2008-04-01 17:23:44 +02:00
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Filename: 134-robust-voting.txt
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Title: More robust consensus voting with diverse authority sets
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Author: Peter Palfrader
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Created: 2008-04-01
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2009-05-27 20:33:44 +02:00
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Status: Rejected
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History:
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2009 May 27: Added note on rejecting this proposal -- Nick
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2008-04-01 17:23:44 +02:00
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Overview:
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A means to arrive at a valid directory consensus even when voters
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disagree on who is an authority.
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Motivation:
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Right now there are about five authoritative directory servers in the
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Tor network, tho this number is expected to rise to about 15 eventually.
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Adding a new authority requires synchronized action from all operators of
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directory authorities so that at any time during the update at least half of
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all authorities are running and agree on who is an authority. The latter
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requirement is there so that the authorities can arrive at a common
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consensus: Each authority builds the consensus based on the votes from
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all authorities it recognizes, and so a different set of recognized
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authorities will lead to a different consensus document.
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Objective:
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The modified voting procedure outlined in this proposal obsoletes the
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requirement for most authorities to exactly agree on the list of
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authorities.
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Proposal:
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The vote document each authority generates contains a list of
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authorities recognized by the generating authority. This will be
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a list of authority identity fingerprints.
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Authorities will accept votes from and serve/mirror votes also for
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authorities they do not recognize. (Votes contain the signing,
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authority key, and the certificate linking them so they can be
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verified even without knowing the authority beforehand.)
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Before building the consensus we will check which votes to use for
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building:
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1) We build a directed graph of which authority/vote recognizes
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whom.
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2) (Parts of the graph that aren't reachable, directly or
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indirectly, from any authorities we recognize can be discarded
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immediately.)
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3) We find the largest fully connected subgraph.
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(Should there be more than one subgraph of the same size there
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needs to be some arbitrary ordering so we always pick the same.
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E.g. pick the one who has the smaller (XOR of all votes' digests)
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or something.)
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4) If we are part of that subgraph, great. This is the list of
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votes we build our consensus with.
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5) If we are not part of that subgraph, remove all the nodes that
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are part of it and go to 3.
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Using this procedure authorities that are updated to recognize a
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new authority will continue voting with the old group until a
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sufficient number has been updated to arrive at a consensus with
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the recently added authority.
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In fact, the old set of authorities will probably be voting among
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themselves until all but one has been updated to recognize the
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new authority. Then which set of votes is used for consensus
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building depends on which of the two equally large sets gets
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ordered before the other in step (3) above.
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It is necessary to continue with the process in (5) even if we
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are not in the largest subgraph. Otherwise one rogue authority
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could create a number of extra votes (by new authorities) so that
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everybody stops at 5 and no consensus is built, even tho it would
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be trusted by all clients.
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Anonymity Implications:
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The author does not believe this proposal to have anonymity
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implications.
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Possible Attacks/Open Issues/Some thinking required:
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Q: Can a number (less or exactly half) of the authorities cause an honest
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authority to vote for "their" consensus rather than the one that would
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result were all authorities taken into account?
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Q: Can a set of votes from external authorities, i.e of whom we trust either
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none or at least not all, cause us to change the set of consensus makers we
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pick?
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A: Yes, if other authorities decide they rather build a consensus with them
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then they'll be thrown out in step 3. But that's ok since those other
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authorities will never vote with us anyway.
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If we trust none of them then we throw them out even sooner, so no harm done.
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Q: Can this ever force us to build a consensus with authorities we do not
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recognize?
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A: No, we can never build a fully connected set with them in step 3.
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2009-05-27 20:33:44 +02:00
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------------------------------
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I'm rejecting this proposal as insecure.
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Suppose that we have a clique of size N, and M hostile members in the
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clique. If these hostile members stop declaring trust for up to M-1
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good members of the clique, the clique with the hostile members will
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in it will be larger than the one without them.
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The M hostile members will constitute a majority of this new clique
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when M > (N-(M-1)) / 2, or when M > (N + 1) / 3. This breaks our
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requirement that an adversary must compromise a majority of authorities
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in order to control the consensus.
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-- Nick
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