Well in fact this is a question that I will pose the room as whole: Alice has a database of phone numbers. Bob needs to check whether a given phone number is in Alice's database. Bob does not want to give that phone number to Alice until he knows that she doesn't have it already. Alice does not want to give Bob direct access to her database.
That's impossible, right? Or is there some clever mechanism I am missing? I pinged you directly @ScottArciszewski because it seems similar to public key cryptography and you have a good grasp of cryptography theory (better than me, anyway).
@DaveRandom Sounds impossible, both Alice and Bob don't want to exchange information for "free" without some assurances, which they can only get by exchanging that specific information. So, yeah that's a problem.
@DaveRandom Bob can give Alice his public key and the encrypted phone number (with his public key), Alice encrypts phone number with public key and checks if it matches
@SergeyTelshevsky Use case: Bob is passing sales leads to Alice, Alice only accepts a lead if she doesn't already have it, Bob don't want to give out a lead's information unless he knows Alice is going to buy it (otherwise Alice could just take the number and poach the lead).
@FlorianMargaine I can't see how that would work, are you saying bob encrypts with the pubkey (and alice cannot decrypt), but she can also encrypt every number with that pubkey to compare?
So a hashing mechanism would need to be something that cannot be easily reversed with a brute-force attack (the plain text is of a known length and the first character is known, the entropy is also very low because everything is digits)
it is, but you can't reverse the hash, leaving you back at the step where you'd have to re-hash every number with the supplied salt, and with bcrypt that is really expensive :p
@FlorianMargaine Yes, but Bob would have to use a known salt for each phone number otherwise it wouldn't be indexable. And unless you use a constant salt, you'd be able to derive the number (or a list of candidates) from the salt
I think in this use case using something that's not practical to brute force within, say a day or two on mediocre commercial hardware would suffice (I'm not trading data with Google)
@SergeyTelshevsky for password hashing? something used by millions of people and reviewed by a lot of security researchers? (including @ircmaxell) yes, that's an argument :)
@DaveRandom uh... that sounds very hard to not brute force easily, no matter what the hashing mechanism is, only if the hashing itself is voluntarily super slow
@DaveRandom hang on... bob doesn't want to give it to alice until he has proven that she doesn't have it? If she already has it, it doesn't matter if she is given it again...
unless it's a deal where he'd sell it to her if she doesn't have it
Alice won't accept leads she already has, but Bob doesn't want to leak information so Alice can't claim she already has it when she doesn't and then steal it
(I'm not sure why this can't just be done with some legals but I do what I'm told)
Well, if it's practical. But I'm thinking the correct answer here is "no, you can't have it".
Assuming a publicly known set $\Psi$ with $N$ unique elements.
I have a set $\Sigma=\{\sigma_1,\sigma_2,...,\sigma_m\}$ where $m\leqslant N$. I would like to publicly prove that all the elements in $\Sigma$ are unique and are also elements of $\Psi$. I would like to do this without actually rev...
@Leigh I've sent a summary of this conversation and the problems highlighted to the dev at the other end, I'll see where it goes from here. Thanks for your thoughts though, it has definitely helped me to understand the problem better, if nothing else
Lets see if we can dig up any problems arising from a fixed bcrypt/scrypt salt, if you aim for a minimum of 1 second to hash, you're still looking at over 300 years for a full table of every number (including ones that don't make sense)
and lets face it, anything over 5 years is someone elses problem ;)
@FlorianMargaine I'm not sure about this, Alice doesn't want to have to do several days of re-hashing every couple of years
Note also that I have no idea what the size of the pool of numbers is, so it may not actually be practical to generate all those hashes in the first place
@NikiC I'd be thankful if you could give this opcache issue a look … I doubt my ~20 added lines are fundamentally wrong… I wouldn't be surprised if there's a deeper issue in opcache…
@DaveRandom I can't come up with a good scheme that isn't susceptible to either a precomputed brute force (mitigated by computational overhead), or requires a transformation applied to the entire set for each query... Thinking of a hybrid approach where numbers are split into buckets, but it becomes easier to brute force as the bucket fills
Well in fact this is a question that I will pose the room as whole: Alice has a database of phone numbers. Bob needs to check whether a given phone number is in Alice's database. Bob does not want to give that phone number to Alice until he knows that she doesn't have it already. Alice does not want to give Bob direct access to her database.
@Leigh With the cost of pre-computing the brute force lookup table on the order of years I may be able to sell it. In this real-world use case, it's a safe assumption that alice is not going to devote the computing time to it, the monetary cost would be too high to make it worthwhile (these are SMEs, at the end of the day, they don't have spare tin to throw at this because they payoff is too low)
It doesn't need to be a perfect solution, only "good enough™"
@NikiC there are range proof systems, but they seem to be for proving a single item, not whether the item is part of a set. The set only contains up to 3 billion potential values, so feasible to brute force
@NikiC It's not really, with a password protocol you narrow down the item being proven to one, by username/id
Set contains unknown number of elements, but maximum of 3 billion
@kelunik This is what we've suggested, A maintains a DB of values and hashes, where the hashes are computationally expensive, but can be indexed for a decent search speed
And B queries with the hash, and the computational overhead isn't too bad for the one-off query
Assuming a publicly known set $\Psi$ with $N$ unique elements.
I have a set $\Sigma=\{\sigma_1,\sigma_2,...,\sigma_m\}$ where $m\leqslant N$. I would like to publicly prove that all the elements in $\Sigma$ are unique and are also elements of $\Psi$. I would like to do this without actually rev...
