[This is an improvement over my last draft in this area; it makes concrete proposals about forward secrecy and chaining, and tries to start getting performance numbers for some platforms. I still need to compute plausible performance numbers on non-aesni platforms, but I might not get to that immediately. For the last draft, see https://www.mail-archive.com/tor-dev@lists.torproject.org/msg07104.html .]
Filename: xxx-aez-relay.txt Title: AEZ for relay cryptography Author: Nick Mathewson Created: 13 Oct 2015 Last-changed: 29 Nov 2015 Status: Draft
0. History
I wrote the first draft of this around October. This draft takes a more concrete approach to the open questions from last time around.
1. Summary and preliminaries
This proposal describes an improved algorithm for circuit encryption, based on the wide-block SPRP AEZ. I also describe the attendant bookkeeping, including CREATE cells, and several variants of the proposal.
For more information about AEZ, see http://web.cs.ucdavis.edu/~rogaway/aez/
For motivations, see proposal 202.
2. Specifications
2.1. New CREATE cell types.
We add a new CREATE cell type that behaves as an ntor cell but which specifies that the circuit will be created to use this mode of encryption.
[TODO: Can/should we make this unobservable?]
The ntor handshake is performed as usual, but a different PROTOID is used: "ntor-curve25519-sha256-aez-1"
To derive keys under this handshake, we use SHAKE128 to derive the following output:
struct hkdf_output { u8 aez_key[48]; u8 chain_key[32]; u8 chain_val_forward[16]; u8 chain_val_backward[16]; };
The first two two fields are constant for the lifetime of the circuit.
2.2. New relay cell payload
We specify the following relay cell payload format, to be used when the exit node circuit hop was created with the CREATE format in 2.1 above:
struct relay_cell_payload { u32 zero_1; u16 zero_2; u16 stream_id; u16 length IN [0..498]; u8 command; u8 data[498]; // payload_len - 11 };
Note that the payload length is unchanged. The fields are now rearranged to be aligned. The 'recognized' and 'length' fields are replaced with zero_1, zero_2, and the high 7 bits of length, for a minimum of 55 bits of unambigious verification. (Additional verification can be done by checking the other fields for correctness; AEZ users can exploit plaintext redundancy for additional cryptographic checking.)
When encrypting a cell for a hop that was created using one of these circuits, clients and relays encrypt them using the AEZ algorithm with the following parameters:
Let Chain denote chain_val_forward if this is a forward cell or chain_forward_backward otherwise.
tau = 0
# We set tau=0 because want no per-hop ciphertext expansion. Instead # we use redundancy in the plaintext to authenticate the data.
Nonce = struct { u64 cell_number; u8 is_forward; u8 is_early; }
# The cell number is the number of relay cells that have # traveled in this direction on this circuit before this cell. # ie, it's zero for the first cell, two for the second, etc. # # is_forward is 1 for outbound cells, 0 for inbound cells. # is_early is 1 for cells packaged as RELAY_EARLY, 0 for # cells packaged as RELAY. # # Technically these two values would be more at home in AD # than in Nonce; but AEZ doesn't actually distinguish N and AD # internally.
Define CELL_CHAIN_BYTES = 32
AD = [ XOR(prev_plaintext[:CELL_CHAIN_BYTES], prev_ciphertext[:CELL_CHAIN_BYTES]), Chain ]
# Using the previous cell's plaintext/ciphertext as additional data # guarantees that any corrupt ciphertext received will corrupt the # plaintext, which will corrupt all future plaintexts.
Set Chain = AES256(chain_key, Chain) xor Chain.
# This 'chain' construction is meant to provide forward # secrecy. Each chain value is replaced after each cell with a # (hopefully!) hard-to-reverse construction.
This instantiates a wide-block cipher, tweaked based on the cell index and direction. It authenticates part of the previous cell's plaintext, thereby ensuring that if the previous cell was corrupted, this cell will be unrecoverable.
3. Design considerations
3.1. Wide-block pros and cons?
See proposal 202, section 4.
3.2. Given wide-block, why AEZ?
It's a reasonably fast probably secure wide-block cipher. In particular, it's performance-competitive with AES_CTR, and far better than what we're doing now. See performance appendix.
It seems secure-ish too. Several cryptographers I know seem to think it's likely secure enough, and almost surely at least as good as AES.
[There are many other competing wide-block SPRP constructions if you like. Many require blocks be an integer number of blocks, or aren't tweakable. Some are slow. Do you know a good one?]
3.3. Why _not_ AEZ?
There are also some reasons to consider avoiding AEZ, even if we do decide to use a wide-block cipher.
FIRST it is complicated to implement. As the specification says, "The easiness claim for AEZ is with respect to ease and versatility of use, not implementation."
SECOND, it's still more complicated to implement well (fast, side-channel-free) on systems without AES acceleration. We'll need to pull the round functions out of fast assembly AES, which is everybody's favorite hobby.
THIRD, it's really horrible to try to do it in hardware.
FOURTH, it is comparatively new. Although several cryptographers like it, and it is closely related to a system with a security proof, you never know.
FIFTH, something better may come along.
4. Alternative designs
4.1. Two keys.
We could have a separate AEZ key for forward and backward encryption. This would use more space, however.
4.2. Authenticating things differently
In computing the AD, we could replace xor with concat.
In computing the AD, we could replace CELL_CHAIN_BYTES with 16, or 509.
(Another thing we might dislike about the current proposal is that it appears to requires us to remember 32 bytes of plaintext until we get another cell. But that part is fixable: note that in the structure of AEZ, the AD is processed in the AEZ-hash() function, and then no longer used. We can compute the AEZ-hash() to be used for the next cell after each cell is en/de crypted.)
4.3. A forward-secure variant.
We might want the property that after every cell, we can forget some secret that would enable us to decrypt that cell if we saw it again.
One way to do this, at a little extra expense, is to keep a 16 or 32 byte 'chaining' value that changes after each cell. The initial chaining value in each direction would be another output of the HKDF. We could use it as an extra AD for the AEZ encryption.
To update the chaining value, we need a one-way function. One option would be your-favorite-hash-function; blake2b isn't _that_ bad, right?
We could also try to XOR it with a function of some hidden value from AEZ: E(S,-1,?) is promising, but it would require that we get our hands inside of our AEZ implementation. Also it would require a real cryptographer to come up with it. :)
A more severe option is to update the entire key after each cell. This would conflict with 4.1 above, and cost us a bit more.
A positively silly option would be to reserve the last X bytes of each relay cell's plaintext for random bytes, if they are not used for payload. This would help forward secrecy a little, in a really doofy way.
Any other ideas?
4.4. Other hashes.
We could update the ntor definition used in this to use a better hash than SHA256 inside
A.1. Performance notes: memory requirements
Let's ignore Tor overhead here, but not openssl overhead.
IN THE CURRENT PROTOCOL, the total memory required at each relay is: 2 sha1 states, 2 aes states.
Each sha1 state uses 96 bytes. Each aes state uses 244 bytes. (Plus 32 bytes counter-mode overhead.) This works out to 704 bytes at each hop.
IN THE PROTOCOL ABOVE, using an optimized AEZ implementation, we'll need 128 bytes for the expanded AEZ key schedule. We'll need another 244 bytes for the AES key schedule for the chain key. And there's 32 bytes of chaining values. This gives us 404 bytes at each hop, for a savings of 42%.
If we used separate AES and AEZ keys in each direction, we would be looking at 776 bytes, for a space increase of 10%.
A.2. Performance notes: CPU requirements on AESNI hosts
The cell_ops benchmark in bench.c purports to tell us how long it takes to encrypt a tor cell. But it wasn't really telling the truth, since it only did one SHA1 operation every 2^16 cells, when entries and exits really do one SHA1 operation every end-to-end cell.
I expanded it to consider the slow (SHA1) case as well. I ran this on my friendly OSX laptop (2.9 GHz Intel Core i5) with AESNI support:
Inbound cells: 169.72 ns per cell. Outbound cells: 175.74 ns per cell. Inbound cells, slow case: 934.42 ns per cell. Outbound cells, slow case: 928.23 ns per cell.
Note that So for an n-hop circuit, each cell does the slow case and (n-1) fast cases at the entry; the slow case at the exit, and the fast case at each middle relay.
So for 3 hop circuits, the total current load on the network is roughly 425 ns per hop, concentrated at the exit.
Then I started messing around with AEZ benchmarks, using the aesni-optimized version of AEZ on the AEZ website. (Further optimizations are probably possible.) For the AES256, I used the usual aesni-based aes construction.
Assuming xor is free in comparison to other operations, and CELL_CHAIN_BYTES=32, I get roughly 270 ns per cell for the entire operation.
If we were to pick CELL_CHAIN_BYTES=509, we'd be looking at around 303 ns per cell.
If we were to pick CELL_CHAIN_BYTES=509 and replace XOR with CONCAT, it would be around 355 ns per cell.
If we were to keep CELL_CHAIN_BYTES=32, and remove the AES256-chaining, I see values around 260 ns per cell.
(This is all very spotty measurements, with some xors left off, and not much effort done at optimization beyond what the default optimized AEZ does today.)
A.3. Performance notes: what if we don't have AESNI?
Here I'll test on a host with sse2 but no aesni instructions.
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