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Updated sm2_z256_loong64.S 代码分析 (markdown)

Sun Yimin 2025-10-09 11:08:13 +08:00
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sm2_z256_loong64.S-代码分析.md

@ -81,3 +81,6 @@ $T_3=T + T_2=(t_4+t_0-t_0>>32) \ast 2^{256}+(t_3 - t_0<<32) \ast 2^{192} + (t_2
## __sm2_z256_modp_mont_sqr ## __sm2_z256_modp_mont_sqr
计算 `(t0, t1, t2, t3) = (t0, t1, t2, t3)^2` 计算 `(t0, t1, t2, t3) = (t0, t1, t2, t3)^2`
**总体实现思路**
1. 先完整计算出平方结果用8个64位字表示算完后再进行蒙哥马利约简计算。
1. 最后,依然使用加`1`来实现`mod P`,这里的`1`为 $2^{256} - P$ 。