1879c0555d
When looking at how this would generlaize to the other public key cryptosystems (ECDSA, ED25519, etc.), I think having fewer submodules involved makes more sense.
630 lines
24 KiB
Rust
630 lines
24 KiB
Rust
// Copyright 2015-2016 Brian Smith.
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//
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// Permission to use, copy, modify, and/or distribute this software for any
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// purpose with or without fee is hereby granted, provided that the above
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// copyright notice and this permission notice appear in all copies.
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//
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// THE SOFTWARE IS PROVIDED "AS IS" AND THE AUTHORS DISCLAIM ALL WARRANTIES
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// WITH REGARD TO THIS SOFTWARE INCLUDING ALL IMPLIED WARRANTIES OF
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// MERCHANTABILITY AND FITNESS. IN NO EVENT SHALL THE AUTHORS BE LIABLE FOR ANY
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// SPECIAL, DIRECT, INDIRECT, OR CONSEQUENTIAL DAMAGES OR ANY DAMAGES
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// WHATSOEVER RESULTING FROM LOSS OF USE, DATA OR PROFITS, WHETHER IN AN ACTION
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// OF CONTRACT, NEGLIGENCE OR OTHER TORTIOUS ACTION, ARISING OUT OF OR IN
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// CONNECTION WITH THE USE OR PERFORMANCE OF THIS SOFTWARE.
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use super::{
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padding::RsaEncoding, KeyPairComponents, PublicExponent, PublicKey, PublicKeyComponents, N,
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};
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/// RSA PKCS#1 1.5 signatures.
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use crate::{
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arithmetic::{
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bigint::{self, Prime},
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montgomery::R,
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},
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bits, cpu, digest,
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error::{self, KeyRejected},
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io::der,
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pkcs8, rand, signature,
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};
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/// An RSA key pair, used for signing.
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pub struct KeyPair {
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p: PrivatePrime<P>,
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q: PrivatePrime<Q>,
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qInv: bigint::Elem<P, R>,
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qq: bigint::Modulus<QQ>,
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q_mod_n: bigint::Elem<N, R>,
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public: PublicKey,
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}
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derive_debug_via_field!(KeyPair, stringify!(RsaKeyPair), public);
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impl KeyPair {
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/// Parses an unencrypted PKCS#8-encoded RSA private key.
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///
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/// This will generate a 2048-bit RSA private key of the correct form using
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/// OpenSSL's command line tool:
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///
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/// ```sh
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/// openssl genpkey -algorithm RSA \
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/// -pkeyopt rsa_keygen_bits:2048 \
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/// -pkeyopt rsa_keygen_pubexp:65537 | \
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/// openssl pkcs8 -topk8 -nocrypt -outform der > rsa-2048-private-key.pk8
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/// ```
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///
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/// This will generate a 3072-bit RSA private key of the correct form:
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///
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/// ```sh
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/// openssl genpkey -algorithm RSA \
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/// -pkeyopt rsa_keygen_bits:3072 \
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/// -pkeyopt rsa_keygen_pubexp:65537 | \
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/// openssl pkcs8 -topk8 -nocrypt -outform der > rsa-3072-private-key.pk8
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/// ```
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///
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/// Often, keys generated for use in OpenSSL-based software are stored in
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/// the Base64 “PEM” format without the PKCS#8 wrapper. Such keys can be
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/// converted to binary PKCS#8 form using the OpenSSL command line tool like
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/// this:
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///
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/// ```sh
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/// openssl pkcs8 -topk8 -nocrypt -outform der \
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/// -in rsa-2048-private-key.pem > rsa-2048-private-key.pk8
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/// ```
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///
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/// Base64 (“PEM”) PKCS#8-encoded keys can be converted to the binary PKCS#8
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/// form like this:
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///
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/// ```sh
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/// openssl pkcs8 -nocrypt -outform der \
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/// -in rsa-2048-private-key.pem > rsa-2048-private-key.pk8
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/// ```
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///
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/// See [`Self::from_components`] for more details on how the input is
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/// validated.
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///
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/// See [RFC 5958] and [RFC 3447 Appendix A.1.2] for more details of the
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/// encoding of the key.
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///
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/// [NIST SP-800-56B rev. 1]:
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/// http://nvlpubs.nist.gov/nistpubs/SpecialPublications/NIST.SP.800-56Br1.pdf
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///
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/// [RFC 3447 Appendix A.1.2]:
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/// https://tools.ietf.org/html/rfc3447#appendix-A.1.2
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///
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/// [RFC 5958]:
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/// https://tools.ietf.org/html/rfc5958
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pub fn from_pkcs8(pkcs8: &[u8]) -> Result<Self, KeyRejected> {
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const RSA_ENCRYPTION: &[u8] = include_bytes!("../data/alg-rsa-encryption.der");
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let (der, _) = pkcs8::unwrap_key_(
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untrusted::Input::from(RSA_ENCRYPTION),
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pkcs8::Version::V1Only,
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untrusted::Input::from(pkcs8),
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)?;
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Self::from_der(der.as_slice_less_safe())
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}
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/// Parses an RSA private key that is not inside a PKCS#8 wrapper.
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///
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/// The private key must be encoded as a binary DER-encoded ASN.1
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/// `RSAPrivateKey` as described in [RFC 3447 Appendix A.1.2]). In all other
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/// respects, this is just like `from_pkcs8()`. See the documentation for
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/// `from_pkcs8()` for more details.
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///
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/// It is recommended to use `from_pkcs8()` (with a PKCS#8-encoded key)
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/// instead.
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///
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/// See [`Self::from_components()`] for more details on how the input is
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/// validated.
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///
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/// [RFC 3447 Appendix A.1.2]:
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/// https://tools.ietf.org/html/rfc3447#appendix-A.1.2
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///
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/// [NIST SP-800-56B rev. 1]:
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/// http://nvlpubs.nist.gov/nistpubs/SpecialPublications/NIST.SP.800-56Br1.pdf
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pub fn from_der(input: &[u8]) -> Result<Self, KeyRejected> {
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untrusted::Input::from(input).read_all(KeyRejected::invalid_encoding(), |input| {
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der::nested(
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input,
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der::Tag::Sequence,
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error::KeyRejected::invalid_encoding(),
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Self::from_der_reader,
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)
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})
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}
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fn from_der_reader(input: &mut untrusted::Reader) -> Result<Self, KeyRejected> {
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let version = der::small_nonnegative_integer(input)
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.map_err(|error::Unspecified| KeyRejected::invalid_encoding())?;
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if version != 0 {
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return Err(KeyRejected::version_not_supported());
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}
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fn nonnegative_integer<'a>(
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input: &mut untrusted::Reader<'a>,
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) -> Result<&'a [u8], KeyRejected> {
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der::nonnegative_integer(input)
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.map(|input| input.as_slice_less_safe())
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.map_err(|error::Unspecified| KeyRejected::invalid_encoding())
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}
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let n = nonnegative_integer(input)?;
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let e = nonnegative_integer(input)?;
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let d = nonnegative_integer(input)?;
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let p = nonnegative_integer(input)?;
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let q = nonnegative_integer(input)?;
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let dP = nonnegative_integer(input)?;
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let dQ = nonnegative_integer(input)?;
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let qInv = nonnegative_integer(input)?;
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let components = KeyPairComponents {
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public_key: PublicKeyComponents { n, e },
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d,
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p,
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q,
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dP,
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dQ,
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qInv,
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};
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Self::from_components(&components)
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}
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/// Constructs an RSA private key from its big-endian-encoded components.
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///
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/// Only two-prime (not multi-prime) keys are supported. The public modulus
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/// (n) must be at least 2047 bits. The public modulus must be no larger
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/// than 4096 bits. It is recommended that the public modulus be exactly
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/// 2048 or 3072 bits. The public exponent must be at least 65537 and must
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/// be no more than 33 bits long.
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///
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/// The private key is validated according to [NIST SP-800-56B rev. 1]
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/// section 6.4.1.4.3, crt_pkv (Intended Exponent-Creation Method Unknown),
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/// with the following exceptions:
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///
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/// * Section 6.4.1.2.1, Step 1: Neither a target security level nor an
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/// expected modulus length is provided as a parameter, so checks
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/// regarding these expectations are not done.
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/// * Section 6.4.1.2.1, Step 3: Since neither the public key nor the
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/// expected modulus length is provided as a parameter, the consistency
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/// check between these values and the private key's value of n isn't
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/// done.
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/// * Section 6.4.1.2.1, Step 5: No primality tests are done, both for
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/// performance reasons and to avoid any side channels that such tests
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/// would provide.
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/// * Section 6.4.1.2.1, Step 6, and 6.4.1.4.3, Step 7:
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/// * *ring* has a slightly looser lower bound for the values of `p`
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/// and `q` than what the NIST document specifies. This looser lower
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/// bound matches what most other crypto libraries do. The check might
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/// be tightened to meet NIST's requirements in the future. Similarly,
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/// the check that `p` and `q` are not too close together is skipped
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/// currently, but may be added in the future.
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/// - The validity of the mathematical relationship of `dP`, `dQ`, `e`
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/// and `n` is verified only during signing. Some size checks of `d`,
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/// `dP` and `dQ` are performed at construction, but some NIST checks
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/// are skipped because they would be expensive and/or they would leak
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/// information through side channels. If a preemptive check of the
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/// consistency of `dP`, `dQ`, `e` and `n` with each other is
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/// necessary, that can be done by signing any message with the key
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/// pair.
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///
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/// * `d` is not fully validated, neither at construction nor during
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/// signing. This is OK as far as *ring*'s usage of the key is
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/// concerned because *ring* never uses the value of `d` (*ring* always
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/// uses `p`, `q`, `dP` and `dQ` via the Chinese Remainder Theorem,
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/// instead). However, *ring*'s checks would not be sufficient for
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/// validating a key pair for use by some other system; that other
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/// system must check the value of `d` itself if `d` is to be used.
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pub fn from_components<Public, Private>(
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components: &KeyPairComponents<Public, Private>,
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) -> Result<Self, KeyRejected>
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where
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Public: AsRef<[u8]>,
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Private: AsRef<[u8]>,
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{
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let components = KeyPairComponents {
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public_key: PublicKeyComponents {
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n: components.public_key.n.as_ref(),
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e: components.public_key.e.as_ref(),
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},
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d: components.d.as_ref(),
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p: components.p.as_ref(),
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q: components.q.as_ref(),
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dP: components.dP.as_ref(),
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dQ: components.dQ.as_ref(),
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qInv: components.qInv.as_ref(),
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};
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Self::from_components_(&components, cpu::features())
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}
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fn from_components_(
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&KeyPairComponents {
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public_key,
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d,
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p,
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q,
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dP,
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dQ,
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qInv,
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}: &KeyPairComponents<&[u8]>,
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cpu_features: cpu::Features,
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) -> Result<Self, KeyRejected> {
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let d = untrusted::Input::from(d);
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let p = untrusted::Input::from(p);
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let q = untrusted::Input::from(q);
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let dP = untrusted::Input::from(dP);
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let dQ = untrusted::Input::from(dQ);
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let qInv = untrusted::Input::from(qInv);
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let (p, p_bits) = bigint::Nonnegative::from_be_bytes_with_bit_length(p)
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.map_err(|error::Unspecified| KeyRejected::invalid_encoding())?;
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let (q, q_bits) = bigint::Nonnegative::from_be_bytes_with_bit_length(q)
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.map_err(|error::Unspecified| KeyRejected::invalid_encoding())?;
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// Our implementation of CRT-based modular exponentiation used requires
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// that `p > q` so swap them if `p < q`. If swapped, `qInv` is
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// recalculated below. `p != q` is verified implicitly below, e.g. when
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// `q_mod_p` is constructed.
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let ((p, p_bits, dP), (q, q_bits, dQ, qInv)) = match q.verify_less_than(&p) {
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Ok(_) => ((p, p_bits, dP), (q, q_bits, dQ, Some(qInv))),
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Err(error::Unspecified) => {
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// TODO: verify `q` and `qInv` are inverses (mod p).
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((q, q_bits, dQ), (p, p_bits, dP, None))
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}
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};
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// XXX: Some steps are done out of order, but the NIST steps are worded
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// in such a way that it is clear that NIST intends for them to be done
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// in order. TODO: Does this matter at all?
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// 6.4.1.4.3/6.4.1.2.1 - Step 1.
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// Step 1.a is omitted, as explained above.
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// Step 1.b is omitted per above. Instead, we check that the public
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// modulus is 2048 to `PRIVATE_KEY_PUBLIC_MODULUS_MAX_BITS` bits.
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// XXX: The maximum limit of 4096 bits is primarily due to lack of
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// testing of larger key sizes; see, in particular,
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// https://www.mail-archive.com/openssl-dev@openssl.org/msg44586.html
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// and
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// https://www.mail-archive.com/openssl-dev@openssl.org/msg44759.html.
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// Also, this limit might help with memory management decisions later.
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// Step 1.c. We validate e >= 65537.
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let n = untrusted::Input::from(public_key.n);
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let e = untrusted::Input::from(public_key.e);
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let public_key = PublicKey::from_modulus_and_exponent(
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n,
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e,
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bits::BitLength::from_usize_bits(2048),
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super::PRIVATE_KEY_PUBLIC_MODULUS_MAX_BITS,
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PublicExponent::_65537,
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cpu_features,
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)?;
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let n = public_key.n().value();
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// 6.4.1.4.3 says to skip 6.4.1.2.1 Step 2.
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// 6.4.1.4.3 Step 3.
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// Step 3.a is done below, out of order.
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// Step 3.b is unneeded since `n_bits` is derived here from `n`.
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// 6.4.1.4.3 says to skip 6.4.1.2.1 Step 4. (We don't need to recover
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// the prime factors since they are already given.)
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// 6.4.1.4.3 - Step 5.
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// Steps 5.a and 5.b are omitted, as explained above.
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// Step 5.c.
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//
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// TODO: First, stop if `p < (√2) * 2**((nBits/2) - 1)`.
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//
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// Second, stop if `p > 2**(nBits/2) - 1`.
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let half_n_bits = public_key.n().len_bits().half_rounded_up();
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if p_bits != half_n_bits {
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return Err(KeyRejected::inconsistent_components());
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}
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// TODO: Step 5.d: Verify GCD(p - 1, e) == 1.
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// Steps 5.e and 5.f are omitted as explained above.
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// Step 5.g.
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//
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// TODO: First, stop if `q < (√2) * 2**((nBits/2) - 1)`.
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//
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// Second, stop if `q > 2**(nBits/2) - 1`.
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if p_bits != q_bits {
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return Err(KeyRejected::inconsistent_components());
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}
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// TODO: Step 5.h: Verify GCD(p - 1, e) == 1.
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let q_mod_n_decoded = q
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.to_elem(n)
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.map_err(|error::Unspecified| KeyRejected::inconsistent_components())?;
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// TODO: Step 5.i
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//
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// 3.b is unneeded since `n_bits` is derived here from `n`.
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// 6.4.1.4.3 - Step 3.a (out of order).
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//
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// Verify that p * q == n. We restrict ourselves to modular
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// multiplication. We rely on the fact that we've verified
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// 0 < q < p < n. We check that q and p are close to sqrt(n) and then
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// assume that these preconditions are enough to let us assume that
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// checking p * q == 0 (mod n) is equivalent to checking p * q == n.
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let q_mod_n = bigint::elem_mul(n.oneRR().as_ref(), q_mod_n_decoded.clone(), n);
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let p_mod_n = p
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.to_elem(n)
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.map_err(|error::Unspecified| KeyRejected::inconsistent_components())?;
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let pq_mod_n = bigint::elem_mul(&q_mod_n, p_mod_n, n);
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if !pq_mod_n.is_zero() {
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return Err(KeyRejected::inconsistent_components());
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}
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// 6.4.1.4.3/6.4.1.2.1 - Step 6.
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// Step 6.a, partial.
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//
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// First, validate `2**half_n_bits < d`. Since 2**half_n_bits has a bit
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// length of half_n_bits + 1, this check gives us 2**half_n_bits <= d,
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// and knowing d is odd makes the inequality strict.
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let (d, d_bits) = bigint::Nonnegative::from_be_bytes_with_bit_length(d)
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.map_err(|_| error::KeyRejected::invalid_encoding())?;
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if !(half_n_bits < d_bits) {
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return Err(KeyRejected::inconsistent_components());
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}
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// XXX: This check should be `d < LCM(p - 1, q - 1)`, but we don't have
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// a good way of calculating LCM, so it is omitted, as explained above.
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d.verify_less_than_modulus(n)
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.map_err(|error::Unspecified| KeyRejected::inconsistent_components())?;
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if !d.is_odd() {
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return Err(KeyRejected::invalid_component());
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}
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// Step 6.b is omitted as explained above.
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// 6.4.1.4.3 - Step 7.
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// Step 7.a.
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let p = PrivatePrime::new(p, dP, cpu_features)?;
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// Step 7.b.
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let q = PrivatePrime::new(q, dQ, cpu_features)?;
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let q_mod_p = q.modulus.to_elem(&p.modulus);
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// Step 7.c.
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let qInv = if let Some(qInv) = qInv {
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bigint::Elem::from_be_bytes_padded(qInv, &p.modulus)
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.map_err(|error::Unspecified| KeyRejected::invalid_component())?
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} else {
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// We swapped `p` and `q` above, so we need to calculate `qInv`.
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// Step 7.f below will verify `qInv` is correct.
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let q_mod_p = bigint::elem_mul(p.modulus.oneRR().as_ref(), q_mod_p.clone(), &p.modulus);
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bigint::elem_inverse_consttime(q_mod_p, &p.modulus)
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.map_err(|error::Unspecified| KeyRejected::unexpected_error())?
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};
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// Steps 7.d and 7.e are omitted per the documentation above, and
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// because we don't (in the long term) have a good way to do modulo
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// with an even modulus.
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// Step 7.f.
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let qInv = bigint::elem_mul(p.modulus.oneRR().as_ref(), qInv, &p.modulus);
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bigint::verify_inverses_consttime(&qInv, q_mod_p, &p.modulus)
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.map_err(|error::Unspecified| KeyRejected::inconsistent_components())?;
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let qq = bigint::elem_mul(&q_mod_n, q_mod_n_decoded, n).into_modulus::<QQ>(cpu_features)?;
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// This should never fail since `n` and `e` were validated above.
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Ok(Self {
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p,
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q,
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qInv,
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q_mod_n,
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qq,
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public: public_key,
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})
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|
}
|
|
|
|
/// Returns a reference to the public key.
|
|
pub fn public(&self) -> &PublicKey {
|
|
&self.public
|
|
}
|
|
|
|
/// Returns the length in bytes of the key pair's public modulus.
|
|
///
|
|
/// A signature has the same length as the public modulus.
|
|
#[deprecated = "Use `public().n().len_bits().as_usize_bits()`"]
|
|
#[inline]
|
|
pub fn public_modulus_len(&self) -> usize {
|
|
self.public().n().len_bits().as_usize_bits()
|
|
}
|
|
}
|
|
|
|
impl signature::KeyPair for KeyPair {
|
|
type PublicKey = PublicKey;
|
|
|
|
fn public_key(&self) -> &Self::PublicKey {
|
|
self.public()
|
|
}
|
|
}
|
|
|
|
struct PrivatePrime<M: Prime> {
|
|
modulus: bigint::Modulus<M>,
|
|
exponent: bigint::PrivateExponent<M>,
|
|
}
|
|
|
|
impl<M: Prime> PrivatePrime<M> {
|
|
/// Constructs a `PrivatePrime` from the private prime `p` and `dP` where
|
|
/// dP == d % (p - 1).
|
|
fn new(
|
|
p: bigint::Nonnegative,
|
|
dP: untrusted::Input,
|
|
cpu_features: cpu::Features,
|
|
) -> Result<Self, KeyRejected> {
|
|
let (p, p_bits) = bigint::Modulus::from_nonnegative_with_bit_length(p, cpu_features)?;
|
|
if p_bits.as_usize_bits() % 512 != 0 {
|
|
return Err(error::KeyRejected::private_modulus_len_not_multiple_of_512_bits());
|
|
}
|
|
|
|
// [NIST SP-800-56B rev. 1] 6.4.1.4.3 - Steps 7.a & 7.b.
|
|
let dP = bigint::PrivateExponent::from_be_bytes_padded(dP, &p)
|
|
.map_err(|error::Unspecified| KeyRejected::inconsistent_components())?;
|
|
|
|
// XXX: Steps 7.d and 7.e are omitted. We don't check that
|
|
// `dP == d % (p - 1)` because we don't (in the long term) have a good
|
|
// way to do modulo with an even modulus. Instead we just check that
|
|
// `1 <= dP < p - 1`. We'll check it, to some unknown extent, when we
|
|
// do the private key operation, since we verify that the result of the
|
|
// private key operation using the CRT parameters is consistent with `n`
|
|
// and `e`. TODO: Either prove that what we do is sufficient, or make
|
|
// it so.
|
|
|
|
Ok(Self {
|
|
modulus: p,
|
|
exponent: dP,
|
|
})
|
|
}
|
|
}
|
|
|
|
fn elem_exp_consttime<M, MM>(
|
|
c: &bigint::Elem<MM>,
|
|
p: &PrivatePrime<M>,
|
|
) -> Result<bigint::Elem<M>, error::Unspecified>
|
|
where
|
|
M: bigint::NotMuchSmallerModulus<MM>,
|
|
M: Prime,
|
|
{
|
|
let c_mod_m = bigint::elem_reduced(c, &p.modulus);
|
|
// We could precompute `oneRRR = elem_squared(&p.oneRR`) as mentioned
|
|
// in the Smooth CRT-RSA paper.
|
|
let c_mod_m = bigint::elem_mul(p.modulus.oneRR().as_ref(), c_mod_m, &p.modulus);
|
|
let c_mod_m = bigint::elem_mul(p.modulus.oneRR().as_ref(), c_mod_m, &p.modulus);
|
|
bigint::elem_exp_consttime(c_mod_m, &p.exponent, &p.modulus)
|
|
}
|
|
|
|
// Type-level representations of the different moduli used in RSA signing, in
|
|
// addition to `super::N`. See `super::bigint`'s modulue-level documentation.
|
|
|
|
#[derive(Copy, Clone)]
|
|
enum P {}
|
|
unsafe impl Prime for P {}
|
|
unsafe impl bigint::SmallerModulus<N> for P {}
|
|
unsafe impl bigint::NotMuchSmallerModulus<N> for P {}
|
|
|
|
#[derive(Copy, Clone)]
|
|
enum QQ {}
|
|
unsafe impl bigint::SmallerModulus<N> for QQ {}
|
|
unsafe impl bigint::NotMuchSmallerModulus<N> for QQ {}
|
|
|
|
// `q < p < 2*q` since `q` is slightly smaller than `p` (see below). Thus:
|
|
//
|
|
// q < p < 2*q
|
|
// q*q < p*q < 2*q*q.
|
|
// q**2 < n < 2*(q**2).
|
|
unsafe impl bigint::SlightlySmallerModulus<N> for QQ {}
|
|
|
|
#[derive(Copy, Clone)]
|
|
enum Q {}
|
|
unsafe impl Prime for Q {}
|
|
unsafe impl bigint::SmallerModulus<N> for Q {}
|
|
unsafe impl bigint::SmallerModulus<P> for Q {}
|
|
|
|
// q < p && `p.bit_length() == q.bit_length()` implies `q < p < 2*q`.
|
|
unsafe impl bigint::SlightlySmallerModulus<P> for Q {}
|
|
|
|
unsafe impl bigint::SmallerModulus<QQ> for Q {}
|
|
unsafe impl bigint::NotMuchSmallerModulus<QQ> for Q {}
|
|
|
|
impl KeyPair {
|
|
/// Sign `msg`. `msg` is digested using the digest algorithm from
|
|
/// `padding_alg` and the digest is then padded using the padding algorithm
|
|
/// from `padding_alg`. The signature it written into `signature`;
|
|
/// `signature`'s length must be exactly the length returned by
|
|
/// `public_modulus_len()`. `rng` may be used to randomize the padding
|
|
/// (e.g. for PSS).
|
|
///
|
|
/// Many other crypto libraries have signing functions that takes a
|
|
/// precomputed digest as input, instead of the message to digest. This
|
|
/// function does *not* take a precomputed digest; instead, `sign`
|
|
/// calculates the digest itself.
|
|
pub fn sign(
|
|
&self,
|
|
padding_alg: &'static dyn RsaEncoding,
|
|
rng: &dyn rand::SecureRandom,
|
|
msg: &[u8],
|
|
signature: &mut [u8],
|
|
) -> Result<(), error::Unspecified> {
|
|
let mod_bits = self.public.n().len_bits();
|
|
if signature.len() != mod_bits.as_usize_bytes_rounded_up() {
|
|
return Err(error::Unspecified);
|
|
}
|
|
|
|
let m_hash = digest::digest(padding_alg.digest_alg(), msg);
|
|
padding_alg.encode(m_hash, signature, mod_bits, rng)?;
|
|
|
|
// RFC 8017 Section 5.1.2: RSADP, using the Chinese Remainder Theorem
|
|
// with Garner's algorithm.
|
|
|
|
let n = self.public.n().value();
|
|
|
|
// Step 1. The value zero is also rejected.
|
|
let base = bigint::Elem::from_be_bytes_padded(untrusted::Input::from(signature), n)?;
|
|
|
|
// Step 2
|
|
let c = base;
|
|
|
|
// Step 2.b.i.
|
|
let m_1 = elem_exp_consttime(&c, &self.p)?;
|
|
let c_mod_qq = bigint::elem_reduced_once(&c, &self.qq);
|
|
let m_2 = elem_exp_consttime(&c_mod_qq, &self.q)?;
|
|
|
|
// Step 2.b.ii isn't needed since there are only two primes.
|
|
|
|
// Step 2.b.iii.
|
|
let p = &self.p.modulus;
|
|
let m_2 = bigint::elem_widen(m_2, p);
|
|
let m_1_minus_m_2 = bigint::elem_sub(m_1, &m_2, p);
|
|
let h = bigint::elem_mul(&self.qInv, m_1_minus_m_2, p);
|
|
|
|
// Step 2.b.iv. The reduction in the modular multiplication isn't
|
|
// necessary because `h < p` and `p * q == n` implies `h * q < n`.
|
|
// Modular arithmetic is used simply to avoid implementing
|
|
// non-modular arithmetic.
|
|
let h = bigint::elem_widen(h, n);
|
|
let q_times_h = bigint::elem_mul(&self.q_mod_n, h, n);
|
|
let m_2 = bigint::elem_widen(m_2, n);
|
|
let m = bigint::elem_add(m_2, q_times_h, n);
|
|
|
|
// Step 2.b.v isn't needed since there are only two primes.
|
|
|
|
// Verify the result to protect against fault attacks as described
|
|
// in "On the Importance of Checking Cryptographic Protocols for
|
|
// Faults" by Dan Boneh, Richard A. DeMillo, and Richard J. Lipton.
|
|
// This check is cheap assuming `e` is small, which is ensured during
|
|
// `KeyPair` construction. Note that this is the only validation of `e`
|
|
// that is done other than basic checks on its size, oddness, and
|
|
// minimum value, since the relationship of `e` to `d`, `p`, and `q` is
|
|
// not verified during `KeyPair` construction.
|
|
{
|
|
let verify = self.public.exponentiate_elem(m.clone());
|
|
bigint::elem_verify_equal_consttime(&verify, &c)?;
|
|
}
|
|
|
|
// Step 3.
|
|
//
|
|
// See Falko Strenzke, "Manger's Attack revisited", ICICS 2010.
|
|
m.fill_be_bytes(signature);
|
|
|
|
Ok(())
|
|
}
|
|
}
|