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So I was reading Lamport's paper on Byzantine Generals in which he proves that for T malicious generals you need 2T+1 generals in a group to read a consensus. However I dont understand how. If there are T malicious nodes making up stuff, you just need T+1 votes to outvote them. Why is that not the case?

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There is a section on Wikipedia about this:

One solution considers scenarios in which messages may be forged, but which will be Byzantine-fault-tolerant as long as the number of traitorous generals does not equal or exceed one third. The impossibility of dealing with one-third or more traitors ultimately reduces to proving that the 1 Commander + 2 Lieutenants problem cannot be solved, if the Commander is traitorous. The reason is, if we have three commanders, A, B, and C, and A is the traitor: when A tells B to attack and C to retreat, and B and C send messages to each other, forwarding A's message, neither B nor C can figure out who is the traitor, since it isn't necessarily A – the other commander could have forged the message purportedly from A. It can be shown that if n is the number of generals in total, and t is the number of traitors in that n, then there are solutions to the problem only when n is greater than or equal to 3t + 1

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Yeah Lamport's paper shows that we can reduce the problem of fewer than 3m general's where m is the number of malicious generals to a 3 general's problem and hence show it is impossible to reach a consensus in that case. However that still doesnt make sense to me and also I dont understand why majority voting won't work. Suppose there are 9 generals in total with 4 malicious generals and 5 good generals and the 5 good generals say "attack" whereas the rest of the 4 say "retreat". if they go by majority voting the good generals will attack which is what we want. – Abdul Rahman Oct 25 '12 at 12:29
    
I suppose the problem is that the 5 good generals have a hard time to agree on "attack" when two of them have been told to "retreat" by their malicious commander. – Thilo Oct 25 '12 at 12:35

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