 1_8_6_287
 1_8_7_72
 1_8_7_330
 1_9_1_378 (0)
 1_9_2_180 (0)
 1_9_3_125 (38)
 1_9_3_392 (0)
 2_1_10 (0)
 2_2_9 (0)
 2_4_6 (0)
 2_5_5 (1)
 2_6_3 (0)
 What's this?
Asymmetric Public Key Algorithms
Asymmetric public key algorithms solve the problem of establishing and sharing secret keys to en/decrypt messages. The key in such an algorithm consists of two parts: a public key that may be distributed to others and a private key that needs to remain secret.
Messages encrypted with a public key can only be decrypted by recipients that are in possession of the associated private key. Since public key algorithms are considerably slower than symmetric key algorithms (cf. OpenSSL::Cipher) they are often used to establish a symmetric key shared between two parties that are in possession of each other’s public key.
Asymmetric algorithms offer a lot of nice features that are used in a lot of different areas. A very common application is the creation and validation of digital signatures. To sign a document, the signatory generally uses a message digest algorithm (cf. OpenSSL::Digest) to compute a digest of the document that is then encrypted (i.e. signed) using the private key. Anyone in possession of the public key may then verify the signature by computing the message digest of the original document on their own, decrypting the signature using the signatory’s public key and comparing the result to the message digest they previously computed. The signature is valid if and only if the decrypted signature is equal to this message digest.
The PKey module offers support for three popular public/private key algorithms:

RSA (OpenSSL::PKey::RSA)

DSA (OpenSSL::PKey::DSA)

Elliptic Curve Cryptography (OpenSSL::PKey::EC)
Each of these implementations is in fact a subclass of the abstract PKey class which offers the interface for supporting digital signatures in the form of PKey#sign and PKey#verify.
DiffieHellman Key Exchange
Finally PKey also features OpenSSL::PKey::DH, an implementation of the DiffieHellman key exchange protocol based on discrete logarithms in finite fields, the same basis that DSA is built on. The DiffieHellman protocol can be used to exchange (symmetric) keys over insecure channels without needing any prior joint knowledge between the participating parties. As the security of DH demands relatively long “public keys” (i.e. the part that is overtly transmitted between participants) DH tends to be quite slow. If security or speed is your primary concern, OpenSSL::PKey::EC offers another implementation of the DiffieHellman protocol.
Constants
DEFAULT_TMP_DH_CALLBACK = lambda { ctx, is_export, keylen warn "using default DH parameters." if $VERBOSE case keylen when 1024 then OpenSSL::PKey::DH::DEFAULT_1024 when 2048 then OpenSSL::PKey::DH::DEFAULT_2048 else nil end }