The best known theoretical attack is Grover’s quantum search algorithm. As you pointed out, this allows us to search an unsorted database of n entries in n−−√ operations. As such, AES-256 is secure for a medium-term against a quantum attack, however, AES-128 can be broken, and AES-192 isn’t looking that good.
With the advances in computational power (doubling every 18 months), and the development of quantum computers, no set keysize is safe indefinitely. The use of Grover is just one of the gigantic leaps.
I would still class AES as quantum resistant, so long as the best-known attack is still some form of an exhaustive search of the keyspace.
How big are your packets at that point? Seems like you’re steadily clogging up your web traffic and setting yourself up for disruption vulnerability down the line if your only response is to inflate the size of every message.
It’s not enough to simply have your data be secure. You need it to be reliable. And larger packets require more bandwidth which means more robust hardware and more reliable transmission equipment. Also cuts into the viability of stealthy communications if you know the minimum transmission size of your adversary.
Technically correct. You would buy time well past the end of the universe. Advances in either quantum or conventional computers would not change this. There are theoretical limits at play.
Now, maybe you can find a way to substantially reduce the difficulty of breaking it over brute force. Cryptographers have been trying to break AES for 30 years now and haven’t found one that does more than marginal improvement. But it’s possible.
Nobody is wanting to make a magical algorithm that gets the input to the hash.
I mean, there’s provably at least one person who does, but there are infinite inputs that lead to the same hash.
Breaking a hash is being able to easily create new input data that leads to the same hash (with or without the constraint of needing the original input data)
So, I haven’t read up on this quantum attack stuff, and I don’t know what Kairos is referring to, but setting aside quantum computing for the moment, breaking a cryptographic hash would simply require being able to find a hash collision, finding another input to a hash function that generates the same hash. It wouldn’t require being able to reconstitute the original input that produced the hash. That collision-finding can be done – given infinite conventional computational capacity, at any rate – simply from the hash; you don’t need additional information.
In contrast to the threat quantum computing poses to current public-key algorithms, most current symmetric cryptographic algorithms and hash functions are considered to be relatively secure against attacks by quantum computers.[2][11] While the quantum Grover’s algorithm does speed up attacks against symmetric ciphers, doubling the key size can effectively block these attacks.[12] Thus post-quantum symmetric cryptography does not need to differ significantly from current symmetric cryptography.
The citation there is from a 2010 paper, which is old and is just saying that this is believed to be the case.
This page, a year old, says that it is believed that the weakening from use of Grover’s algorithm is not sufficient to make AES-128 practically breakable, and that at some point in recent years it was determined that the doubling was not necessary.
Keeping in mind that I am about twenty years behind the current situation and am just skimming this, it sounds like the situation is that one cannot use an attack that previously had been believed to be a route to break some shorter key length AES using quantum computing, so as things stand today, we don’t know of a practical route to defeat current-keylength AES using any known quantum computing algorithm, even as quantum computers grow in capability.
Oh so both hashes and synmetric cryptography are secure entirely by doubling up the key size.
That’s not my understanding, which is that it’s more-secure than that and doesn’t require the doubling. Assuming the pages I linked are correct and that the understanding of them from my skim is correct, both of which may not be true:
About a decade-and-a-half ago, it was believed that AES of existing key lengths could be attacked via a known quantum algorithm – Grover’s algorithm – using future quantum computers. However, the weakness induced was not sufficient to render AES of all key lengths practically vulnerable. it would be viable to simply increase key lengths, not redesign AES, sufficient to make it not attackable via any kind of near-future quantum computers.
At some point subsequent to that, it was determined that this attack would not be practical, even with the advance of quantum computers. So as things stand, we should be able to continue using AES with current keylengths without any kind of near-future quantum computer posing a practical risk.
Take all that with a huge grain of salt, as I’m certainly not well-versed in the state of quantum cryptography, and I’m just summarizing a few webpages which themselves may be wrong. But if it’s correct, you were right originally that there aren’t going to be near-term practical attacks on AES from the advance of quantum computing, not from any presently-known algorithm, at least.
I have not been following the quantum computing attacks on cryptography, so I’m not current here at all.
I can believe that current AES in general use cannot be broken by existing quantum computers.
But if what you’re saying is that AES cannot be broken by quantum computing at all, that doesn’t seem to be what various pages out there say.
https://crypto.stackexchange.com/questions/6712/is-aes-256-a-post-quantum-secure-cipher-or-not
Bump AES to a min 1024 and you buy time.
How big are your packets at that point? Seems like you’re steadily clogging up your web traffic and setting yourself up for disruption vulnerability down the line if your only response is to inflate the size of every message.
It’s not enough to simply have your data be secure. You need it to be reliable. And larger packets require more bandwidth which means more robust hardware and more reliable transmission equipment. Also cuts into the viability of stealthy communications if you know the minimum transmission size of your adversary.
Technically correct. You would buy time well past the end of the universe. Advances in either quantum or conventional computers would not change this. There are theoretical limits at play.
Now, maybe you can find a way to substantially reduce the difficulty of breaking it over brute force. Cryptographers have been trying to break AES for 30 years now and haven’t found one that does more than marginal improvement. But it’s possible.
Then why are hashes secure?
Because you cannot reverse a hash. Information is lost from the result.
Nobody is wanting to make a magical algorithm that gets the input to the hash.
I mean, there’s provably at least one person who does, but there are infinite inputs that lead to the same hash.
Breaking a hash is being able to easily create new input data that leads to the same hash (with or without the constraint of needing the original input data)
So, I haven’t read up on this quantum attack stuff, and I don’t know what Kairos is referring to, but setting aside quantum computing for the moment, breaking a cryptographic hash would simply require being able to find a hash collision, finding another input to a hash function that generates the same hash. It wouldn’t require being able to reconstitute the original input that produced the hash. That collision-finding can be done – given infinite conventional computational capacity, at any rate – simply from the hash; you don’t need additional information.
I’m not sure I follow. Could you expand on that?
EDIT: Wikipedia says this:
https://en.wikipedia.org/wiki/Post-quantum_cryptography
The citation there is from a 2010 paper, which is old and is just saying that this is believed to be the case.
This page, a year old, says that it is believed that the weakening from use of Grover’s algorithm is not sufficient to make AES-128 practically breakable, and that at some point in recent years it was determined that the doubling was not necessary.
https://crypto.stackexchange.com/questions/102671/is-aes-128-quantum-safe
Keeping in mind that I am about twenty years behind the current situation and am just skimming this, it sounds like the situation is that one cannot use an attack that previously had been believed to be a route to break some shorter key length AES using quantum computing, so as things stand today, we don’t know of a practical route to defeat current-keylength AES using any known quantum computing algorithm, even as quantum computers grow in capability.
Oh so both hashes and synmetric cryptography are secure entirely by doubling up the key size. Interesting.
You know way more than I do.
That’s not my understanding, which is that it’s more-secure than that and doesn’t require the doubling. Assuming the pages I linked are correct and that the understanding of them from my skim is correct, both of which may not be true:
About a decade-and-a-half ago, it was believed that AES of existing key lengths could be attacked via a known quantum algorithm – Grover’s algorithm – using future quantum computers. However, the weakness induced was not sufficient to render AES of all key lengths practically vulnerable. it would be viable to simply increase key lengths, not redesign AES, sufficient to make it not attackable via any kind of near-future quantum computers.
At some point subsequent to that, it was determined that this attack would not be practical, even with the advance of quantum computers. So as things stand, we should be able to continue using AES with current keylengths without any kind of near-future quantum computer posing a practical risk.
Take all that with a huge grain of salt, as I’m certainly not well-versed in the state of quantum cryptography, and I’m just summarizing a few webpages which themselves may be wrong. But if it’s correct, you were right originally that there aren’t going to be near-term practical attacks on AES from the advance of quantum computing, not from any presently-known algorithm, at least.
Hahses don’t use encryption
All we need to do to make AES secure is double the size of the key. That’s it.
And fix the fact that it’s really hard to implement without gaping side channel vulnerabilities, but that’s not really a quantum computer problem.