Hi ZmnSCPxj, 

That's a good point. Basically there are two extremes, if everyone is non-myoptic (rational), they should wait even for a small fee (our mad-htlc result), and if everyone else is myopic (rational), a non-myopic miner should only wait for a fairly large fee, depending on miner sizes and the timeout -- this is analyzed in an earlier paper by Winzer, Herd and Faust [1]. In a mixed situation the calculation becomes slightly more involved, but qualitatively it's closer to the Wizner et al. result, namely the bribe should grow exponentially with the timeout, which is bad for the attacker. But mad-htlc avoids myopic assumptions, allowing you to keep your contracts safe either way. 

Best, 
Ittay 

[1] F. Winzer, B. Herd and S. Faust, "Temporary Censorship Attacks in the Presence of Rational Miners," 2019 IEEE European Symposium on Security and Privacy Workshops (EuroS&PW), Stockholm, Sweden, 2019, pp. 357-366, doi: 10.1109/EuroSPW.2019.00046.

On Mon, Jun 29, 2020 at 9:05 PM ZmnSCPxj <ZmnSCPxj@protonmail.com> wrote:
Good morning Dave, et al.,


> >      Myopic Miners: This bribery attack relies on all miners
> >
> >
> > being rational, hence considering their utility at game conclu-
> > sion instead of myopically optimizing for the next block. If
> > a portion of the miners are myopic and any of them gets to
> > create a block during the first T − 1 rounds, that miner would
> > include Alice’s transaction and Bob’s bribery attempt would
> > have failed.
> > In such scenarios the attack succeeds only with a certain
> > probability – only if a myopic miner does not create a block
> > in the first T − 1 rounds. The success probability therefore
> > decreases exponentially in T . Hence, to incentivize miners
> > to support the attack, Bob has to increase his offered bribe
> > exponentially in T .
>
> This is a good abstract description, but I think it might be useful for
> readers of this list who are wondering about the impact of this attack
> to put it in concrete terms. I'm bad at statistics, but I think the
> probability of bribery failing (even if Bob offers a bribe with an
> appropriately high feerate) is 1-exp(-b*h) where `b` is the number of
> blocks until timeout and `h` is a percentage of the hashrate controlled
> by so-called myopic miners. Given that, here's a table of attack
> failure probabilities:
>
> "Myopic" hashrate
> B 1% 10% 33% 50%
> l +---------------------------------
> o 6 | 5.82% 45.12% 86.19% 95.02%
> c 36 | 30.23% 97.27% 100.00% 100.00%
> k 144 | 76.31% 100.00% 100.00% 100.00%
> s 288 | 94.39% 100.00% 100.00% 100.00%
>
> So, if I understand correctly, even a small amount of "myopic" hashrate
> and long timeouts---or modest amounts of hashrate and short
> timeouts---makes this attack unlikely to succeed (and, even in the cases
> where it does succeed, Bob will have to offer a very large bribe to
> compensate "rational" miners for their high chance of losing out on
> gaining any transaction fees).
>
> Additionally, I think there's the problem of measuring the distribution
> of "myopic" hashrate versus "rational" hashrate. "Rational" miners need
> to do this in order to ensure they only accept Bob's timelocked bribe if
> it pays a sufficiently high fee. However, different miners who try to
> track what bribes were relayed versus what transactions got mined may
> come to different conclusions about the relative hashrate of "myopic"
> miners, leading some of them to require higher bribes, which may lead
> those those who estimated a lower relative hash rate to assume the rate
> of "myopic" mining in increasing, producing a feedback loop that makes
> other miners think the rate of "myopic" miners is increasing. (And that
> assumes none of the miners is deliberately juking the stats to mislead
> its competitors into leaving money on the table.)

A thought occurs to me, that we should not be so hasty to call non-myopic strategy "rational".
Let us consider instead "myopic" and "non-myopic" strategies in a population of miners.

I contend that in a mixed population of "myopic" and "non-myopic" miners, the myopic strategy is dominant in the game-theoretic sense, i.e. it might earn less if all miners were myopic, but if most miners were non-myopic and a small sub-population were myopic and there was no easy way for non-myopic miners to punish myopic miners, then the myopic miners will end up earning more (at the expense of the non-myopic miners) and dominate over non-myopic miners.
Such dominant result should prevent non-myopic miners from arising in the first place.

The dominance results from the fact that by accepting the Alice transaction, myopic miners are effectively deducting the fees earned by non-myopic miners by preventing the Bob transaction from being confirmable.
On the other hand, even if the non-myopic miners successfully defer the Alice transaction, the myopic miner still has a chance equal to its hashrate of getting the Bob transaction and its attached fee.
Thus, myopic miners impose costs on their non-myopic competitors that non-myopic miners cannot impose their myopic competitors.
If even one myopic miner successfully gets the Alice transaction confirmed, all the non-myopic miners lose out on the Bob bribe fee.

So I think the myopic strategy will be dominant and non-myopic miners will not arise in the first place.


Regards,
ZmnSCPxj