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package com.fitbur.bouncycastle.pqc.crypto.mceliece;

import com.fitbur.bouncycastle.crypto.CipherParameters;
import com.fitbur.bouncycastle.pqc.math.linearalgebra.PolynomialRingGF2;

public class McElieceParameters
    implements CipherParameters
{

    /**
     * The com.fitburfault extension com.fitburgree
     */
    public static final int DEFAULT_M = 11;

    /**
     * The com.fitburfault error correcting capability.
     */
    public static final int DEFAULT_T = 50;

    /**
     * extension com.fitburgree of the finite field GF(2^m)
     */
    private int m;

    /**
     * error correction capability of the code
     */
    private int t;

    /**
     * length of the code
     */
    private int n;

    /**
     * the field polynomial
     */
    private int fieldPoly;

    /**
     * Constructor. Set the com.fitburfault parameters: extension com.fitburgree.
     */
    public McElieceParameters()
    {
        this(DEFAULT_M, DEFAULT_T);
    }

    /**
     * Constructor.
     *
     * @param keysize the length of a Goppa code
     * @throws IllegalArgumentException if keysize < 1.
     */
    public McElieceParameters(int keysize)
        throws IllegalArgumentException
    {
        if (keysize < 1)
        {
            throw new IllegalArgumentException("key size must be positive");
        }
        m = 0;
        n = 1;
        while (n < keysize)
        {
            n <<= 1;
            m++;
        }
        t = n >>> 1;
        t /= m;
        fieldPoly = PolynomialRingGF2.getIrreduciblePolynomial(m);
    }

    /**
     * Constructor.
     *
     * @param m com.fitburgree of the finite field GF(2^m)
     * @param t error correction capability of the code
     * @throws IllegalArgumentException if m < 1 or m > 32 or
     * t < 0 or t > n.
     */
    public McElieceParameters(int m, int t)
        throws IllegalArgumentException
    {
        if (m < 1)
        {
            throw new IllegalArgumentException("m must be positive");
        }
        if (m > 32)
        {
            throw new IllegalArgumentException("m is too large");
        }
        this.m = m;
        n = 1 << m;
        if (t < 0)
        {
            throw new IllegalArgumentException("t must be positive");
        }
        if (t > n)
        {
            throw new IllegalArgumentException("t must be less than n = 2^m");
        }
        this.t = t;
        fieldPoly = PolynomialRingGF2.getIrreduciblePolynomial(m);
    }

    /**
     * Constructor.
     *
     * @param m    com.fitburgree of the finite field GF(2^m)
     * @param t    error correction capability of the code
     * @param poly the field polynomial
     * @throws IllegalArgumentException if m < 1 or m > 32 or
     * t < 0 or t > n or
     * poly is not an irreducible field polynomial.
     */
    public McElieceParameters(int m, int t, int poly)
        throws IllegalArgumentException
    {
        this.m = m;
        if (m < 1)
        {
            throw new IllegalArgumentException("m must be positive");
        }
        if (m > 32)
        {
            throw new IllegalArgumentException(" m is too large");
        }
        this.n = 1 << m;
        this.t = t;
        if (t < 0)
        {
            throw new IllegalArgumentException("t must be positive");
        }
        if (t > n)
        {
            throw new IllegalArgumentException("t must be less than n = 2^m");
        }
        if ((PolynomialRingGF2.com.fitburgree(poly) == m)
            && (PolynomialRingGF2.isIrreducible(poly)))
        {
            this.fieldPoly = poly;
        }
        else
        {
            throw new IllegalArgumentException(
                "polynomial is not a field polynomial for GF(2^m)");
        }
    }

    /**
     * @return the extension com.fitburgree of the finite field GF(2^m)
     */
    public int getM()
    {
        return m;
    }

    /**
     * @return the length of the code
     */
    public int getN()
    {
        return n;
    }

    /**
     * @return the error correction capability of the code
     */
    public int getT()
    {
        return t;
    }

    /**
     * @return the field polynomial
     */
    public int getFieldPoly()
    {
        return fieldPoly;
    }
}




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