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Topic: blind symmetric commitment for stronger byzantine voting resilience - page 4. (Read 12265 times)

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in bitcoin we trust
So in a previous mail

https://bitcointalksearch.org/topic/m.2149057

I described a simple, extremely efficient and easy to implement symmetric
key commitment that is unlinkable until reveal time (at bottom).  I think
this can help improve the byzantine generals problem, that bitcoin only
defends to simple majority (with one vote per CPU power), and so assumes
most nodes by cpu power are honest.  With this simple protocol change you
dont need any honest nodes, just some honest clients to spend to, to have
your transaction accepted.

You can think of this in terms of a (somewhat distributed) server performing
validations, but in a way that it sufficiently blind to the details of the
validations that it can not selectively enforce a policy, it power is
limited to random DoS.

There are other situations where you can rely on a server for one property
but not another - eg a somewhat distributed encrypted backup (like Tahoe
LAFS) you rely on for availability, but not integrity nor confidentiality
(because you encrypt those, and some sharing scenarios still work.) So this
is in that class of protocols - zero-trust in server, but can extract
service and some guarantees from the (optionally distributed) server anyway.

(Bitcoin does not use known better than majority results for byzantine
generals based on fair coin toss, relying instead on simple majority and an
assumed largely unjammable network.  I notice Nick Szabo was complaining
about this on his blog and saying bitcoins majority is not even a standard
or proven byzantine voting protocol - something adhoc.  I think the bitcoin
unjammable network assumption is a false at the limit so that someone with
strong network hacking capabilities can create network splits long enough to
even overcome the network majority vote without having any compute power of
their own.  All they need is to have a split with enough power to plausibly
quickly get the victims their desired number of (split) confirmations.)

Anyway this should be a clear voting improvement, that is efficient.

Imagine a couple of big pools or ASIC miners started enforcing some
arbitrary coin policy, eg say coins must not have some taint according to
its list of black coins, or coins must be certified by some entity, be
traceable to some type of event etc.  Well call these miners/voters
"dishonest", in that they are not following the intended zero-policy
protocol.

If the coins dont match their chosen policy, the dishonest miners will
refuse to include transactions in blocks they issue.  If they see a
transaction which does not match their policy in a block by someone else
they will ignore it and try to make it into an orphan.  As they have say 75%
of the network power they can do that successfully.  Even with current
validation protocols in the clients, so the "but clients wont accept the
change" argument does not apply - the existing clients will accept the
policy change, because they cant detect it, nor prove it, and dont have the
voting power to impose honest policies.

(For realism of this risk, note that according to Kaminsky there already
exist multiple entities with reserve ASIC power each exceeding current
network difficulty who are holding part of their power in reserve for profit
maximisation reasons.  This is a coming to fruition of the concentration of
power issue I was talking about in my first bitcoin forum post.  People who
have that kind of power in reserve have clearly invested millions of
dollars, which probably makes them more vulnerable to political influence.)
Alright so the solution.  Use the commitment protocol (below) which even
though it is symmetric key strongly hides the committed transaction public
key.  (Symmetric in the sense that the validation steps are all highly
efficient symmetric key based).  Now send the transaction (which includes
the public key) direct to the receiver, over a secure channel, or an assumed
non-eavesdropped direct channel, with no p2p flood of the transaction.  The
receiver can check the hash to the commitment, and decide how many
confirmtions he needs.  Once he has eg 6 confirmations he reveals the
commitment to the transaction (by publishing it).  The sender may also send
the reveal/transaction to the network directly himself, if the recipient is
offline.  However there is no advantage to publishing early so it seems
better to let the recipient do it when he is ready to incorporate the
payment into his wallet.

Now the powerful dishonest voters if they try to apply their policy when
they see the reveal triggers it, must redo the work of the 6-commitments
that they computed themselves.  This is like starting 6-steps behind in the
statstical gamblers ruin game that Nakamoto describes in the bitcoin
paper. Consequently even with 75%, they will find it very hard to outcompete
their own prior work, to create a 6 chain long orphan while the 25% is moving
forward on the honest chain.  Each time they see transactions which violate
their policy, they have to restart their chain recalculation again from
scratch.  Often if simple lower powered intermittent recipient sends the
coin will be burried hundreds of blocks back.  In addition 6 chain long
branches are extremely unlikely with honest payers, so clients can (and
maybe already do?) act with suspicion of they see one.


Going further, I said for best security, the recipient should never even
reveal (to the network) until he is actually about to spend, but futher he
does not even have to reveal publicly ever, he can choose to reveal only to
the recipient with a direct connection (no p2p flood fill of transaction.)
And the direct spend argument composes, ie the 2nd recipient can not do the
same thing again.  (public key A sends to public key B sends to public key
C: B publishes COM( transaction B->C ), sends the reveal of COM( transaction
A->B ), and COM transaction B->C ) to C.  C waits 6 confirmations and is
convinced.  So its the approach is composable, and in fact the network
doesnt learn the size of the transaction even, though the spend grows each
time.  Eventually presumably someone will publish will the confirmations to
the network to trim the tansaction size, though it is not strictly
necessary, and the transaction flow is small and direct (no network scaling
issues), so that it wouldnt be a huge problem to have a 1MB payment
representing 1000s of hops of network blind transactions.  (For the
composable network blind respending the commitment has to commit publicly to
both the sender and next hop recipient keys, so the network can see how long
the chain is).

Probably you can cope with multiple inputs and outputs, and maybe given even
you can work with a 100% dishonest network mining network (all the dishonest
miner can do is selectively DoS transactions if they are all network blind
except the mining), maybe the mining can even be decoupled from the voting,
as you no longer demand much from the voting process.  That admits more
interesting things like pool free direct mining, low variance hashcash
coins, probably.  Many things to think through.

I suppose the commitment could be described as a blind symmetric commitment.

Adam

On Tue, May 14, 2013 at 04:09:02PM +0200, Adam Back wrote:
> [...]
>
> One related concept is commitments.  I think its relatively easy to commit
> to a payment and lock a coin without identifying yourself, until the
> commitment is released.  You might do the commitment, wait 6-blocks for
> confirmation, then reveal the commitment.  Then that is like a self-issued
> green coin with no need for trust, that can be immediately cleared.  The
> recipient has to be committed to at the same time to prevent double
> spending.
>
> So just commit = H( input-pub ) H( transaction ) and put it in the block
> chain.  Where transaction the is usual ( input signature, output-pub,
> script).  (Fee for the commit would have to come from an unlinked coin or
> the input-pub reveals the coin).  Wait 6 blocks, send/reveal the transaction
> (free because fee was already paid).  Validators check input-pub hash
> against committed coins by hash, check the transaction hash, and the usual
> ransaction validations = sum inputs, otherwise reject.  The user better pay
> change if any to a different public key, as the inputs public keys are one
> use - are after the reveal they are DoS lockable by other people reposting
> H( input-pub ).
>
> The input-pub coin is locked as normal transactions have their public key hash
> validate as not being locked.
>
> Adam
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