Public Key Cryptography ================================= Public key cryptography (also called assymmetric cryptography) is a collection of techniques allowing for encryption, signatures, and key agreement. Key Objects ---------------------------------------- Public and private keys are represented by classes ``Public_Key`` and it's subclass ``Private_Key``. The use of inheritence here means that a ``Private_Key`` can be converted into a reference to a public key. None of the functions on ``Public_Key`` and ``Private_Key`` itself are particularly useful for users of the library, because 'bare' public key operations are *very insecure*. The only purpose of these functions is to provide a clean interface that higher level operations can be built on. So really the only thing you need to know is that when a function takes a reference to a ``Public_Key``, it can take any public key or private key, and similiarly for ``Private_Key``. Types of ``Public_Key`` include ``RSA_PublicKey``, ``DSA_PublicKey``, ``ECDSA_PublicKey``, ``ECKCDSA_PublicKey``, ``ECGDSA_PublicKey``, ``DH_PublicKey``, ``ECDH_PublicKey``, ``RW_PublicKey``, ``NR_PublicKey``,, and ``GOST_3410_PublicKey``. There are cooresponding ``Private_Key`` classes for each of these algorithms. .. _creating_new_private_keys: Creating New Private Keys ---------------------------------------- Creating a new private key requires two things: a source of random numbers (see :ref:`random_number_generators`) and some algorithm specific parameters that define the *security level* of the resulting key. For instance, the security level of an RSA key is (at least in part) defined by the length of the public key modulus in bits. So to create a new RSA private key, you would call .. cpp:function:: RSA_PrivateKey::RSA_PrivateKey(RandomNumberGenerator& rng, size_t bits) A constructor that creates a new random RSA private key with a modulus of length *bits*. Algorithms based on the discrete-logarithm problem use what is called a *group*; a group can safely be used with many keys, and for some operations, like key agreement, the two keys *must* use the same group. There are currently two kinds of discrete logarithm groups supported in botan: the integers modulo a prime, represented by :ref:`dl_group`, and elliptic curves in GF(p), represented by :ref:`ec_group`. A rough generalization is that the larger the group is, the more secure the algorithm is, but coorespondingly the slower the operations will be. Given a ``DL_Group``, you can create new DSA, Diffie-Hellman, and Nyberg-Rueppel key pairs with .. cpp:function:: DSA_PrivateKey::DSA_PrivateKey(RandomNumberGenerator& rng, \ const DL_Group& group, const BigInt& x = 0) .. cpp:function:: DH_PrivateKey::DH_PrivateKey(RandomNumberGenerator& rng, \ const DL_Group& group, const BigInt& x = 0) .. cpp:function:: NR_PrivateKey::NR_PrivateKey(RandomNumberGenerator& rng, \ const DL_Group& group, const BigInt& x = 0) .. cpp:function:: ElGamal_PrivateKey::ElGamal_PrivateKey(RandomNumberGenerator& rng, \ const DL_Group& group, const BigInt& x = 0) The optional *x* parameter to each of these constructors is a private key value. This allows you to create keys where the private key is formed by some special technique; for instance you can use the hash of a password (see :ref:`pbkdf` for how to do that) as a private key value. Normally, you would leave the value as zero, letting the class generate a new random key. Finally, given an ``EC_Group`` object, you can create a new ECDSA, ECDH, or GOST 34.10-2001 private key with .. cpp:function:: ECDSA_PrivateKey::ECDSA_PrivateKey(RandomNumberGenerator& rng, \ const EC_Group& domain, const BigInt& x = 0) .. cpp:function:: ECKCDSA_PrivateKey::ECKCDSA_PrivateKey(RandomNumberGenerator& rng, \ const EC_Group& domain, const BigInt& x = 0) .. cpp:function:: ECGDSA_PrivateKey::ECGDSA_PrivateKey(RandomNumberGenerator& rng, \ const EC_Group& domain, const BigInt& x = 0) .. cpp:function:: ECDH_PrivateKey::ECDH_PrivateKey(RandomNumberGenerator& rng, \ const EC_Group& domain, const BigInt& x = 0) .. cpp:function:: GOST_3410_PrivateKey::GOST_3410_PrivateKey(RandomNumberGenerator& rng, \ const EC_Group& domain, const BigInt& x = 0) .. _serializing_private_keys: Serializing Private Keys Using PKCS #8 ---------------------------------------- The standard format for serializing a private key is PKCS #8, the operations for which are defined in ``pkcs8.h``. It supports both unencrypted and encrypted storage. .. cpp:function:: secure_vector PKCS8::BER_encode(const Private_Key& key, \ RandomNumberGenerator& rng, const std::string& password, const std::string& pbe_algo = "") Takes any private key object, serializes it, encrypts it using *password*, and returns a binary structure representing the private key. The final (optional) argument, *pbe_algo*, specifies a particular password based encryption (or PBE) algorithm. If you don't specify a PBE, a sensible default will be used. .. cpp:function:: std::string PKCS8::PEM_encode(const Private_Key& key, \ RandomNumberGenerator& rng, const std::string& pass, const std::string& pbe_algo = "") This formats the key in the same manner as ``BER_encode``, but additionally encodes it into a text format with identifying headers. Using PEM encoding is *highly* recommended for many reasons, including compatibility with other software, for transmission over 8-bit unclean channels, because it can be identified by a human without special tools, and because it sometimes allows more sane behavior of tools that process the data. Unencrypted serialization is also supported. .. warning:: In most situations, using unecrypted private key storage is a bad idea, because anyone can come along and grab the private key without having to know any passwords or other secrets. Unless you have very particular security requirements, always use the versions that encrypt the key based on a passphrase, described above. .. cpp:function:: secure_vector PKCS8::BER_encode(const Private_Key& key) Serializes the private key and returns the result. .. cpp:function:: std::string PKCS8::PEM_encode(const Private_Key& key) Serializes the private key, base64 encodes it, and returns the result. Last but not least, there are some functions that will load (and decrypt, if necessary) a PKCS #8 private key: .. cpp:function:: Private_Key* PKCS8::load_key(DataSource& in, \ RandomNumberGenerator& rng, const User_Interface& ui) .. cpp:function:: Private_Key* PKCS8::load_key(DataSource& in, \ RandomNumberGenerator& rng, std::string passphrase = "") .. cpp:function:: Private_Key* PKCS8::load_key(const std::string& filename, \ RandomNumberGenerator& rng, const User_Interface& ui) .. cpp:function:: Private_Key* PKCS8::load_key(const std::string& filename, \ RandomNumberGenerator& rng, const std::string& passphrase = "") These functions will return an object allocated key object based on the data from whatever source it is using (assuming, of course, the source is in fact storing a representation of a private key, and the decryption was successful). The encoding used (PEM or BER) need not be specified; the format will be detected automatically. The key is allocated with ``new``, and should be released with ``delete`` when you are done with it. The first takes a generic ``DataSource`` that you have to create - the other is a simple wrapper functions that take either a filename or a memory buffer and create the appropriate ``DataSource``. The versions taking a ``std::string`` attempt to decrypt using the password given (if the key is encrypted; if it is not, the passphase value will be ignored). If the passphrase does not decrypt the key, an exception will be thrown. The ones taking a ``User_Interface`` provide a simple callback interface which makes handling incorrect passphrases and such a bit simpler. A ``User_Interface`` has very little to do with talking to users; it's just a way to glue together Botan and whatever user interface you happen to be using. .. note:: In a future version, it is likely that ``User_Interface`` will be replaced by a simple callback using ``std::function``. To use ``User_Interface``, derive a subclass and implement: .. cpp:function:: std::string User_Interface::get_passphrase(const std::string& what, \ const std::string& source, UI_Result& result) const The ``what`` argument specifies what the passphrase is needed for (for example, PKCS #8 key loading passes ``what`` as "PKCS #8 private key"). This lets you provide the user with some indication of *why* your application is asking for a passphrase; feel free to pass the string through ``gettext(3)`` or moral equivalent for i18n purposes. Similarly, ``source`` specifies where the data in question came from, if available (for example, a file name). If the source is not available for whatever reason, then ``source`` will be an empty string; be sure to account for this possibility. The function returns the passphrase as the return value, and a status code in ``result`` (either ``OK`` or ``CANCEL_ACTION``). If ``CANCEL_ACTION`` is returned in ``result``, then the return value will be ignored, and the caller will take whatever action is necessary (typically, throwing an exception stating that the passphrase couldn't be determined). In the specific case of PKCS #8 key decryption, a ``Decoding_Error`` exception will be thrown; your UI should assume this can happen, and provide appropriate error handling (such as putting up a dialog box informing the user of the situation, and canceling the operation in progress). .. _serializing_public_keys: Serializing Public Keys ^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^ To import and export public keys, use: .. cpp:function:: std::vector X509::BER_encode(const Public_Key& key) .. cpp:function:: std::string X509::PEM_encode(const Public_Key& key) .. cpp:function:: Public_Key* X509::load_key(DataSource& in) .. cpp:function:: Public_Key* X509::load_key(const secure_vector& buffer) .. cpp:function:: Public_Key* X509::load_key(const std::string& filename) These functions operate in the same way as the ones described in :ref:`serializing_private_keys`, except that no encryption option is availabe. .. _dl_group: DL_Group ^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^ As described in :ref:`creating_new_private_keys`, a discrete logarithm group can be shared among many keys, even keys created by users who do not trust each other. However, it is necessary to trust the entity who created the group; that is why organization like NIST use algorithms which generate groups in a deterministic way such that creating a bogus group would require breaking some trusted cryptographic primitive like SHA-2. Instantiating a ``DL_Group`` simply requires calling .. cpp:function:: DL_Group::DL_Group(const std::string& name) The *name* parameter is a specially formatted string that consists of three things, the type of the group ("modp" or "dsa"), the creator of the group, and the size of the group in bits, all delimited by '/' characters. Currently all "modp" groups included in botan are ones defined by the Internet Engineering Task Force, so the provider is "ietf", and the strings look like "modp/ietf/N" where N can be any of 768, 1024, 1536, 2048, 3072, 4096, 6144, or 8192. This group type is used for Diffie-Hellman and ElGamal algorithms. The other type, "dsa" is used for DSA and Nyberg-Rueppel keys. They can also be used with Diffie-Hellman and ElGamal, but this is less common. The currently available groups are "dsa/jce/N" for N in 512, 768, or 1024, and "dsa/botan/N" with N being 2048 or 3072. The "jce" groups are the standard DSA groups used in the Java Cryptography Extensions, while the "botan" groups were randomly generated using the FIPS 186-3 algorithm by the library maintainers. You can generate a new random group using .. cpp:function:: DL_Group::DL_Group(RandomNumberGenerator& rng, \ PrimeType type, size_t pbits, size_t qbits = 0) The *type* can be either ``Strong``, ``Prime_Subgroup``, or ``DSA_Kosherizer``. *pbits* specifies the size of the prime in bits. If the *type* is ``Prime_Subgroup`` or ``DSA_Kosherizer``, then *qbits* specifies the size of the subgroup. You can serialize a ``DL_Group`` using .. cpp:function:: secure_vector DL_Group::DER_Encode(Format format) or .. cpp:function:: std::string DL_Group::PEM_encode(Format format) where *format* is any of * ``ANSI_X9_42`` (or ``DH_PARAMETERS``) for modp groups * ``ANSI_X9_57`` (or ``DSA_PARAMETERS``) for DSA-style groups * ``PKCS_3`` is an older format for modp groups; it should only be used for backwards compatibility. You can reload a serialized group using .. cpp:function:: void DL_Group::BER_decode(DataSource& source, Format format) .. cpp:function:: void DL_Group::PEM_decode(DataSource& source) Code Example """"""""""""""""" The example below creates a new 2048 bit ``DL_Group``, prints the generated parameters and ANSI_X9_42 encodes the created group for further usage with DH. .. code-block:: cpp #include #include #include #include int main() { std::unique_ptr rng(new Botan::AutoSeeded_RNG); std::unique_ptr group(new Botan::DL_Group(*rng.get(), Botan::DL_Group::Strong, 2048)); std::cout << std::endl << "p: " << group->get_p(); std::cout << std::endl << "q: " << group->get_q(); std::cout << std::endl << "g: " << group->get_q(); std::cout << std::endl << "ANSI_X9_42: " << std::endl << group->PEM_encode(Botan::DL_Group::ANSI_X9_42); return 0; } .. _ec_group: EC_Group ^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^ An ``EC_Group`` is initialized by passing the name of the group to be used to the constructor. These groups have semi-standardized names like "secp256r1" and "brainpool512r1". Key Checking --------------------------------- Most public key algorithms have limitations or restrictions on their parameters. For example RSA requires an odd exponent, and algorithms based on the discrete logarithm problem need a generator $> 1$. Each public key type has a function .. cpp:function:: bool Public_Key::check_key(RandomNumberGenerator& rng, bool strong) This function performs a number of algorithm-specific tests that the key seems to be mathematically valid and consistent, and returns true if all of the tests pass. It does not have anything to do with the validity of the key for any particular use, nor does it have anything to do with certificates that link a key (which, after all, is just some numbers) with a user or other entity. If *strong* is ``true``, then it does "strong" checking, which includes expensive operations like primality checking. Encryption --------------------------------- Safe public key encryption requires the use of a padding scheme which hides the underlying mathematical properties of the algorithm. Additionally, they will add randomness, so encrypting the same plaintext twice produces two different ciphertexts. The primary interface for encryption is .. cpp:class:: PK_Encryptor .. cpp:function:: secure_vector encrypt( \ const byte* in, size_t length, RandomNumberGenerator& rng) const .. cpp:function:: secure_vector encrypt( \ const std::vector& in, RandomNumberGenerator& rng) const These encrypt a message, returning the ciphertext. .. cpp:function:: size_t maximum_input_size() const Returns the maximum size of the message that can be processed, in bytes. If you call :cpp:func:`PK_Encryptor::encrypt` with a value larger than this the operation will fail with an exception. :cpp:class:`PK_Encryptor` is only an interface - to actually encrypt you have to create an implementation, of which there are currently two available in the library, :cpp:class:`PK_Encryptor_EME` and :cpp:class:`DLIES_Encryptor`. DLIES is a standard method (from IEEE 1363) that uses a key agreement technique such as DH or ECDH to perform message encryption. Normally, public key encryption is done using algorithms which support it directly, such as RSA or ElGamal; these use the EME class: .. cpp:class:: PK_Encryptor_EME .. cpp:function:: PK_Encryptor_EME(const Public_Key& key, std::string eme) With *key* being the key you want to encrypt messages to. The padding method to use is specified in *eme*. The recommended values for *eme* is "EME1(SHA-1)" or "EME1(SHA-256)". If you need compatibility with protocols using the PKCS #1 v1.5 standard, you can also use "EME-PKCS1-v1_5". .. cpp:class:: DLIES_Encryptor Available in the header ``dlies.h`` .. cpp:function:: DLIES_Encryptor(const PK_Key_Agreement_Key& key, \ KDF* kdf, MessageAuthenticationCode* mac, size_t mac_key_len = 20) Where *kdf* is a key derivation function (see :ref:`key_derivation_function`) and *mac* is a MessageAuthenticationCode. The decryption classes are named ``PK_Decryptor``, ``PK_Decryptor_EME``, and ``DLIES_Decryptor``. They are created in the exact same way, except they take the private key, and the processing function is named ``decrypt``. Botan implements the following encryption algorithms and padding schemes: 1. RSA - "PKCS1v15" || "EME-PKCS1-v1_5" - "OAEP" || "EME-OAEP" || "EME1" || "EME1(SHA-1)" || "EME1(SHA-256)" Code Example ^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^ The following Code sample reads a PKCS #8 keypair from the passed location and subsequently encrypts a fixed plaintext with the included public key, using EME1 with SHA-256. For the sake of completeness, the ciphertext is then decrypted using the private key. .. code-block:: cpp #include #include #include #include #include #include #include int main (int argc, char* argv[]) { if(argc!=2) return 1; std::string plaintext("Your great-grandfather gave this watch to your granddad for good luck. Unfortunately, Dane's luck wasn't as good as his old man's."); std::vector pt(plaintext.data(),plaintext.data()+plaintext.length()); std::unique_ptr rng(new Botan::AutoSeeded_RNG); //load keypair std::unique_ptr kp(Botan::PKCS8::load_key(argv[1],*rng.get())); //encrypt with pk Botan::PK_Encryptor_EME enc(*kp,*rng.get(), "EME1(SHA-256)"); std::vector ct = enc.encrypt(pt,*rng.get()); //decrypt with sk Botan::PK_Decryptor_EME dec(*kp,*rng.get(), "EME1(SHA-256)"); std::cout << std::endl << "enc: " << Botan::hex_encode(ct) << std::endl << "dec: "<< Botan::hex_encode(dec.decrypt(ct)); return 0; } Signatures --------------------------------- Signature generation is performed using .. cpp:class:: PK_Signer .. cpp:function:: PK_Signer(const Private_Key& key, \ const std::string& emsa, \ Signature_Format format = IEEE_1363) Constructs a new signer object for the private key *key* using the signature format *emsa*. The key must support signature operations. In the current version of the library, this includes RSA, DSA, ECDSA, ECKCDSA, ECGDSA, GOST 34.10-2001, Nyberg-Rueppel, and Rabin-Williams. Other signature schemes may be supported in the future. Currently available values for *emsa* include EMSA1, EMSA2, EMSA3, EMSA4, and Raw. All of them, except Raw, take a parameter naming a message digest function to hash the message with. The Raw encoding signs the input directly; if the message is too big, the signing operation will fail. Raw is not useful except in very specialized applications. Examples are "EMSA1(SHA-1)" and "EMSA4(SHA-256)". For RSA, use EMSA4 (also called PSS) unless you need compatibility with software that uses the older PKCS #1 v1.5 standard, in which case use EMSA3 (also called "EMSA-PKCS1-v1_5"). For DSA, ECDSA, ECKCDSA, ECGDSA GOST 34.10-2001, and Nyberg-Rueppel, you should use EMSA1. The *format* defaults to ``IEEE_1363`` which is the only available format for RSA. For DSA and ECDSA, you can also use ``DER_SEQUENCE``, which will format the signature as an ASN.1 SEQUENCE value. .. cpp:function:: void update(const byte* in, size_t length) .. cpp:function:: void update(const std::vector& in) .. cpp:function:: void update(byte in) These add more data to be included in the signature computation. Typically, the input will be provided directly to a hash function. .. cpp:function:: secure_vector signature(RandomNumberGenerator& rng) Creates the signature and returns it .. cpp:function:: secure_vector sign_message( \ const byte* in, size_t length, RandomNumberGenerator& rng) .. cpp:function:: secure_vector sign_message( \ const std::vector& in, RandomNumberGenerator& rng) These functions are equivalent to calling :cpp:func:`PK_Signer::update` and then :cpp:func:`PK_Signer::signature`. Any data previously provided using ``update`` will be included. Signatures are verified using .. cpp:class:: PK_Verifier .. cpp:function:: PK_Verifier(const Public_Key& pub_key, \ const std::string& emsa, Signature_Format format = IEEE_1363) Construct a new verifier for signatures assicated with public key *pub_key*. The *emsa* and *format* should be the same as that used by the signer. .. cpp:function:: void update(const byte* in, size_t length) .. cpp:function:: void update(const std::vector& in) .. cpp:function:: void update(byte in) Add further message data that is purportedly assocated with the signature that will be checked. .. cpp:function:: bool check_signature(const byte* sig, size_t length) .. cpp:function:: bool check_signature(const std::vector& sig) Check to see if *sig* is a valid signature for the message data that was written in. Return true if so. This function clears the internal message state, so after this call you can call :cpp:func:`PK_Verifier::update` to start verifying another message. .. cpp:function:: bool verify_message(const byte* msg, size_t msg_length, \ const byte* sig, size_t sig_length) .. cpp:function:: bool verify_message(const std::vector& msg, \ const std::vector& sig) These are equivalent to calling :cpp:func:`PK_Verifier::update` on *msg* and then calling :cpp:func:`PK_Verifier::check_signature` on *sig*. Botan implements the following signature algorithms: 1. RSA #. DSA #. ECDSA #. ECGDSA #. ECKDSA #. GOST 34.10-2001 Code Example ^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^ The following sample program below demonstrates the generation of a new ECDSA keypair over the curve secp512r1 and a ECDSA signature using EMSA1 with SHA-256. Subsequently the computed signature is validated. .. code-block:: cpp #include #include #include #include #include #include int main() { Botan::AutoSeeded_RNG rng; //Generate ECDSA keypair Botan::ECDSA_PrivateKey key(rng, Botan::EC_Group("secp521r1")); std::string text("This is a tasty burger!"); std::vector data(text.data(),text.data()+text.length()); //sign data Botan::PK_Signer signer(key, rng, "EMSA1(SHA-256)"); signer.update(data); std::vector signature = signer.signature(rng); std::cout << "Signature:" << std::endl << Botan::hex_encode(signature); //verify signature Botan::PK_Verifier verifier(key, "EMSA1(SHA-256)"); verifier.update(data); std::cout << std::endl << "is " << (verifier.check_signature(signature)? "valid" : "invalid"); return 0; } Key Agreement --------------------------------- You can get a hold of a ``PK_Key_Agreement_Scheme`` object by calling ``get_pk_kas`` with a key that is of a type that supports key agreement (such as a Diffie-Hellman key stored in a ``DH_PrivateKey`` object), and the name of a key derivation function. This can be "Raw", meaning the output of the primitive itself is returned as the key, or "KDF1(hash)" or "KDF2(hash)" where "hash" is any string you happen to like (hopefully you like strings like "SHA-256" or "RIPEMD-160"), or "X9.42-PRF(keywrap)", which uses the PRF specified in ANSI X9.42. It takes the name or OID of the key wrap algorithm that will be used to encrypt a content encryption key. How key agreement works is that you trade public values with some other party, and then each of you runs a computation with the other's value and your key (this should return the same result to both parties). This computation can be called by using ``derive_key`` with either a byte array/length pair, or a ``secure_vector`` than holds the public value of the other party. The last argument to either call is a number that specifies how long a key you want. Depending on the KDF you're using, you *might not* get back a key of the size you requested. In particular "Raw" will return a number about the size of the Diffie-Hellman modulus, and KDF1 can only return a key that is the same size as the output of the hash. KDF2, on the other hand, will always give you a key exactly as long as you request, regardless of the underlying hash used with it. The key returned is a ``SymmetricKey``, ready to pass to a block cipher, MAC, or other symmetric algorithm. The public value that should be used can be obtained by calling ``public_data``, which exists for any key that is associated with a key agreement algorithm. It returns a ``secure_vector``. "KDF2(SHA-256)" is by far the preferred algorithm for key derivation in new applications. The X9.42 algorithm may be useful in some circumstances, but unless you need X9.42 compatibility, KDF2 is easier to use. Botan implements the following key agreement methods: 1. ECDH #. DH #. DLIES #. ECIES Code Example ^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^ The code below performs an unauthenticated ECDH key agreement using the secp521r elliptic curve and applies the key derivation function KDF2(SHA-256) with 256 bit output length to the computed shared secret. .. code-block:: cpp #include #include #include #include #include #include int main() { Botan::AutoSeeded_RNG rng //ec domain and Botan::EC_Group domain("secp521r1"); std::string kdf = "KDF2(SHA-256)"; //generate ECDH keys Botan::ECDH_PrivateKey keyA(rng, domain); Botan::ECDH_PrivateKey keyB(rng, domain); //Construct key agreements Botan::PK_Key_Agreement ecdhA(keyA,rng,kdf); Botan::PK_Key_Agreement ecdhB(keyB,rng,kdf); //Agree on shared secret and derive symmetric key of 256 bit length Botan::secure_vector sA = ecdhA.derive_key(32,keyB.public_value()).bits_of(); Botan::secure_vector sB = ecdhB.derive_key(32,keyA.public_value()).bits_of(); if(sA != sB) return 1; std::cout << "agreed key: " << std::endl << Botan::hex_encode(sA); return 0; } eXtended Merkle Signature Scheme (XMSS) ---------------------------------------- Botan implements the single tree version of the eXtended Merkle Signature Scheme (XMSS) using Winternitz One Time Signatures+ (WOTS+). The implementation is based on IETF Internet-Draft "XMSS: Extended Hash-Based Signatures". XMSS uses the Botan interfaces for public key cryptography. The following algorithms are implemented: 1. XMSS_SHA2-256_W16_H10 #. XMSS_SHA2-256_W16_H16 #. XMSS_SHA2-256_W16_H20 #. XMSS_SHA2-512_W16_H10 #. XMSS_SHA2-512_W16_H16 #. XMSS_SHA2-512_W16_H20 #. XMSS_SHAKE128_W16_H10 #. XMSS_SHAKE128_W16_H10 #. XMSS_SHAKE128_W16_H10 #. XMSS_SHAKE256_W16_H10 #. XMSS_SHAKE256_W16_H10 #. XMSS_SHAKE256_W16_H10 Code Example ^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^ The following code snippet shows a minimum example on how to create an XMSS public/private key pair and how to use these keys to create and verify a signature: .. code-block:: cpp #include #include #include int main() { // Create a random number generator used for key generation. Botan::AutoSeeded_RNG rng; // create a new public/private key pair using SHA2 256 as hash // function and a tree height of 10. Botan::XMSS_PrivateKey private_key( Botan::XMSS_Parameters::xmss_algorithm_t::XMSS_SHA2_256_W16_H10, rng); Botan::XMSS_PublicKey public_key(private_key); // create signature operation using the private key. std::unique_ptr sig_op = private_key.create_signature_op(rng, "", ""); // create and sign a message using the signature operation. Botan::secure_vector msg { 0x01, 0x02, 0x03, 0x04 }; sig_op->update(msg.data(), msg.size()); Botan::secure_vector sig = sig_op->sign(rng); // create verification operation using the public key std::unique_ptr ver_op = public_key.create_verification_op("", ""); // verify the signature for the previously generated message. ver_op->update(msg.data(), msg.size()); if(ver_op->is_valid_signature(sig.data(), sig.size())) { std::cout << "Success." << std::endl; } else { std::cout << "Error." << std::endl; } }