@var{n}), the defining polynomial is returned.

If it is GF(@var{p^n}), where @var{p^n} is less than @var{2^14},

[@var{p},@var{defpoly},@var{prim_elem}] is returned. Here, @var{defpoly}

is the defining polynomial of the @var{n}-th extension,

and @var{prim_elem} is the generator of the multiplicative group

of GF(@var{p^n}).

@item

Any irreducible univariate polynomial over GF(2) is available to

set GF(2^n). However the use of @code{defpoly_mod2()} is recommended

set GF(2^@var{n}). However the use of @code{defpoly_mod2()} is recommended

for efficiency.

@end itemize

Line 354 x^100+x^15+1

Line 428 x^100+x^15+1

x^100+x^15+1

[176] setmod_ff();

x^100+x^15+1

[177] setmod_ff(2,5);

[2,x^5+x^2+1,x]

@end example

@table @t

Line 384 x^100+x^15+1

Line 460 x^100+x^15+1

@item

$B@_Dj$5$l$F$$$k4pACBN$N<oN`$rJV$9(B.

@item

$B@_Dj$J$7$J$i(B 0, GF(p) $B$J$i(B 1, GF(2^n) $B$J$i(B 2 $B$rJV$9(B.

$B@_Dj$J$7$J$i(B 0, GF(@var{p}) $B$J$i(B 1, GF(2^@var{n}) $B$J$i(B 2 $B$rJV$9(B.

\BEG

@item

Returns the type of the current base field.

@item

If no field is set, 0 is returned. If GF(p) is set, 1 is returned.

If no field is set, 0 is returned. If GF(@var{p}) is set, 1 is returned.

If GF(2^n) is set, 2 is returned.

If GF(2^@var{n}) is set, 2 is returned.

@end itemize

Line 436 x^2+x+1

Line 512 x^2+x+1

@item

$B@_Dj$5$l$F$$$k4pACBN$N0L?t(B ($B85$N8D?t(B) $B$rJV$9(B.

@item

$B@_Dj$5$l$F$$$kBN$,(B GF(q) $B$J$i$P(B q $B$rJV$9(B.

$B@_Dj$5$l$F$$$kBN$,(B GF(@var{q}) $B$J$i$P(B q $B$rJV$9(B.

\BEG

@item

Returns the order of the current base field.

@item

@var{q} is returned if the current base field is GF(q).

@var{q} is returned if the current base field is GF(@var{q}).

@end itemize

Line 488 x^2+x+1

Line 564 x^2+x+1

@item

$B@_Dj$5$l$F$$$kBN$NI8?t$rJV$9(B.

@item

GF(p) $B$N>l9g(B p, GF(2^n) $B$N>l9g(B 2 $B$rJV$9(B.

GF(@var{p}) $B$N>l9g(B @var{p}, GF(2^@var{n}) $B$N>l9g(B 2 $B$rJV$9(B.

\BEG

@item

Returns the characteristic of the current base field.

@item

@var{p} is returned if @var{GF(p)}, where @var{p} is a prime, is set.

@var{p} is returned if GF(@var{p}), where @var{p} is a prime, is set.

@var{2} is returned if @var{GF(2^n)} is set.

@var{2} is returned if GF(2^@var{n}) is set.

@end itemize

Line 541 x^2+x+1

Line 617 x^2+x+1

@item

$B@_Dj$5$l$F$$$k4pACBN$N(B, $BAGBN$KBP$9$k3HBg<!?t$rJV$9(B.

@item

GF(p) $B$N>l9g(B 1, GF(2^n) $B$N>l9g(B n $B$rJV$9(B.

GF(@var{p}) $B$N>l9g(B 1, GF(2^@var{n}) $B$N>l9g(B @var{n} $B$rJV$9(B.

\BEG

@item

Returns the extension degree of the current base field over the prime field.

@item

GF(p) $B$N>l9g(B 1, GF(2^n) $B$N>l9g(B n $B$rJV$9(B.

1 is returned if GF(@var{p}), where @var{p} is a prime, is set.

1 is returned if @var{GF(p)}, where @var{p} is a prime, is set.

@var{n} is returned if GF(2^@var{n}) is set.

@var{n} is returned if @var{GF(2^n)} is set.

@end itemize

Line 606 in finite fields.

Line 681 in finite fields.

@item

$BM-8BBN$N85$KBP$7(B, $BK!$"$k$$$ODj5AB?9`<0$K$h$k(B reduction $B$r9T$&>l9g$K$b(B

$BMQ$$$k(B.

@item

$B>.I8?tM-8BBN$N85$KJQ49$9$k>l9g(B, $B0lC6AGBN>e$K<M1F$7$F$+$i(B, $B3HBgBN$N(B

$B85$KJQ49$5$l$k(B. $B3HBgBN$N85$KD>@\JQ49$9$k$K$O(B @code{ptosfp()} $B$r(B

$BMQ$$$k(B.

\BEG

@item

Line 616 It is used to convert integers or intrgral polynomials

Line 695 It is used to convert integers or intrgral polynomials

elements of finite fields or polynomials over finite fields.

@item

An element of a finite field may not have the reduced representation.

In such case an application of @code{simp_ff} assures the output has

In such case an application of @code{simp_ff} ensures that the output has

the reduced representation.

If a small finite field is set as a ground field,

an integer is projected the finite prime field, then

it is embedded into the ground field. @code{ptosfp()}

can be used for direct projection to the ground field.

@end itemize

Line 630 x^10+10*x^9+45*x^8+120*x^7+210*x^6+252*x^5+210*x^4+120

Line 713 x^10+10*x^9+45*x^8+120*x^7+210*x^6+252*x^5+210*x^4+120

1*x^10+1*x^9+1*x+1

[3] ntype(coef(@@@@,10));

[4] setmod_ff(2,3);

[2,x^3+x+1,x]

[5] simp_ff(1);

@@_0

[6] simp_ff(2);

[7] ptosfp(2);

@@_1

@end example

@table @t

\JP @item $B;2>H(B

\EG @item References

@fref{setmod_ff}, @fref{lmptop}, @fref{gf2nton}

@fref{setmod_ff}, @fref{lmptop}, @fref{gf2nton}, @fref{ptosfp sfptop}

@end table

\JP @node random_ff,,, $BM-8BBN$K4X$9$kH!?t$N$^$H$a(B

Line 696 return to toplevel

Line 787 return to toplevel

@table @t

@item lmptop(@var{obj})

\JP :: GF(p) $B78?tB?9`<0$N78?t$r@0?t$KJQ49(B

\JP :: GF(@var{p}) $B78?tB?9`<0$N78?t$r@0?t$KJQ49(B

\EG :: Converts the coefficients of a polynomial over GF(p) into integers.

\EG :: Converts the coefficients of a polynomial over GF(@var{p}) into integers.

@end table

@table @var

Line 705 return to toplevel

Line 796 return to toplevel

\JP $B@0?t78?tB?9`<0(B

\EG integral polynomial

@item obj

\JP GF(p) $B78?tB?9`<0(B

\JP GF(@var{p}) $B78?tB?9`<0(B

\EG polynomial over GF(p)

\EG polynomial over GF(@var{p})

@end table

@itemize @bullet

\BJP

@item

GF(p) $B78?tB?9`<0$N78?t$r@0?t$KJQ49$9$k(B.

GF(@var{p}) $B78?tB?9`<0$N78?t$r@0?t$KJQ49$9$k(B.

@item

GF(p) $B$N85$O(B, 0 $B0J>e(B p $BL$K~$N@0?t$GI=8=$5$l$F$$$k(B.

GF(@var{p}) $B$N85$O(B, 0 $B0J>e(B p $BL$K~$N@0?t$GI=8=$5$l$F$$$k(B.

$BB?9`<0$N3F78?t$O(B, $B$=$NCM$r@0?t%*%V%8%'%/%H(B($B?t<1JL;R(B 0)$B$H$7$?$b$N$K(B

$BJQ49$5$l$k(B.

\BEG

@item

Converts the coefficients of a polynomial over GF(p) into integers.

Converts the coefficients of a polynomial over GF(@var{p}) into integers.

@item

An element of GF(p) is represented by a non-negative integer @var{r} less than

An element of GF(@var{p}) is represented by a non-negative integer @var{r} less than

@var{p}.

Each coefficient of a polynomial is converted into an integer object

whose value is @var{r}.

Line 738 whose value is @var{r}.

Line 829 whose value is @var{r}.

[2] setmod_ff(547);

547

[3] F=simp_ff((x-1)^10);

1*x^10+537*x^9+45*x^8+427*x^7+210*x^6+295*x^5+210*x^4+427*x^3+45*x^2+537*x+1

1*x^10+537*x^9+45*x^8+427*x^7+210*x^6+295*x^5+210*x^4+427*x^3

+45*x^2+537*x+1

[4] lmptop(F);

x^10+537*x^9+45*x^8+427*x^7+210*x^6+295*x^5+210*x^4+427*x^3+45*x^2+537*x+1

x^10+537*x^9+45*x^8+427*x^7+210*x^6+295*x^5+210*x^4+427*x^3

+45*x^2+537*x+1

[5] lmptop(coef(F,1));

537

[6] ntype(@@@@);

Line 760 x^10+537*x^9+45*x^8+427*x^7+210*x^6+295*x^5+210*x^4+42

Line 853 x^10+537*x^9+45*x^8+427*x^7+210*x^6+295*x^5+210*x^4+42

@table @t

@item ntogf2n(@var{m})

\JP :: $B<+A3?t$r(B GF(2^n) $B$N85$KJQ49(B

\JP :: $B<+A3?t$r(B GF(2^@var{n}) $B$N85$KJQ49(B

\EG :: Converts a non-negative integer into an element of GF(2^n).

\EG :: Converts a non-negative integer into an element of GF(2^@var{n}).

@end table

@table @var

@item return

\JP GF(2^n) $B$N85(B

\JP GF(2^@var{n}) $B$N85(B

\EG element of GF(2^n)

\EG element of GF(2^@var{n})

@item m

\JP $BHsIi@0?t(B

\EG non-negative integer

Line 777 x^10+537*x^9+45*x^8+427*x^7+210*x^6+295*x^5+210*x^4+42

Line 870 x^10+537*x^9+45*x^8+427*x^7+210*x^6+295*x^5+210*x^4+42

\BJP

@item

$B<+A3?t(B @var{m} $B$N(B 2 $B?JI=8=(B @var{m}=@var{m0}+@var{m1}*2+...+@var{mk}*2^k

$B$KBP$7(B, GF(2^n)=GF(2)[t]/(g(t)) $B$N85(B

$B$KBP$7(B, GF(2^@var{n})=GF(2)[t]/(g(t)) $B$N85(B

@var{m0}+@var{m1}*t+...+@var{mk}*t^k mod g(t) $B$rJV$9(B.

@item

$BDj5AB?9`<0$K$h$k>jM>$O<+F0E*$K$O7W;;$5$l$J$$$?$a(B, @code{simp_ff()} $B$r(B

Line 788 x^10+537*x^9+45*x^8+427*x^7+210*x^6+295*x^5+210*x^4+42

Line 881 x^10+537*x^9+45*x^8+427*x^7+210*x^6+295*x^5+210*x^4+42

Let @var{m} be a non-negative integer.

@var{m} has the binary representation

@var{m}=@var{m0}+@var{m1}*2+...+@var{mk}*2^k.

This function returns an element of GF(2^n)=GF(2)[t]/(g(t)),

This function returns an element of GF(2^@var{n}) = GF(2)[t]/(g(t)),

@var{m0}+@var{m1}*t+...+@var{mk}*t^k mod g(t).

@item

Apply @code{simp_ff()} to reduce the result.

Line 817 x^30+x+1

Line 910 x^30+x+1

@table @t

@item gf2nton(@var{m})

\JP :: GF(2^n) $B$N85$r<+A3?t$KJQ49(B

\JP :: GF(2^@var{n}) $B$N85$r<+A3?t$KJQ49(B

\EG :: Converts an element of GF(2^n) into a non-negative integer.

\EG :: Converts an element of GF(2^@var{n}) into a non-negative integer.

@end table

@table @var

Line 826 x^30+x+1

Line 919 x^30+x+1

\JP $BHsIi@0?t(B

\EG non-negative integer

@item m

\JP GF(2^n) $B$N85(B

\JP GF(2^@var{n}) $B$N85(B

\EG element of GF(2^n)

\EG element of GF(2^@var{n})

@end table

@itemize @bullet

Line 862 x^30+x+1

Line 955 x^30+x+1

@table @t

@item ptogf2n(@var{poly})

\JP :: $B0lJQ?tB?9`<0$r(B GF(2^n) $B$N85$KJQ49(B

\JP :: $B0lJQ?tB?9`<0$r(B GF(2^@var{n}) $B$N85$KJQ49(B

\EG :: Converts a univariate polynomial into an element of GF(2^n).

\EG :: Converts a univariate polynomial into an element of GF(2^@var{n}).

@end table

@table @var

@item return

\JP GF(2^n) $B$N85(B

\JP GF(2^@var{n}) $B$N85(B

\EG element of GF(2^n)

\EG element of GF(2^@var{n})

@item poly

\JP $B0lJQ?tB?9`<0(B

\EG univariate polynomial

Line 878 x^30+x+1

Line 971 x^30+x+1

@itemize @bullet

@item

\BJP

@var{poly} $B$NI=$9(B GF(2^n) $B$N85$r@8@.$9$k(B. $B78?t$O(B, 2 $B$G3d$C$?M>$j$K(B

@var{poly} $B$NI=$9(B GF(2^@var{n}) $B$N85$r@8@.$9$k(B. $B78?t$O(B, 2 $B$G3d$C$?M>$j$K(B

$BJQ49$5$l$k(B.

@var{poly} $B$NJQ?t$K(B @code{@@} $B$rBeF~$7$?7k2L$HEy$7$$(B.

\BEG

Generates an element of GF(2^n) represented by @var{poly}.

Generates an element of GF(2^@var{n}) represented by @var{poly}.

The coefficients are reduced modulo 2.

The output is equal to the result by substituting @code{@@} for

the variable of @var{poly}.

Line 910 x^30+x+1

Line 1003 x^30+x+1

@table @t

@item gf2ntop(@var{m}[,@var{v}])

\JP :: GF(2^n) $B$N85$rB?9`<0$KJQ49(B

\JP :: GF(2^@var{n}) $B$N85$rB?9`<0$KJQ49(B

\EG :: Converts an element of GF(2^n) into a polynomial.

\EG :: Converts an element of GF(2^@var{n}) into a polynomial.

@end table

@table @var

Line 919 x^30+x+1

Line 1012 x^30+x+1

\JP $B0lJQ?tB?9`<0(B

\EG univariate polynomial

@item m

\JP GF(2^n) $B$N85(B

\JP GF(2^@var{n}) $B$N85(B

\EG an element of GF(2^n)

\EG an element of GF(2^@var{n})

@item v

\JP $BITDj85(B

\EG indeterminate

Line 963 t^13+t^12+t^11+t^10

Line 1056 t^13+t^12+t^11+t^10

@fref{ptogf2n}

@end table

\JP @node ptosfp sfptop,,, $BM-8BBN$K4X$9$kH!?t$N$^$H$a(B

\EG @node ptosfp sfptop,,, Functions for Finite fields

@subsection @code{ptosfp}, @code{sfptop}

@findex ptosfp

@findex sfptop

@table @t

@item ptosfp(@var{p})

@itemx sfptop(@var{p})

\JP :: $B>.I8?tM-8BBN$X$NJQ49(B, $B5UJQ49(B

\EG :: Transformation to/from a small finite field

@end table

@table @var

@item return

\JP $BB?9`<0(B

\EG polynomial

@item p

\JP $BB?9`<0(B

\EG polynomial

@end table

@itemize @bullet

\BJP

@item

@code{ptosfp()} $B$O(B, $BB?9`<0$N78?t$r(B, $B8=:_@_Dj$5$l$F$$$k>.I8?tM-8BBN(B

GF(p^@var{n}) $B$N85$KD>@\JQ49$9$k(B. $B78?t$,4{$KM-8BBN$N85$N>l9g$OJQ2=$7$J$$(B.

$B@5@0?t$N>l9g(B, $B$^$:0L?t$G>jM>$r7W;;$7$?$"$H(B, $BI8?t(B @var{p} $B$K$h$j(B @var{p}

$B?JE83+$7(B, @var{p} $B$r(B x $B$KCV$-49$($?B?9`<0$r(B, $B86;O85I=8=$KJQ49$9$k(B.

$BNc$($P(B, GF(3^5) $B$O(B GF(3)[x]/(x^5+2*x+1) $B$H$7$FI=8=$5$l(B, $B$=$N3F(B

$B85$O86;O85(B x $B$K4X$9$k$Y$-;X?t(B @var{k} $B$K$h$j(B @var{@@_k} $B$H$7$F(B

$BI=<($5$l$k(B. $B$3$N$H$-(B, $BNc$($P(B @var{23 = 2*3^2+3+2} $B$O(B, 2*x^2+x+2

$B$HI=8=$5$l(B, $B$3$l$O7k6I(B x^17 $B$HK!(B x^5+2*x+1 $B$GEy$7$$$N$G(B,

@var{@@_17} $B$HJQ49$5$l$k(B.

@item

@code{sfptop()} $B$O(B @code{ptosfp()} $B$N5UJQ49$G$"$k(B.

\BEG

@item

@code{ptosfp()} converts coefficients of a polynomial to

elements in a small finite field GF(@var{p^n}) set as a ground field.

If a coefficient is already an element of the field,

no conversion is done. If a coefficient is a positive integer,

then its residue modulo @var{p^n} is expanded as @var{p}-adic integer,

then @var{p} is substituted by @var{x}, finally the polynomial

is converted to its correspoding logarithmic representation

with respect to the primitive element.

For example, GF(3^5) is represented as F(3)[@var{x}]/(@var{x^5+2*x+1}),

and each element of the field is represented as @var{@@_k}

by its exponent @var{k} with respect to the primitive element @var{x}.

@var{23 = 2*3^2+3+2} is represented as @var{2*x^2+x+2} and

it is equivalent to @var{x^17} modulo @var{x^5+2*x+1}.

Therefore an integer @var{23} is conterted to @var{@@_17}.

@item

@code{sfptop()} is the inverse of @code{ptosfp()}.

@end itemize

@example

[196] setmod_ff(3,5);

[3,x^5+2*x+1,x]

[197] A = ptosfp(23);

@@_17

[198] 9*2+3+2;

[199] x^17-(2*x^2+x+2);

x^17-2*x^2-x-2

[200] sremm(@@,x^5+2*x+1,3);

[201] sfptop(A);

@end example

@table @t

\JP @item $B;2>H(B

\EG @item References

@fref{setmod_ff}, @fref{simp_ff}

@end table

\JP @node defpoly_mod2,,, $BM-8BBN$K4X$9$kH!?t$N$^$H$a(B

\EG @node defpoly_mod2,,, Functions for Finite fields

@subsection @code{defpoly_mod2}

Line 1020 Then fix @var{m3} as small as possible.

Line 1191 Then fix @var{m3} as small as possible.

@fref{setmod_ff}

@end table

\JP @node sffctr,,, $BM-8BBN$K4X$9$kH!?t$N$^$H$a(B

\EG @node sffctr,,, Functions for Finite fields

@subsection @code{sffctr}

@findex sffctr

@table @t

@item sffctr(@var{poly})

\JP :: $BB?9`<0$N>.I8?tM-8BBN>e$G$N4{LsJ,2r(B

\EG :: Irreducible factorization over a small finite field.

@end table

@table @var

@item return

\JP $B%j%9%H(B

\EG list

@item poly

\JP $BM-8BBN>e$N(B $BB?9`<0(B

\EG polynomial over a finite field

@end table

@itemize @bullet

\BJP

@item

$BB?9`<0$r(B, $B8=:_@_Dj$5$l$F$$$k>.I8?tM-8BBN>e$G4{LsJ,2r$9$k(B.

@item

$B7k2L$O(B, [[@var{f1},@var{m1}],[@var{f2},@var{m2}],...] $B$J$k(B

$B%j%9%H$G$"$k(B. $B$3$3$G(B, @var{fi} $B$O(B monic $B$J4{Ls0x;R(B, @var{mi} $B$O$=$N(B

$B=EJ#EY$G$"$k(B.

\BEG

@item

Factorize @var{poly} into irreducible factors over

a small finite field currently set.

@item

The result is a list [[@var{f1},@var{m1}],[@var{f2},@var{m2}],...],

where @var{fi} is a monic irreducible factor and @var{mi} is its

multiplicity.

@end itemize

[0] setmod_ff(2,10);

[2,x^10+x^3+1,x]

[1] sffctr((z*y^3+z*y)*x^3+(y^5+y^3+z*y^2+z)*x^2+z^11*y*x+z^10*y^3+z^11);

[[@@_0,1],[@@_0*z*y*x+@@_0*y^3+@@_0*z,1],[(@@_0*y+@@_0)*x+@@_0*z^5,2]]

@example

@end example

@table @t

\JP @item $B;2>H(B

\EG @item References

@fref{setmod_ff},

@fref{modfctr}

@end table

\JP @node fctr_ff,,, $BM-8BBN$K4X$9$kH!?t$N$^$H$a(B

\EG @node fctr_ff,,, Functions for Finite fields

@subsection @code{fctr_ff}

Line 1209 The coefficients are generated by @code{random_ff()}.

Line 1434 The coefficients are generated by @code{random_ff()}.

@item return

\JP $B%Y%/%H%k$^$?$O(B 0

\EG vector or 0

@item p1,p2

@item p1 p2

\JP $BD9$5(B 3 $B$N%Y%/%H%k$^$?$O(B 0

\EG vector of length 3 or 0

@item ec

Line 1224 The coefficients are generated by @code{random_ff()}.

Line 1449 The coefficients are generated by @code{random_ff()}.

$BE@(B @var{p1}, @var{p2} $B$NOB(B @var{p1+p2}, $B:9(B @var{p1-p2}, $B5U85(B @var{-p1} $B$rJV$9(B.

@item

@var{ec} $B$O(B, $B@_Dj$5$l$F$$$kM-8BBN$,4qI8?tAGBN$N>l9g(B,

@var{y^2=x^3+ec[0]x+ec[1]}, $BI8?t(B 2 $B$N>l9g(B @var{y^2+xy=x^3+ec[0]x^2+ec[1]}

y^2=x^3+ec[0]x+ec[1], $BI8?t(B 2 $B$N>l9g(B y^2+xy=x^3+ec[0]x^2+ec[1]

$B$rI=$9(B.

@item

$B0z?t(B, $B7k2L$H$b$K(B, $BL58B1sE@$O(B 0 $B$GI=$5$l$k(B.

Line 1247 and ecm_chsgn_ff(@var{p1}) returns

Line 1472 and ecm_chsgn_ff(@var{p1}) returns

@var{p1+p2}, @var{p1-p2} and @var{-p1} respectively.

@item

If the current base field is a prime field of odd order, then

@var{ec} represents @var{y^2=x^3+ec[0]x+ec[1]}.

@var{ec} represents y^2=x^3+ec[0]x+ec[1].

If the characteristic of the current base field is 2,

then @var{ec} represents @var{y^2+xy=x^3+ec[0]x^2+ec[1]}.

then @var{ec} represents y^2+xy=x^3+ec[0]x^2+ec[1].

@item

The point at infinity is represented by 0.

@item

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