This class contains utility methods for performing mathematical operations over * the Galois Fields. Operations use a given primitive polynomial in calculations.
* *Throughout this package, elements of the GF are represented as an {@code int} * for convenience and speed (but at the cost of memory). *
* * @author Sean Owen * @author David Olivier */ export default class GenericGF { public static AZTEC_DATA_12 = new GenericGF(0x1069, 4096, 1); // x^12 + x^6 + x^5 + x^3 + 1 public static AZTEC_DATA_10 = new GenericGF(0x409, 1024, 1); // x^10 + x^3 + 1 public static AZTEC_DATA_6 = new GenericGF(0x43, 64, 1); // x^6 + x + 1 public static AZTEC_PARAM = new GenericGF(0x13, 16, 1); // x^4 + x + 1 public static QR_CODE_FIELD_256 = new GenericGF(0x011D, 256, 0); // x^8 + x^4 + x^3 + x^2 + 1 public static DATA_MATRIX_FIELD_256 = new GenericGF(0x012D, 256, 1); // x^8 + x^5 + x^3 + x^2 + 1 public static AZTEC_DATA_8 = GenericGF.DATA_MATRIX_FIELD_256; public static MAXICODE_FIELD_64 = GenericGF.AZTEC_DATA_6; private expTable: Int32Array; private logTable: Int32Array; private zero: GenericGFPoly; private one: GenericGFPoly; /** * Create a representation of GF(size) using the given primitive polynomial. * * @param primitive irreducible polynomial whose coefficients are represented by * the bits of an int, where the least-significant bit represents the constant * coefficient * @param size the size of the field * @param b the factor b in the generator polynomial can be 0- or 1-based * (g(x) = (x+a^b)(x+a^(b+1))...(x+a^(b+2t-1))). * In most cases it should be 1, but for QR code it is 0. */ public constructor(private primitive: number /*int*/, private size: number /*int*/, private generatorBase: number /*int*/) { const expTable = new Int32Array(size); let x = 1; for (let i = 0; i < size; i++) { expTable[i] = x; x *= 2; // we're assuming the generator alpha is 2 if (x >= size) { x ^= primitive; x &= size - 1; } } this.expTable = expTable; const logTable = new Int32Array(size); for (let i = 0; i < size - 1; i++) { logTable[expTable[i]] = i; } this.logTable = logTable; // logTable[0] == 0 but this should never be used this.zero = new GenericGFPoly(this, Int32Array.from([0])); this.one = new GenericGFPoly(this, Int32Array.from([1])); } public getZero(): GenericGFPoly { return this.zero; } public getOne(): GenericGFPoly { return this.one; } /** * @return the monomial representing coefficient * x^degree */ public buildMonomial(degree: number /*int*/, coefficient: number /*int*/): GenericGFPoly { if (degree < 0) { throw new Exception(Exception.IllegalArgumentException); } if (coefficient === 0) { return this.zero; } const coefficients = new Int32Array(degree + 1); coefficients[0] = coefficient; return new GenericGFPoly(this, coefficients); } /** * Implements both addition and subtraction -- they are the same in GF(size). * * @return sum/difference of a and b */ public static addOrSubtract(a: number /*int*/, b: number /*int*/): number /*int*/ { return a ^ b; } /** * @return 2 to the power of a in GF(size) */ public exp(a: number /*int*/): number /*int*/ { return this.expTable[a]; } /** * @return base 2 log of a in GF(size) */ public log(a: number /*int*/): number /*int*/ { if (a === 0) { throw new Exception(Exception.IllegalArgumentException); } return this.logTable[a]; } /** * @return multiplicative inverse of a */ public inverse(a: number /*int*/): number /*int*/ { if (a === 0) { throw new Exception(Exception.ArithmeticException); } return this.expTable[this.size - this.logTable[a] - 1]; } /** * @return product of a and b in GF(size) */ public multiply(a: number /*int*/, b: number /*int*/): number /*int*/ { if (a === 0 || b === 0) { return 0; } return this.expTable[(this.logTable[a] + this.logTable[b]) % (this.size - 1)]; } public getSize(): number /*int*/ { return this.size; } public getGeneratorBase(): number /*int*/ { return this.generatorBase; } /*@Override*/ public toString(): string { return 'GF(0x' + Integer.toHexString(this.primitive) + ',' + this.size + ')'; } public equals(o: Object): boolean { return o === this; } }