/* * Point arithmetic on elliptic curves over GF(p) * * (C) 2007 Martin Doering, Christoph Ludwig, Falko Strenzke * 2008-2011,2014,2015 Jack Lloyd * * Botan is released under the Simplified BSD License (see license.txt) */ #ifndef BOTAN_POINT_GFP_H_ #define BOTAN_POINT_GFP_H_ #include #include namespace Botan { /** * Exception thrown if you try to convert a zero point to an affine * coordinate */ class BOTAN_PUBLIC_API(2,0) Illegal_Transformation final : public Exception { public: explicit Illegal_Transformation(const std::string& err = "Requested transformation is not possible") : Exception(err) {} }; /** * Exception thrown if some form of illegal point is decoded */ class BOTAN_PUBLIC_API(2,0) Illegal_Point final : public Exception { public: explicit Illegal_Point(const std::string& err = "Malformed ECP point detected") : Exception(err) {} }; /** * This class represents one point on a curve of GF(p) */ class BOTAN_PUBLIC_API(2,0) PointGFp final { public: enum Compression_Type { UNCOMPRESSED = 0, COMPRESSED = 1, HYBRID = 2 }; enum { WORKSPACE_SIZE = 7 }; /** * Construct an uninitialized PointGFp */ PointGFp() = default; /** * Construct the zero point * @param curve The base curve */ explicit PointGFp(const CurveGFp& curve); /** * Copy constructor */ PointGFp(const PointGFp&) = default; /** * Move Constructor */ PointGFp(PointGFp&& other) { this->swap(other); } /** * Standard Assignment */ PointGFp& operator=(const PointGFp&) = default; /** * Move Assignment */ PointGFp& operator=(PointGFp&& other) { if(this != &other) this->swap(other); return (*this); } /** * Construct a point from its affine coordinates * @param curve the base curve * @param x affine x coordinate * @param y affine y coordinate */ PointGFp(const CurveGFp& curve, const BigInt& x, const BigInt& y); /** * EC2OSP - elliptic curve to octet string primitive * @param format which format to encode using */ std::vector encode(PointGFp::Compression_Type format) const; /** * += Operator * @param rhs the PointGFp to add to the local value * @result resulting PointGFp */ PointGFp& operator+=(const PointGFp& rhs); /** * -= Operator * @param rhs the PointGFp to subtract from the local value * @result resulting PointGFp */ PointGFp& operator-=(const PointGFp& rhs); /** * *= Operator * @param scalar the PointGFp to multiply with *this * @result resulting PointGFp */ PointGFp& operator*=(const BigInt& scalar); /** * Negate this point * @return *this */ PointGFp& negate() { if(!is_zero()) m_coord_y = m_curve.get_p() - m_coord_y; return *this; } /** * get affine x coordinate * @result affine x coordinate */ BigInt get_affine_x() const; /** * get affine y coordinate * @result affine y coordinate */ BigInt get_affine_y() const; /** * Force this point to affine coordinates */ void force_affine(); /** * Force all points on the list to affine coordinates */ static void force_all_affine(std::vector& points, secure_vector& ws); bool is_affine() const; /** * Is this the point at infinity? * @result true, if this point is at infinity, false otherwise. */ bool is_zero() const { return (m_coord_x.is_zero() && m_coord_z.is_zero()); } /** * Checks whether the point is to be found on the underlying * curve; used to prevent fault attacks. * @return if the point is on the curve */ bool on_the_curve() const; /** * swaps the states of *this and other, does not throw! * @param other the object to swap values with */ void swap(PointGFp& other); /** * Randomize the point representation * The actual value (get_affine_x, get_affine_y) does not change */ void randomize_repr(RandomNumberGenerator& rng); /** * Randomize the point representation * The actual value (get_affine_x, get_affine_y) does not change */ void randomize_repr(RandomNumberGenerator& rng, secure_vector& ws); /** * Equality operator */ bool operator==(const PointGFp& other) const; /** * Point addition * @param workspace temp space, at least WORKSPACE_SIZE elements */ void add(const PointGFp& other, std::vector& workspace); /** * Point addition - mixed J+A * @param other affine point to add - assumed to be affine! * @param workspace temp space, at least WORKSPACE_SIZE elements */ void add_affine(const PointGFp& other, std::vector& workspace); /** * Point doubling * @param workspace temp space, at least WORKSPACE_SIZE elements */ void mult2(std::vector& workspace); /** * Point addition * @param workspace temp space, at least WORKSPACE_SIZE elements */ PointGFp plus(const PointGFp& other, std::vector& workspace) const { PointGFp x = (*this); x.add(other, workspace); return x; } /** * Return the zero (aka infinite) point associated with this curve */ PointGFp zero() const { return PointGFp(m_curve); } /** * Return base curve of this point * @result the curve over GF(p) of this point * * You should not need to use this */ const CurveGFp& get_curve() const { return m_curve; } private: CurveGFp m_curve; BigInt m_coord_x, m_coord_y, m_coord_z; }; /** * Point multiplication operator * @param scalar the scalar value * @param point the point value * @return scalar*point on the curve */ BOTAN_PUBLIC_API(2,0) PointGFp operator*(const BigInt& scalar, const PointGFp& point); /** * ECC point multiexponentiation - not constant time! * @param p1 a point * @param z1 a scalar * @param p2 a point * @param z2 a scalar * @result (p1 * z1 + p2 * z2) */ BOTAN_PUBLIC_API(2,0) PointGFp multi_exponentiate( const PointGFp& p1, const BigInt& z1, const PointGFp& p2, const BigInt& z2); // relational operators inline bool operator!=(const PointGFp& lhs, const PointGFp& rhs) { return !(rhs == lhs); } // arithmetic operators inline PointGFp operator-(const PointGFp& lhs) { return PointGFp(lhs).negate(); } inline PointGFp operator+(const PointGFp& lhs, const PointGFp& rhs) { PointGFp tmp(lhs); return tmp += rhs; } inline PointGFp operator-(const PointGFp& lhs, const PointGFp& rhs) { PointGFp tmp(lhs); return tmp -= rhs; } inline PointGFp operator*(const PointGFp& point, const BigInt& scalar) { return scalar * point; } // encoding and decoding inline secure_vector BOTAN_DEPRECATED("Use PointGFp::encode") EC2OSP(const PointGFp& point, uint8_t format) { std::vector enc = point.encode(static_cast(format)); return secure_vector(enc.begin(), enc.end()); } PointGFp BOTAN_PUBLIC_API(2,0) OS2ECP(const uint8_t data[], size_t data_len, const CurveGFp& curve); /** * Perform point decoding * @param data the encoded point * @param data_len length of data in bytes * @param curve_p the curve equation prime * @param curve_a the curve equation a parameter * @param curve_b the curve equation b parameter */ std::pair BOTAN_PUBLIC_API(2,5) OS2ECP(const uint8_t data[], size_t data_len, const BigInt& curve_p, const BigInt& curve_a, const BigInt& curve_b); template PointGFp OS2ECP(const std::vector& data, const CurveGFp& curve) { return OS2ECP(data.data(), data.size(), curve); } class PointGFp_Var_Point_Precompute; /** * Deprecated API for point multiplication * Use EC_Group::blinded_base_point_multiply or EC_Group::blinded_var_point_multiply */ class BOTAN_PUBLIC_API(2,0) BOTAN_DEPRECATED("See comments") Blinded_Point_Multiply final { public: Blinded_Point_Multiply(const PointGFp& base, const BigInt& order, size_t h = 0); ~Blinded_Point_Multiply(); PointGFp blinded_multiply(const BigInt& scalar, RandomNumberGenerator& rng); private: std::vector m_ws; const BigInt& m_order; std::unique_ptr m_point_mul; }; } namespace std { template<> inline void swap(Botan::PointGFp& x, Botan::PointGFp& y) { x.swap(y); } } #endif