olm/docs/signing.md
Hubert Chathi 1fd8d2978f fix typo
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# Signature keys and user identity in libolm
The use of any public-key based cryptography system such as Olm presents the
need for our users Alice and Bob to verify that they are in fact communicating
with each other, rather than a man-in-the-middle. Typically this requires an
out-of-band process in which Alice and Bob verify that they have the correct
public keys for each other. For example, this might be done via physical
presence or via a voice call.
In the basic [Olm][] protocol, it is sufficient to compare the public
Curve25519 identity keys. As a naive example, Alice would meet Bob and ensure
that the identity key she downloaded from the key server matched that shown by
his device. This prevents the eavesdropper Eve from decrypting any messages
sent from Alice to Bob, or from masquerading as Bob to send messages to Alice:
she has neither Alice's nor Bob's private identity key, so cannot successfully
complete the triple-DH calculation to compute the shared secret, $`S`$,
which in turn prevents her decrypting intercepted messages, or from creating
new messages with valid MACs. Obviously, for protection to be complete, Bob
must similarly verify Alice's key.
However, the use of the Curve25519 key as the "fingerprint" in this way makes
it difficult to carry out signing operations. For instance, it may be useful to
cross-sign identity keys for different devices, or, as discussed below, to sign
one-time keys. Curve25519 keys are intended for use in DH calculations, and
their use to calculate signatures is non-trivial.
The solution adopted in this library is to generate a signing key for each
user. This is an [Ed25519][] keypair, which is used to calculate a signature on
an object including both the public Ed25519 signing key and the public
Curve25519 identity key. It is then the **public Ed25519 signing key** which is
used as the device fingerprint which Alice and Bob verify with each other.
By verifying the signatures on the key object, Alice and Bob then get the same
level of assurance about the ownership of the Curve25519 identity keys as if
they had compared those directly.
## Signing one-time keys
The Olm protocol requires users to publish a set of one-time keys to a key
server. To establish an Olm session, the originator downloads a key for the
recipient from this server. The decision of whether to sign these one-time keys
is left to the application. There are both advantages and disadvantages to
doing so.
Consider the scenario where one-time keys are unsigned. Alice wants to initiate
an Olm session with Bob. Bob uploads his one-time keys, $`E_B`$, but Eve
replaces them with ones she controls, $`E_E`$. Alice downloads one of the
compromised keys, and sends a pre-key message using a shared secret $`S`$,
where:
```math
S = \operatorname{ECDH}\left(I_A,E_E\right)\;\parallel\;
\operatorname{ECDH}\left(E_A,I_B\right)\;\parallel\;
\operatorname{ECDH}\left(E_A,E_E\right)
```
Eve cannot decrypt the message because she does not have the private parts of
either $`E_A`$ nor $`I_B`$, so cannot calculate
$`ECDH\left(E_A,I_B\right)`$. However, suppose she later compromises
Bob's identity key $`I_B`$. This would give her the ability to decrypt any
pre-key messages sent to Bob using the compromised one-time keys, and is thus a
problematic loss of forward secrecy. If Bob signs his keys with his Ed25519
signing key (and Alice verifies the signature before using them), this problem
is avoided.
On the other hand, signing the one-time keys leads to a reduction in
deniability. Recall that the shared secret is calculated as follows:
```math
S = \operatorname{ECDH}\left(I_A,E_B\right)\;\parallel\;
\operatorname{ECDH}\left(E_A,I_B\right)\;\parallel\;
\operatorname{ECDH}\left(E_A,E_B\right)
```
If keys are unsigned, a forger can make up values of $`E_A`$ and
$`E_B`$, and construct a transcript of a conversation which looks like it
was between Alice and Bob. Alice and Bob can therefore plausibly deny their
participation in any conversation even if they are both forced to divulge their
private identity keys, since it is impossible to prove that the transcript was
a conversation between the two of them, rather than constructed by a forger.
If $`E_B`$ is signed, it is no longer possible to construct arbitrary
transcripts. Given a transcript and Alice and Bob's identity keys, we can now
show that at least one of Alice or Bob was involved in the conversation,
because the ability to calculate $`\operatorname{ECDH}\left(I_A,E_B\right)`$ requires
knowledge of the private parts of either $`I_A`$ (proving Alice's
involvement) or $`E_B`$ (proving Bob's involvement, via the
signature). Note that it remains impossible to show that *both* Alice and Bob
were involved.
In conclusion, applications should consider whether to sign one-time keys based
on the trade-off between forward secrecy and deniability.
## License
This document is licensed under the Apache License, Version 2.0
http://www.apache.org/licenses/LICENSE-2.0.
## Feedback
Questions and feedback can be sent to olm at matrix.org.
[Ed25519]: http://ed25519.cr.yp.to/
[Olm]: https://gitlab.matrix.org/matrix-org/olm/blob/master/docs/olm.md