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70 lines
1.5 KiB
Go
70 lines
1.5 KiB
Go
package ring
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type Dimensions struct {
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Rows, Cols int
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}
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// EvalPolyModP evaluates y = sum poly[i] * x^{i} mod p.
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func EvalPolyModP(x uint64, poly []uint64, p uint64) (y uint64) {
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brc := GenBRedConstant(p)
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y = poly[len(poly)-1]
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for i := len(poly) - 2; i >= 0; i-- {
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y = BRed(y, x, p, brc)
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y = CRed(y+poly[i], p)
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}
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return
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}
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// Min returns the minimum between to int
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func Min(x, y int) int {
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if x > y {
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return y
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}
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return x
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}
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// ModExp performs the modular exponentiation x^e mod p,
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// x and p are required to be at most 64 bits to avoid an overflow.
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func ModExp(x, e, p uint64) (result uint64) {
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brc := GenBRedConstant(p)
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result = 1
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for i := e; i > 0; i >>= 1 {
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if i&1 == 1 {
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result = BRed(result, x, p, brc)
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}
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x = BRed(x, x, p, brc)
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}
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return result
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}
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// ModExpPow2 performs the modular exponentiation x^e mod p, where p is a power of two,
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// x and p are required to be at most 64 bits to avoid an overflow.
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func ModExpPow2(x, e, p uint64) (result uint64) {
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result = 1
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for i := e; i > 0; i >>= 1 {
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if i&1 == 1 {
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result *= x
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}
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x *= x
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}
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return result & (p - 1)
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}
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// ModexpMontgomery performs the modular exponentiation x^e mod p,
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// where x is in Montgomery form, and returns x^e in Montgomery form.
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func ModexpMontgomery(x uint64, e int, q, mredconstant uint64, bredconstant [2]uint64) (result uint64) {
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result = MForm(1, q, bredconstant)
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for i := e; i > 0; i >>= 1 {
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if i&1 == 1 {
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result = MRed(result, x, q, mredconstant)
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}
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x = MRed(x, x, q, mredconstant)
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}
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return result
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}
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