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The Bouncy Castle Crypto package is a Java implementation of cryptographic algorithms. This jar contains JCE provider and lightweight API for the Bouncy Castle Cryptography APIs for JDK 1.4.

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package org.bouncycastle.pqc.crypto.rainbow;

import java.security.SecureRandom;

import org.bouncycastle.crypto.AsymmetricCipherKeyPair;
import org.bouncycastle.crypto.AsymmetricCipherKeyPairGenerator;
import org.bouncycastle.crypto.KeyGenerationParameters;
import org.bouncycastle.pqc.crypto.rainbow.util.ComputeInField;
import org.bouncycastle.pqc.crypto.rainbow.util.GF2Field;

/**
 * This class implements AsymmetricCipherKeyPairGenerator. It is used
 * as a generator for the private and public key of the Rainbow Signature
 * Scheme.
 * 

* Detailed information about the key generation is to be found in the paper of * Jintai Ding, Dieter Schmidt: Rainbow, a New Multivariable Polynomial * Signature Scheme. ACNS 2005: 164-175 (http://dx.doi.org/10.1007/11496137_12) */ public class RainbowKeyPairGenerator implements AsymmetricCipherKeyPairGenerator { private boolean initialized = false; private SecureRandom sr; private RainbowKeyGenerationParameters rainbowParams; /* linear affine map L1: */ private short[][] A1; // matrix of the lin. affine map L1(n-v1 x n-v1 matrix) private short[][] A1inv; // inverted A1 private short[] b1; // translation element of the lin.affine map L1 /* linear affine map L2: */ private short[][] A2; // matrix of the lin. affine map (n x n matrix) private short[][] A2inv; // inverted A2 private short[] b2; // translation elemt of the lin.affine map L2 /* components of F: */ private int numOfLayers; // u (number of sets S) private Layer layers[]; // layers of polynomials of F private int[] vi; // set of vinegar vars per layer. /* components of Public Key */ private short[][] pub_quadratic; // quadratic(mixed) coefficients private short[][] pub_singular; // singular coefficients private short[] pub_scalar; // scalars // TODO /** * The standard constructor tries to generate the Rainbow algorithm identifier * with the corresponding OID. */ public RainbowKeyPairGenerator() { } /** * This function generates a Rainbow key pair. * * @return the generated key pair */ public AsymmetricCipherKeyPair genKeyPair() { RainbowPrivateKeyParameters privKey; RainbowPublicKeyParameters pubKey; if (!initialized) { initializeDefault(); } /* choose all coefficients at random */ keygen(); /* now marshall them to PrivateKey */ privKey = new RainbowPrivateKeyParameters(A1inv, b1, A2inv, b2, vi, layers); /* marshall to PublicKey */ pubKey = new RainbowPublicKeyParameters(vi[vi.length - 1] - vi[0], pub_quadratic, pub_singular, pub_scalar); return new AsymmetricCipherKeyPair(pubKey, privKey); } // TODO public void initialize( KeyGenerationParameters param) { this.rainbowParams = (RainbowKeyGenerationParameters)param; // set source of randomness this.sr = new SecureRandom(); // unmarshalling: this.vi = this.rainbowParams.getParameters().getVi(); this.numOfLayers = this.rainbowParams.getParameters().getNumOfLayers(); this.initialized = true; } private void initializeDefault() { RainbowKeyGenerationParameters rbKGParams = new RainbowKeyGenerationParameters(new SecureRandom(), new RainbowParameters()); initialize(rbKGParams); } /** * This function calls the functions for the random generation of the coefficients * and the matrices needed for the private key and the method for computing the public key. */ private void keygen() { generateL1(); generateL2(); generateF(); computePublicKey(); } /** * This function generates the invertible affine linear map L1 = A1*x + b1 *

* The translation part b1, is stored in a separate array. The inverse of * the matrix-part of L1 A1inv is also computed here. *

* This linear map hides the output of the map F. It is on k^(n-v1). *

*/ private void generateL1() { // dimension = n-v1 = vi[last] - vi[first] int dim = vi[vi.length - 1] - vi[0]; this.A1 = new short[dim][dim]; this.A1inv = null; ComputeInField c = new ComputeInField(); /* generation of A1 at random */ while (A1inv == null) { for (int i = 0; i < dim; i++) { for (int j = 0; j < dim; j++) { A1[i][j] = (short)(sr.nextInt() & GF2Field.MASK); } } A1inv = c.inverse(A1); } /* generation of the translation vector at random */ b1 = new short[dim]; for (int i = 0; i < dim; i++) { b1[i] = (short)(sr.nextInt() & GF2Field.MASK); } } /** * This function generates the invertible affine linear map L2 = A2*x + b2 *

* The translation part b2, is stored in a separate array. The inverse of * the matrix-part of L2 A2inv is also computed here. *

* This linear map hides the output of the map F. It is on k^(n). *

*/ private void generateL2() { // dimension = n = vi[last] int dim = vi[vi.length - 1]; this.A2 = new short[dim][dim]; this.A2inv = null; ComputeInField c = new ComputeInField(); /* generation of A2 at random */ while (this.A2inv == null) { for (int i = 0; i < dim; i++) { for (int j = 0; j < dim; j++) { // one col extra for b A2[i][j] = (short)(sr.nextInt() & GF2Field.MASK); } } this.A2inv = c.inverse(A2); } /* generation of the translation vector at random */ b2 = new short[dim]; for (int i = 0; i < dim; i++) { b2[i] = (short)(sr.nextInt() & GF2Field.MASK); } } /** * This function generates the private map F, which consists of u-1 layers. * Each layer consists of oi polynomials where oi = vi[i+1]-vi[i]. *

* The methods for the generation of the coefficients of these polynomials * are called here. *

*/ private void generateF() { this.layers = new Layer[this.numOfLayers]; for (int i = 0; i < this.numOfLayers; i++) { layers[i] = new Layer(this.vi[i], this.vi[i + 1], sr); } } /** * This function computes the public key from the private key. *

* The composition of F with L2 is computed, followed by applying L1 to the * composition's result. The singular and scalar values constitute to the * public key as is, the quadratic terms are compacted in * compactPublicKey() *

*/ private void computePublicKey() { ComputeInField c = new ComputeInField(); int rows = this.vi[this.vi.length - 1] - this.vi[0]; int vars = this.vi[this.vi.length - 1]; // Fpub short[][][] coeff_quadratic_3dim = new short[rows][vars][vars]; this.pub_singular = new short[rows][vars]; this.pub_scalar = new short[rows]; // Coefficients of layers of Private Key F short[][][] coeff_alpha; short[][][] coeff_beta; short[][] coeff_gamma; short[] coeff_eta; // Needed for counters; int oils = 0; int vins = 0; int crnt_row = 0; // current row (polynomial) short vect_tmp[] = new short[vars]; // vector tmp; short sclr_tmp = 0; // Composition of F and L2: Insert L2 = A2*x+b2 in F for (int l = 0; l < this.layers.length; l++) { // get coefficients of current layer coeff_alpha = this.layers[l].getCoeffAlpha(); coeff_beta = this.layers[l].getCoeffBeta(); coeff_gamma = this.layers[l].getCoeffGamma(); coeff_eta = this.layers[l].getCoeffEta(); oils = coeff_alpha[0].length;// this.layers[l].getOi(); vins = coeff_beta[0].length;// this.layers[l].getVi(); // compute polynomials of layer for (int p = 0; p < oils; p++) { // multiply alphas for (int x1 = 0; x1 < oils; x1++) { for (int x2 = 0; x2 < vins; x2++) { // multiply polynomial1 with polynomial2 vect_tmp = c.multVect(coeff_alpha[p][x1][x2], this.A2[x1 + vins]); coeff_quadratic_3dim[crnt_row + p] = c.addSquareMatrix( coeff_quadratic_3dim[crnt_row + p], c .multVects(vect_tmp, this.A2[x2])); // mul poly1 with scalar2 vect_tmp = c.multVect(this.b2[x2], vect_tmp); this.pub_singular[crnt_row + p] = c.addVect(vect_tmp, this.pub_singular[crnt_row + p]); // mul scalar1 with poly2 vect_tmp = c.multVect(coeff_alpha[p][x1][x2], this.A2[x2]); vect_tmp = c.multVect(b2[x1 + vins], vect_tmp); this.pub_singular[crnt_row + p] = c.addVect(vect_tmp, this.pub_singular[crnt_row + p]); // mul scalar1 with scalar2 sclr_tmp = GF2Field.multElem(coeff_alpha[p][x1][x2], this.b2[x1 + vins]); this.pub_scalar[crnt_row + p] = GF2Field.addElem( this.pub_scalar[crnt_row + p], GF2Field .multElem(sclr_tmp, this.b2[x2])); } } // multiply betas for (int x1 = 0; x1 < vins; x1++) { for (int x2 = 0; x2 < vins; x2++) { // multiply polynomial1 with polynomial2 vect_tmp = c.multVect(coeff_beta[p][x1][x2], this.A2[x1]); coeff_quadratic_3dim[crnt_row + p] = c.addSquareMatrix( coeff_quadratic_3dim[crnt_row + p], c .multVects(vect_tmp, this.A2[x2])); // mul poly1 with scalar2 vect_tmp = c.multVect(this.b2[x2], vect_tmp); this.pub_singular[crnt_row + p] = c.addVect(vect_tmp, this.pub_singular[crnt_row + p]); // mul scalar1 with poly2 vect_tmp = c.multVect(coeff_beta[p][x1][x2], this.A2[x2]); vect_tmp = c.multVect(this.b2[x1], vect_tmp); this.pub_singular[crnt_row + p] = c.addVect(vect_tmp, this.pub_singular[crnt_row + p]); // mul scalar1 with scalar2 sclr_tmp = GF2Field.multElem(coeff_beta[p][x1][x2], this.b2[x1]); this.pub_scalar[crnt_row + p] = GF2Field.addElem( this.pub_scalar[crnt_row + p], GF2Field .multElem(sclr_tmp, this.b2[x2])); } } // multiply gammas for (int n = 0; n < vins + oils; n++) { // mul poly with scalar vect_tmp = c.multVect(coeff_gamma[p][n], this.A2[n]); this.pub_singular[crnt_row + p] = c.addVect(vect_tmp, this.pub_singular[crnt_row + p]); // mul scalar with scalar this.pub_scalar[crnt_row + p] = GF2Field.addElem( this.pub_scalar[crnt_row + p], GF2Field.multElem( coeff_gamma[p][n], this.b2[n])); } // add eta this.pub_scalar[crnt_row + p] = GF2Field.addElem( this.pub_scalar[crnt_row + p], coeff_eta[p]); } crnt_row = crnt_row + oils; } // Apply L1 = A1*x+b1 to composition of F and L2 { // temporary coefficient arrays short[][][] tmp_c_quad = new short[rows][vars][vars]; short[][] tmp_c_sing = new short[rows][vars]; short[] tmp_c_scal = new short[rows]; for (int r = 0; r < rows; r++) { for (int q = 0; q < A1.length; q++) { tmp_c_quad[r] = c.addSquareMatrix(tmp_c_quad[r], c .multMatrix(A1[r][q], coeff_quadratic_3dim[q])); tmp_c_sing[r] = c.addVect(tmp_c_sing[r], c.multVect( A1[r][q], this.pub_singular[q])); tmp_c_scal[r] = GF2Field.addElem(tmp_c_scal[r], GF2Field .multElem(A1[r][q], this.pub_scalar[q])); } tmp_c_scal[r] = GF2Field.addElem(tmp_c_scal[r], b1[r]); } // set public key coeff_quadratic_3dim = tmp_c_quad; this.pub_singular = tmp_c_sing; this.pub_scalar = tmp_c_scal; } compactPublicKey(coeff_quadratic_3dim); } /** * The quadratic (or mixed) terms of the public key are compacted from a n x * n matrix per polynomial to an upper diagonal matrix stored in one integer * array of n (n + 1) / 2 elements per polynomial. The ordering of elements * is lexicographic and the result is updating this.pub_quadratic, * which stores the quadratic elements of the public key. * * @param coeff_quadratic_to_compact 3-dimensional array containing a n x n Matrix for each of the * n - v1 polynomials */ private void compactPublicKey(short[][][] coeff_quadratic_to_compact) { int polynomials = coeff_quadratic_to_compact.length; int n = coeff_quadratic_to_compact[0].length; int entries = n * (n + 1) / 2;// the small gauss this.pub_quadratic = new short[polynomials][entries]; int offset = 0; for (int p = 0; p < polynomials; p++) { offset = 0; for (int x = 0; x < n; x++) { for (int y = x; y < n; y++) { if (y == x) { this.pub_quadratic[p][offset] = coeff_quadratic_to_compact[p][x][y]; } else { this.pub_quadratic[p][offset] = GF2Field.addElem( coeff_quadratic_to_compact[p][x][y], coeff_quadratic_to_compact[p][y][x]); } offset++; } } } } public void init(KeyGenerationParameters param) { this.initialize(param); } public AsymmetricCipherKeyPair generateKeyPair() { return genKeyPair(); } }




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