### The idea for this macro came from the AC_C_COMPILE_VALUE macro by
### Ilguiz Latypov; this implementation has a number of advantages:
###
-### * it has an immense range of representable values, notably including
-### negative numbers; and
+### * it has an immense range of representable values, notably including
+### negative numbers; and
###
-### * it returns the value directly in a shell variable rather than
-### inventing an AC_DEFINE for it.
+### * it returns the value directly in a shell variable rather than
+### inventing an AC_DEFINE for it.
###
### LICENSE
###
MDW__DIGIT(1000000000, d), \\
MDW__DIGIT( 100000000, d), \\
MDW__DIGIT( 10000000, d), \\
- MDW__DIGIT( 1000000, d), \\
- MDW__DIGIT( 100000, d), \\
- MDW__DIGIT( 10000, d), \\
- MDW__DIGIT( 1000, d), \\
- MDW__DIGIT( 100, d), \\
- MDW__DIGIT( 10, d)
+ MDW__DIGIT( 1000000, d), \\
+ MDW__DIGIT( 100000, d), \\
+ MDW__DIGIT( 10000, d), \\
+ MDW__DIGIT( 1000, d), \\
+ MDW__DIGIT( 100, d), \\
+ MDW__DIGIT( 10, d)
/* Increasingly huge divisions. PN divides by 10^(9*2^N). */
#define MDW__P0 /MDW__G
*
* 2. For each divisor %$d$% of %$r - 1$% less than %$B$% (which we can
* construct using this factorization), make sure that
- * %$p^d \not\equiv 1 \pmod{r}$%.
+ * %$p^d \not\equiv 1 \pmod{r}$%.
*
* This takes a little while but not ever-so long.
*
* References:
*
* [Hitt] L. Hitt, On an improved definition of embedding degree;
- * http://eprint.iacr.org/2006/415
+ * http://eprint.iacr.org/2006/415
*
* [P1363] IEEE 1363-2000: Standard Specifications for Public Key
- * Cryptography; http://grouper.ieee.org/groups/1363/P1363/index.html
+ * Cryptography; http://grouper.ieee.org/groups/1363/P1363/index.html
*
* [SEC1] SEC 1: Elliptic Curve Cryptography;
- * http://www.secg.org/download/aid-385/sec1_final.pdf
+ * http://www.secg.org/download/aid-385/sec1_final.pdf
*/
/* --- @movcheck@ --- *
r 0x0fffffffffffffffffffffffeeb354b7270b2992b7818627
h 8
gx 0x2a16910e8f6c4b199be24213857abc9c992edfb2471f3c68
- gy 0x1592dbfebeb81a7c071b744d5e2f9e242ea65b81138a3468
+ gy 0x1592dbfebeb81a7c071b744d5e2f9e242ea65b81138a3468
curve ansi-c2tnb239v1 binpoly
p 0x800000000000000000000000000000000000000000000000001000000001