You can not select more than 25 topics
Topics must start with a letter or number, can include dashes ('-') and can be up to 35 characters long.
656 lines
17 KiB
656 lines
17 KiB
// AMD-ID "dojox/math/BigInteger-ext" |
|
define(["dojo", "dojox", "dojox/math/BigInteger"], function(dojo, dojox) { |
|
dojo.experimental("dojox.math.BigInteger-ext"); |
|
|
|
// Contributed under CLA by Tom Wu |
|
|
|
// Extended JavaScript BN functions, required for RSA private ops. |
|
var BigInteger = dojox.math.BigInteger, |
|
nbi = BigInteger._nbi, nbv = BigInteger._nbv, |
|
nbits = BigInteger._nbits, |
|
Montgomery = BigInteger._Montgomery; |
|
|
|
// (public) |
|
function bnClone() { var r = nbi(); this._copyTo(r); return r; } |
|
|
|
// (public) return value as integer |
|
function bnIntValue() { |
|
if(this.s < 0) { |
|
if(this.t == 1) return this[0]-this._DV; |
|
else if(this.t == 0) return -1; |
|
} |
|
else if(this.t == 1) return this[0]; |
|
else if(this.t == 0) return 0; |
|
// assumes 16 < DB < 32 |
|
return ((this[1]&((1<<(32-this._DB))-1))<<this._DB)|this[0]; |
|
} |
|
|
|
// (public) return value as byte |
|
function bnByteValue() { return (this.t==0)?this.s:(this[0]<<24)>>24; } |
|
|
|
// (public) return value as short (assumes DB>=16) |
|
function bnShortValue() { return (this.t==0)?this.s:(this[0]<<16)>>16; } |
|
|
|
// (protected) return x s.t. r^x < DV |
|
function bnpChunkSize(r) { return Math.floor(Math.LN2*this._DB/Math.log(r)); } |
|
|
|
// (public) 0 if this == 0, 1 if this > 0 |
|
function bnSigNum() { |
|
if(this.s < 0) return -1; |
|
else if(this.t <= 0 || (this.t == 1 && this[0] <= 0)) return 0; |
|
else return 1; |
|
} |
|
|
|
// (protected) convert to radix string |
|
function bnpToRadix(b) { |
|
if(b == null) b = 10; |
|
if(this.signum() == 0 || b < 2 || b > 36) return "0"; |
|
var cs = this._chunkSize(b); |
|
var a = Math.pow(b,cs); |
|
var d = nbv(a), y = nbi(), z = nbi(), r = ""; |
|
this._divRemTo(d,y,z); |
|
while(y.signum() > 0) { |
|
r = (a+z.intValue()).toString(b).substr(1) + r; |
|
y._divRemTo(d,y,z); |
|
} |
|
return z.intValue().toString(b) + r; |
|
} |
|
|
|
// (protected) convert from radix string |
|
function bnpFromRadix(s,b) { |
|
this._fromInt(0); |
|
if(b == null) b = 10; |
|
var cs = this._chunkSize(b); |
|
var d = Math.pow(b,cs), mi = false, j = 0, w = 0; |
|
for(var i = 0; i < s.length; ++i) { |
|
var x = this._intAt(s,i); |
|
if(x < 0) { |
|
if(s.charAt(i) == "-" && this.signum() == 0) mi = true; |
|
continue; |
|
} |
|
w = b*w+x; |
|
if(++j >= cs) { |
|
this._dMultiply(d); |
|
this._dAddOffset(w,0); |
|
j = 0; |
|
w = 0; |
|
} |
|
} |
|
if(j > 0) { |
|
this._dMultiply(Math.pow(b,j)); |
|
this._dAddOffset(w,0); |
|
} |
|
if(mi) BigInteger.ZERO._subTo(this,this); |
|
} |
|
|
|
// (protected) alternate constructor |
|
function bnpFromNumber(a,b,c) { |
|
if("number" == typeof b) { |
|
// new BigInteger(int,int,RNG) |
|
if(a < 2) this._fromInt(1); |
|
else { |
|
this._fromNumber(a,c); |
|
if(!this.testBit(a-1)) // force MSB set |
|
this._bitwiseTo(BigInteger.ONE.shiftLeft(a-1),op_or,this); |
|
if(this._isEven()) this._dAddOffset(1,0); // force odd |
|
while(!this.isProbablePrime(b)) { |
|
this._dAddOffset(2,0); |
|
if(this.bitLength() > a) this._subTo(BigInteger.ONE.shiftLeft(a-1),this); |
|
} |
|
} |
|
} |
|
else { |
|
// new BigInteger(int,RNG) |
|
var x = [], t = a&7; |
|
x.length = (a>>3)+1; |
|
b.nextBytes(x); |
|
if(t > 0) x[0] &= ((1<<t)-1); else x[0] = 0; |
|
this._fromString(x,256); |
|
} |
|
} |
|
|
|
// (public) convert to bigendian byte array |
|
function bnToByteArray() { |
|
var i = this.t, r = []; |
|
r[0] = this.s; |
|
var p = this._DB-(i*this._DB)%8, d, k = 0; |
|
if(i-- > 0) { |
|
if(p < this._DB && (d = this[i]>>p) != (this.s&this._DM)>>p) |
|
r[k++] = d|(this.s<<(this._DB-p)); |
|
while(i >= 0) { |
|
if(p < 8) { |
|
d = (this[i]&((1<<p)-1))<<(8-p); |
|
d |= this[--i]>>(p+=this._DB-8); |
|
} |
|
else { |
|
d = (this[i]>>(p-=8))&0xff; |
|
if(p <= 0) { p += this._DB; --i; } |
|
} |
|
if((d&0x80) != 0) d |= -256; |
|
if(k == 0 && (this.s&0x80) != (d&0x80)) ++k; |
|
if(k > 0 || d != this.s) r[k++] = d; |
|
} |
|
} |
|
return r; |
|
} |
|
|
|
function bnEquals(a) { return(this.compareTo(a)==0); } |
|
function bnMin(a) { return(this.compareTo(a)<0)?this:a; } |
|
function bnMax(a) { return(this.compareTo(a)>0)?this:a; } |
|
|
|
// (protected) r = this op a (bitwise) |
|
function bnpBitwiseTo(a,op,r) { |
|
var i, f, m = Math.min(a.t,this.t); |
|
for(i = 0; i < m; ++i) r[i] = op(this[i],a[i]); |
|
if(a.t < this.t) { |
|
f = a.s&this._DM; |
|
for(i = m; i < this.t; ++i) r[i] = op(this[i],f); |
|
r.t = this.t; |
|
} |
|
else { |
|
f = this.s&this._DM; |
|
for(i = m; i < a.t; ++i) r[i] = op(f,a[i]); |
|
r.t = a.t; |
|
} |
|
r.s = op(this.s,a.s); |
|
r._clamp(); |
|
} |
|
|
|
// (public) this & a |
|
function op_and(x,y) { return x&y; } |
|
function bnAnd(a) { var r = nbi(); this._bitwiseTo(a,op_and,r); return r; } |
|
|
|
// (public) this | a |
|
function op_or(x,y) { return x|y; } |
|
function bnOr(a) { var r = nbi(); this._bitwiseTo(a,op_or,r); return r; } |
|
|
|
// (public) this ^ a |
|
function op_xor(x,y) { return x^y; } |
|
function bnXor(a) { var r = nbi(); this._bitwiseTo(a,op_xor,r); return r; } |
|
|
|
// (public) this & ~a |
|
function op_andnot(x,y) { return x&~y; } |
|
function bnAndNot(a) { var r = nbi(); this._bitwiseTo(a,op_andnot,r); return r; } |
|
|
|
// (public) ~this |
|
function bnNot() { |
|
var r = nbi(); |
|
for(var i = 0; i < this.t; ++i) r[i] = this._DM&~this[i]; |
|
r.t = this.t; |
|
r.s = ~this.s; |
|
return r; |
|
} |
|
|
|
// (public) this << n |
|
function bnShiftLeft(n) { |
|
var r = nbi(); |
|
if(n < 0) this._rShiftTo(-n,r); else this._lShiftTo(n,r); |
|
return r; |
|
} |
|
|
|
// (public) this >> n |
|
function bnShiftRight(n) { |
|
var r = nbi(); |
|
if(n < 0) this._lShiftTo(-n,r); else this._rShiftTo(n,r); |
|
return r; |
|
} |
|
|
|
// return index of lowest 1-bit in x, x < 2^31 |
|
function lbit(x) { |
|
if(x == 0) return -1; |
|
var r = 0; |
|
if((x&0xffff) == 0) { x >>= 16; r += 16; } |
|
if((x&0xff) == 0) { x >>= 8; r += 8; } |
|
if((x&0xf) == 0) { x >>= 4; r += 4; } |
|
if((x&3) == 0) { x >>= 2; r += 2; } |
|
if((x&1) == 0) ++r; |
|
return r; |
|
} |
|
|
|
// (public) returns index of lowest 1-bit (or -1 if none) |
|
function bnGetLowestSetBit() { |
|
for(var i = 0; i < this.t; ++i) |
|
if(this[i] != 0) return i*this._DB+lbit(this[i]); |
|
if(this.s < 0) return this.t*this._DB; |
|
return -1; |
|
} |
|
|
|
// return number of 1 bits in x |
|
function cbit(x) { |
|
var r = 0; |
|
while(x != 0) { x &= x-1; ++r; } |
|
return r; |
|
} |
|
|
|
// (public) return number of set bits |
|
function bnBitCount() { |
|
var r = 0, x = this.s&this._DM; |
|
for(var i = 0; i < this.t; ++i) r += cbit(this[i]^x); |
|
return r; |
|
} |
|
|
|
// (public) true iff nth bit is set |
|
function bnTestBit(n) { |
|
var j = Math.floor(n/this._DB); |
|
if(j >= this.t) return(this.s!=0); |
|
return((this[j]&(1<<(n%this._DB)))!=0); |
|
} |
|
|
|
// (protected) this op (1<<n) |
|
function bnpChangeBit(n,op) { |
|
var r = BigInteger.ONE.shiftLeft(n); |
|
this._bitwiseTo(r,op,r); |
|
return r; |
|
} |
|
|
|
// (public) this | (1<<n) |
|
function bnSetBit(n) { return this._changeBit(n,op_or); } |
|
|
|
// (public) this & ~(1<<n) |
|
function bnClearBit(n) { return this._changeBit(n,op_andnot); } |
|
|
|
// (public) this ^ (1<<n) |
|
function bnFlipBit(n) { return this._changeBit(n,op_xor); } |
|
|
|
// (protected) r = this + a |
|
function bnpAddTo(a,r) { |
|
var i = 0, c = 0, m = Math.min(a.t,this.t); |
|
while(i < m) { |
|
c += this[i]+a[i]; |
|
r[i++] = c&this._DM; |
|
c >>= this._DB; |
|
} |
|
if(a.t < this.t) { |
|
c += a.s; |
|
while(i < this.t) { |
|
c += this[i]; |
|
r[i++] = c&this._DM; |
|
c >>= this._DB; |
|
} |
|
c += this.s; |
|
} |
|
else { |
|
c += this.s; |
|
while(i < a.t) { |
|
c += a[i]; |
|
r[i++] = c&this._DM; |
|
c >>= this._DB; |
|
} |
|
c += a.s; |
|
} |
|
r.s = (c<0)?-1:0; |
|
if(c > 0) r[i++] = c; |
|
else if(c < -1) r[i++] = this._DV+c; |
|
r.t = i; |
|
r._clamp(); |
|
} |
|
|
|
// (public) this + a |
|
function bnAdd(a) { var r = nbi(); this._addTo(a,r); return r; } |
|
|
|
// (public) this - a |
|
function bnSubtract(a) { var r = nbi(); this._subTo(a,r); return r; } |
|
|
|
// (public) this * a |
|
function bnMultiply(a) { var r = nbi(); this._multiplyTo(a,r); return r; } |
|
|
|
// (public) this / a |
|
function bnDivide(a) { var r = nbi(); this._divRemTo(a,r,null); return r; } |
|
|
|
// (public) this % a |
|
function bnRemainder(a) { var r = nbi(); this._divRemTo(a,null,r); return r; } |
|
|
|
// (public) [this/a,this%a] |
|
function bnDivideAndRemainder(a) { |
|
var q = nbi(), r = nbi(); |
|
this._divRemTo(a,q,r); |
|
return [q, r]; |
|
} |
|
|
|
// (protected) this *= n, this >= 0, 1 < n < DV |
|
function bnpDMultiply(n) { |
|
this[this.t] = this.am(0,n-1,this,0,0,this.t); |
|
++this.t; |
|
this._clamp(); |
|
} |
|
|
|
// (protected) this += n << w words, this >= 0 |
|
function bnpDAddOffset(n,w) { |
|
while(this.t <= w) this[this.t++] = 0; |
|
this[w] += n; |
|
while(this[w] >= this._DV) { |
|
this[w] -= this._DV; |
|
if(++w >= this.t) this[this.t++] = 0; |
|
++this[w]; |
|
} |
|
} |
|
|
|
// A "null" reducer |
|
function NullExp() {} |
|
function nNop(x) { return x; } |
|
function nMulTo(x,y,r) { x._multiplyTo(y,r); } |
|
function nSqrTo(x,r) { x._squareTo(r); } |
|
|
|
NullExp.prototype.convert = nNop; |
|
NullExp.prototype.revert = nNop; |
|
NullExp.prototype.mulTo = nMulTo; |
|
NullExp.prototype.sqrTo = nSqrTo; |
|
|
|
// (public) this^e |
|
function bnPow(e) { return this._exp(e,new NullExp()); } |
|
|
|
// (protected) r = lower n words of "this * a", a.t <= n |
|
// "this" should be the larger one if appropriate. |
|
function bnpMultiplyLowerTo(a,n,r) { |
|
var i = Math.min(this.t+a.t,n); |
|
r.s = 0; // assumes a,this >= 0 |
|
r.t = i; |
|
while(i > 0) r[--i] = 0; |
|
var j; |
|
for(j = r.t-this.t; i < j; ++i) r[i+this.t] = this.am(0,a[i],r,i,0,this.t); |
|
for(j = Math.min(a.t,n); i < j; ++i) this.am(0,a[i],r,i,0,n-i); |
|
r._clamp(); |
|
} |
|
|
|
// (protected) r = "this * a" without lower n words, n > 0 |
|
// "this" should be the larger one if appropriate. |
|
function bnpMultiplyUpperTo(a,n,r) { |
|
--n; |
|
var i = r.t = this.t+a.t-n; |
|
r.s = 0; // assumes a,this >= 0 |
|
while(--i >= 0) r[i] = 0; |
|
for(i = Math.max(n-this.t,0); i < a.t; ++i) |
|
r[this.t+i-n] = this.am(n-i,a[i],r,0,0,this.t+i-n); |
|
r._clamp(); |
|
r._drShiftTo(1,r); |
|
} |
|
|
|
// Barrett modular reduction |
|
function Barrett(m) { |
|
// setup Barrett |
|
this.r2 = nbi(); |
|
this.q3 = nbi(); |
|
BigInteger.ONE._dlShiftTo(2*m.t,this.r2); |
|
this.mu = this.r2.divide(m); |
|
this.m = m; |
|
} |
|
|
|
function barrettConvert(x) { |
|
if(x.s < 0 || x.t > 2*this.m.t) return x.mod(this.m); |
|
else if(x.compareTo(this.m) < 0) return x; |
|
else { var r = nbi(); x._copyTo(r); this.reduce(r); return r; } |
|
} |
|
|
|
function barrettRevert(x) { return x; } |
|
|
|
// x = x mod m (HAC 14.42) |
|
function barrettReduce(x) { |
|
x._drShiftTo(this.m.t-1,this.r2); |
|
if(x.t > this.m.t+1) { x.t = this.m.t+1; x._clamp(); } |
|
this.mu._multiplyUpperTo(this.r2,this.m.t+1,this.q3); |
|
this.m._multiplyLowerTo(this.q3,this.m.t+1,this.r2); |
|
while(x.compareTo(this.r2) < 0) x._dAddOffset(1,this.m.t+1); |
|
x._subTo(this.r2,x); |
|
while(x.compareTo(this.m) >= 0) x._subTo(this.m,x); |
|
} |
|
|
|
// r = x^2 mod m; x != r |
|
function barrettSqrTo(x,r) { x._squareTo(r); this.reduce(r); } |
|
|
|
// r = x*y mod m; x,y != r |
|
function barrettMulTo(x,y,r) { x._multiplyTo(y,r); this.reduce(r); } |
|
|
|
Barrett.prototype.convert = barrettConvert; |
|
Barrett.prototype.revert = barrettRevert; |
|
Barrett.prototype.reduce = barrettReduce; |
|
Barrett.prototype.mulTo = barrettMulTo; |
|
Barrett.prototype.sqrTo = barrettSqrTo; |
|
|
|
// (public) this^e % m (HAC 14.85) |
|
function bnModPow(e,m) { |
|
var i = e.bitLength(), k, r = nbv(1), z; |
|
if(i <= 0) return r; |
|
else if(i < 18) k = 1; |
|
else if(i < 48) k = 3; |
|
else if(i < 144) k = 4; |
|
else if(i < 768) k = 5; |
|
else k = 6; |
|
if(i < 8) |
|
z = new Classic(m); |
|
else if(m._isEven()) |
|
z = new Barrett(m); |
|
else |
|
z = new Montgomery(m); |
|
|
|
// precomputation |
|
var g = [], n = 3, k1 = k-1, km = (1<<k)-1; |
|
g[1] = z.convert(this); |
|
if(k > 1) { |
|
var g2 = nbi(); |
|
z.sqrTo(g[1],g2); |
|
while(n <= km) { |
|
g[n] = nbi(); |
|
z.mulTo(g2,g[n-2],g[n]); |
|
n += 2; |
|
} |
|
} |
|
|
|
var j = e.t-1, w, is1 = true, r2 = nbi(), t; |
|
i = nbits(e[j])-1; |
|
while(j >= 0) { |
|
if(i >= k1) w = (e[j]>>(i-k1))&km; |
|
else { |
|
w = (e[j]&((1<<(i+1))-1))<<(k1-i); |
|
if(j > 0) w |= e[j-1]>>(this._DB+i-k1); |
|
} |
|
|
|
n = k; |
|
while((w&1) == 0) { w >>= 1; --n; } |
|
if((i -= n) < 0) { i += this._DB; --j; } |
|
if(is1) { // ret == 1, don't bother squaring or multiplying it |
|
g[w]._copyTo(r); |
|
is1 = false; |
|
} |
|
else { |
|
while(n > 1) { z.sqrTo(r,r2); z.sqrTo(r2,r); n -= 2; } |
|
if(n > 0) z.sqrTo(r,r2); else { t = r; r = r2; r2 = t; } |
|
z.mulTo(r2,g[w],r); |
|
} |
|
|
|
while(j >= 0 && (e[j]&(1<<i)) == 0) { |
|
z.sqrTo(r,r2); t = r; r = r2; r2 = t; |
|
if(--i < 0) { i = this._DB-1; --j; } |
|
} |
|
} |
|
return z.revert(r); |
|
} |
|
|
|
// (public) gcd(this,a) (HAC 14.54) |
|
function bnGCD(a) { |
|
var x = (this.s<0)?this.negate():this.clone(); |
|
var y = (a.s<0)?a.negate():a.clone(); |
|
if(x.compareTo(y) < 0) { var t = x; x = y; y = t; } |
|
var i = x.getLowestSetBit(), g = y.getLowestSetBit(); |
|
if(g < 0) return x; |
|
if(i < g) g = i; |
|
if(g > 0) { |
|
x._rShiftTo(g,x); |
|
y._rShiftTo(g,y); |
|
} |
|
while(x.signum() > 0) { |
|
if((i = x.getLowestSetBit()) > 0) x._rShiftTo(i,x); |
|
if((i = y.getLowestSetBit()) > 0) y._rShiftTo(i,y); |
|
if(x.compareTo(y) >= 0) { |
|
x._subTo(y,x); |
|
x._rShiftTo(1,x); |
|
} |
|
else { |
|
y._subTo(x,y); |
|
y._rShiftTo(1,y); |
|
} |
|
} |
|
if(g > 0) y._lShiftTo(g,y); |
|
return y; |
|
} |
|
|
|
// (protected) this % n, n < 2^26 |
|
function bnpModInt(n) { |
|
if(n <= 0) return 0; |
|
var d = this._DV%n, r = (this.s<0)?n-1:0; |
|
if(this.t > 0) |
|
if(d == 0) r = this[0]%n; |
|
else for(var i = this.t-1; i >= 0; --i) r = (d*r+this[i])%n; |
|
return r; |
|
} |
|
|
|
// (public) 1/this % m (HAC 14.61) |
|
function bnModInverse(m) { |
|
var ac = m._isEven(); |
|
if((this._isEven() && ac) || m.signum() == 0) return BigInteger.ZERO; |
|
var u = m.clone(), v = this.clone(); |
|
var a = nbv(1), b = nbv(0), c = nbv(0), d = nbv(1); |
|
while(u.signum() != 0) { |
|
while(u._isEven()) { |
|
u._rShiftTo(1,u); |
|
if(ac) { |
|
if(!a._isEven() || !b._isEven()) { a._addTo(this,a); b._subTo(m,b); } |
|
a._rShiftTo(1,a); |
|
} |
|
else if(!b._isEven()) b._subTo(m,b); |
|
b._rShiftTo(1,b); |
|
} |
|
while(v._isEven()) { |
|
v._rShiftTo(1,v); |
|
if(ac) { |
|
if(!c._isEven() || !d._isEven()) { c._addTo(this,c); d._subTo(m,d); } |
|
c._rShiftTo(1,c); |
|
} |
|
else if(!d._isEven()) d._subTo(m,d); |
|
d._rShiftTo(1,d); |
|
} |
|
if(u.compareTo(v) >= 0) { |
|
u._subTo(v,u); |
|
if(ac) a._subTo(c,a); |
|
b._subTo(d,b); |
|
} |
|
else { |
|
v._subTo(u,v); |
|
if(ac) c._subTo(a,c); |
|
d._subTo(b,d); |
|
} |
|
} |
|
if(v.compareTo(BigInteger.ONE) != 0) return BigInteger.ZERO; |
|
if(d.compareTo(m) >= 0) return d.subtract(m); |
|
if(d.signum() < 0) d._addTo(m,d); else return d; |
|
if(d.signum() < 0) return d.add(m); else return d; |
|
} |
|
|
|
var lowprimes = [2,3,5,7,11,13,17,19,23,29,31,37,41,43,47,53,59,61,67,71,73,79,83,89,97,101,103,107,109,113,127,131,137,139,149,151,157,163,167,173,179,181,191,193,197,199,211,223,227,229,233,239,241,251,257,263,269,271,277,281,283,293,307,311,313,317,331,337,347,349,353,359,367,373,379,383,389,397,401,409,419,421,431,433,439,443,449,457,461,463,467,479,487,491,499,503,509]; |
|
var lplim = (1<<26)/lowprimes[lowprimes.length-1]; |
|
|
|
// (public) test primality with certainty >= 1-.5^t |
|
function bnIsProbablePrime(t) { |
|
var i, x = this.abs(); |
|
if(x.t == 1 && x[0] <= lowprimes[lowprimes.length-1]) { |
|
for(i = 0; i < lowprimes.length; ++i) |
|
if(x[0] == lowprimes[i]) return true; |
|
return false; |
|
} |
|
if(x._isEven()) return false; |
|
i = 1; |
|
while(i < lowprimes.length) { |
|
var m = lowprimes[i], j = i+1; |
|
while(j < lowprimes.length && m < lplim) m *= lowprimes[j++]; |
|
m = x._modInt(m); |
|
while(i < j) if(m%lowprimes[i++] == 0) return false; |
|
} |
|
return x._millerRabin(t); |
|
} |
|
|
|
// (protected) true if probably prime (HAC 4.24, Miller-Rabin) |
|
function bnpMillerRabin(t) { |
|
var n1 = this.subtract(BigInteger.ONE); |
|
var k = n1.getLowestSetBit(); |
|
if(k <= 0) return false; |
|
var r = n1.shiftRight(k); |
|
t = (t+1)>>1; |
|
if(t > lowprimes.length) t = lowprimes.length; |
|
var a = nbi(); |
|
for(var i = 0; i < t; ++i) { |
|
a._fromInt(lowprimes[i]); |
|
var y = a.modPow(r,this); |
|
if(y.compareTo(BigInteger.ONE) != 0 && y.compareTo(n1) != 0) { |
|
var j = 1; |
|
while(j++ < k && y.compareTo(n1) != 0) { |
|
y = y.modPowInt(2,this); |
|
if(y.compareTo(BigInteger.ONE) == 0) return false; |
|
} |
|
if(y.compareTo(n1) != 0) return false; |
|
} |
|
} |
|
return true; |
|
} |
|
|
|
dojo.extend(BigInteger, { |
|
// protected |
|
_chunkSize: bnpChunkSize, |
|
_toRadix: bnpToRadix, |
|
_fromRadix: bnpFromRadix, |
|
_fromNumber: bnpFromNumber, |
|
_bitwiseTo: bnpBitwiseTo, |
|
_changeBit: bnpChangeBit, |
|
_addTo: bnpAddTo, |
|
_dMultiply: bnpDMultiply, |
|
_dAddOffset: bnpDAddOffset, |
|
_multiplyLowerTo: bnpMultiplyLowerTo, |
|
_multiplyUpperTo: bnpMultiplyUpperTo, |
|
_modInt: bnpModInt, |
|
_millerRabin: bnpMillerRabin, |
|
|
|
// public |
|
clone: bnClone, |
|
intValue: bnIntValue, |
|
byteValue: bnByteValue, |
|
shortValue: bnShortValue, |
|
signum: bnSigNum, |
|
toByteArray: bnToByteArray, |
|
equals: bnEquals, |
|
min: bnMin, |
|
max: bnMax, |
|
and: bnAnd, |
|
or: bnOr, |
|
xor: bnXor, |
|
andNot: bnAndNot, |
|
not: bnNot, |
|
shiftLeft: bnShiftLeft, |
|
shiftRight: bnShiftRight, |
|
getLowestSetBit: bnGetLowestSetBit, |
|
bitCount: bnBitCount, |
|
testBit: bnTestBit, |
|
setBit: bnSetBit, |
|
clearBit: bnClearBit, |
|
flipBit: bnFlipBit, |
|
add: bnAdd, |
|
subtract: bnSubtract, |
|
multiply: bnMultiply, |
|
divide: bnDivide, |
|
remainder: bnRemainder, |
|
divideAndRemainder: bnDivideAndRemainder, |
|
modPow: bnModPow, |
|
modInverse: bnModInverse, |
|
pow: bnPow, |
|
gcd: bnGCD, |
|
isProbablePrime: bnIsProbablePrime |
|
}); |
|
|
|
// BigInteger interfaces not implemented in jsbn: |
|
|
|
// BigInteger(int signum, byte[] magnitude) |
|
// double doubleValue() |
|
// float floatValue() |
|
// int hashCode() |
|
// long longValue() |
|
// static BigInteger valueOf(long val) |
|
|
|
return dojox.math.BigInteger; |
|
});
|
|
|