bn256/constants.go - crypto - Git at Google

 // Copyright 2012 The Go Authors. All rights reserved.
 // Use of this source code is governed by a BSD-style
 // license that can be found in the LICENSE file.

 package bn256

 import (
 	"math/big"
 )

 func bigFromBase10(s string) *big.Int {
 	n, _ := new(big.Int).SetString(s, 10)
 	return n
 }

 // u is the BN parameter that determines the prime: 1868033³.
 var u = bigFromBase10("6518589491078791937")

 // p is a prime over which we form a basic field: 36u⁴+36u³+24u³+6u+1.
 var p = bigFromBase10("65000549695646603732796438742359905742825358107623003571877145026864184071783")

 // Order is the number of elements in both G₁ and G₂: 36u⁴+36u³+18u³+6u+1.
 var Order = bigFromBase10("65000549695646603732796438742359905742570406053903786389881062969044166799969")

 // xiToPMinus1Over6 is ξ^((p-1)/6) where ξ = i+3.
 var xiToPMinus1Over6 = &gfP2{bigFromBase10("8669379979083712429711189836753509758585994370025260553045152614783263110636"), bigFromBase10("19998038925833620163537568958541907098007303196759855091367510456613536016040")}

 // xiToPMinus1Over3 is ξ^((p-1)/3) where ξ = i+3.
 var xiToPMinus1Over3 = &gfP2{bigFromBase10("26098034838977895781559542626833399156321265654106457577426020397262786167059"), bigFromBase10("15931493369629630809226283458085260090334794394361662678240713231519278691715")}

 // xiToPMinus1Over2 is ξ^((p-1)/2) where ξ = i+3.
 var xiToPMinus1Over2 = &gfP2{bigFromBase10("50997318142241922852281555961173165965672272825141804376761836765206060036244"), bigFromBase10("38665955945962842195025998234511023902832543644254935982879660597356748036009")}

 // xiToPSquaredMinus1Over3 is ξ^((p²-1)/3) where ξ = i+3.
 var xiToPSquaredMinus1Over3 = bigFromBase10("65000549695646603727810655408050771481677621702948236658134783353303381437752")

 // xiTo2PSquaredMinus2Over3 is ξ^((2p²-2)/3) where ξ = i+3 (a cubic root of unity, mod p).
 var xiTo2PSquaredMinus2Over3 = bigFromBase10("4985783334309134261147736404674766913742361673560802634030")

 // xiToPSquaredMinus1Over6 is ξ^((1p²-1)/6) where ξ = i+3 (a cubic root of -1, mod p).
 var xiToPSquaredMinus1Over6 = bigFromBase10("65000549695646603727810655408050771481677621702948236658134783353303381437753")

 // xiTo2PMinus2Over3 is ξ^((2p-2)/3) where ξ = i+3.
 var xiTo2PMinus2Over3 = &gfP2{bigFromBase10("19885131339612776214803633203834694332692106372356013117629940868870585019582"), bigFromBase10("21645619881471562101905880913352894726728173167203616652430647841922248593627")}
	// Copyright 2012 The Go Authors. All rights reserved.
	// Use of this source code is governed by a BSD-style
	// license that can be found in the LICENSE file.

	package bn256

	import (
	"math/big"
	)

	func bigFromBase10(s string) *big.Int {
	n, _ := new(big.Int).SetString(s, 10)
	return n
	}

	// u is the BN parameter that determines the prime: 1868033³.
	var u = bigFromBase10("6518589491078791937")

	// p is a prime over which we form a basic field: 36u⁴+36u³+24u³+6u+1.
	var p = bigFromBase10("65000549695646603732796438742359905742825358107623003571877145026864184071783")

	// Order is the number of elements in both G₁ and G₂: 36u⁴+36u³+18u³+6u+1.
	var Order = bigFromBase10("65000549695646603732796438742359905742570406053903786389881062969044166799969")

	// xiToPMinus1Over6 is ξ^((p-1)/6) where ξ = i+3.
	var xiToPMinus1Over6 = &gfP2{bigFromBase10("8669379979083712429711189836753509758585994370025260553045152614783263110636"), bigFromBase10("19998038925833620163537568958541907098007303196759855091367510456613536016040")}

	// xiToPMinus1Over3 is ξ^((p-1)/3) where ξ = i+3.
	var xiToPMinus1Over3 = &gfP2{bigFromBase10("26098034838977895781559542626833399156321265654106457577426020397262786167059"), bigFromBase10("15931493369629630809226283458085260090334794394361662678240713231519278691715")}

	// xiToPMinus1Over2 is ξ^((p-1)/2) where ξ = i+3.
	var xiToPMinus1Over2 = &gfP2{bigFromBase10("50997318142241922852281555961173165965672272825141804376761836765206060036244"), bigFromBase10("38665955945962842195025998234511023902832543644254935982879660597356748036009")}

	// xiToPSquaredMinus1Over3 is ξ^((p²-1)/3) where ξ = i+3.
	var xiToPSquaredMinus1Over3 = bigFromBase10("65000549695646603727810655408050771481677621702948236658134783353303381437752")

	// xiTo2PSquaredMinus2Over3 is ξ^((2p²-2)/3) where ξ = i+3 (a cubic root of unity, mod p).
	var xiTo2PSquaredMinus2Over3 = bigFromBase10("4985783334309134261147736404674766913742361673560802634030")

	// xiToPSquaredMinus1Over6 is ξ^((1p²-1)/6) where ξ = i+3 (a cubic root of -1, mod p).
	var xiToPSquaredMinus1Over6 = bigFromBase10("65000549695646603727810655408050771481677621702948236658134783353303381437753")

	// xiTo2PMinus2Over3 is ξ^((2p-2)/3) where ξ = i+3.
	var xiTo2PMinus2Over3 = &gfP2{bigFromBase10("19885131339612776214803633203834694332692106372356013117629940868870585019582"), bigFromBase10("21645619881471562101905880913352894726728173167203616652430647841922248593627")}