/* -*-c-*-
*
- * $Id: f-prime.c,v 1.3.4.1 2003/06/10 13:43:53 mdw Exp $
+ * $Id: f-prime.c,v 1.3.4.3 2004/03/21 22:39:46 mdw Exp $
*
* Prime fields with Montgomery arithmetic
*
/*----- Revision history --------------------------------------------------*
*
* $Log: f-prime.c,v $
+ * Revision 1.3.4.3 2004/03/21 22:39:46 mdw
+ * Elliptic curves on binary fields work.
+ *
+ * Revision 1.3.4.2 2004/03/20 00:13:31 mdw
+ * Projective coordinates for prime curves
+ *
* Revision 1.3.4.1 2003/06/10 13:43:53 mdw
* Simple (non-projective) curves over prime fields now seem to work.
*
return (mpmont_reduce(&f->mm, d, x));
}
+static int fzerop(field *ff, mp *x)
+{
+ return (!MP_LEN(x));
+}
+
static mp *fneg(field *ff, mp *d, mp *x)
{
fctx *f = (fctx *)ff;
return (d);
}
+static mp *fsqrt(field *ff, mp *d, mp *x)
+{
+ fctx *f = (fctx *)ff;
+ d = mpmont_reduce(&f->mm, d, x);
+ d = mp_modsqrt(d, d, f->mm.m);
+ if (!d)
+ return (d);
+ return (mpmont_mul(&f->mm, d, d, f->mm.r2));
+}
+
static mp *fdbl(field *ff, mp *d, mp *x)
{
fctx *f = (fctx *)ff;
return (d);
}
-static mp *fsqrt(field *ff, mp *d, mp *x)
+static mp *fqdl(field *ff, mp *d, mp *x)
{
fctx *f = (fctx *)ff;
- d = mpmont_reduce(&f->mm, d, x);
- d = mp_modsqrt(d, d, f->mm.m);
- return (mpmont_mul(&f->mm, d, d, f->mm.r2));
+ d = mp_lsl(d, x, 2);
+ while (MP_CMP(d, >, f->mm.m))
+ d = mp_sub(d, d, f->mm.m);
+ return (d);
+}
+
+static mp *fhlv(field *ff, mp *d, mp *x)
+{
+ fctx *f = (fctx *)ff;
+ if (!MP_LEN(x)) {
+ MP_COPY(x);
+ MP_DROP(d);
+ return (x);
+ }
+ if (x->v[0] & 1) {
+ d = mp_add(d, x, f->mm.m);
+ x = d;
+ }
+ return (mp_lsr(d, x, 1));
}
/* --- Field operations table --- */
static field_ops fops = {
fdestroy,
fin, fout,
- fneg, fadd, fsub, fmul, fsqr, finv, freduce,
- fdbl, ftpl, fsqrt
+ fzerop, fneg, fadd, fsub, fmul, fsqr, finv, freduce, fsqrt,
+ 0,
+ fdbl, ftpl, fqdl, fhlv
};
/* --- @field_prime@ --- *