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Quantum Money Scott Aaronson (MIT) Based partly on joint work with Ed Farhi, David Gosset, Avinatan Hassidim, Jon Kelner, Andy Lutomirski, and Peter Shor Ever since there’s been money, there’ve been people trying to counterfeit it One of the oldest “security problems” facing human civilization; has to be solved reasonably well before a market economy becomes possible In his capacity as Master of the Mint, Isaac Newton added milled edges to English coins to make them harder to counterfeit (Newton also personally oversaw hangings of many counterfeiters) Today: Holograms, embedded strips, “microprinting,” special inks… Leads to an arms race with no obvious winner Problem: From a CS perspective, uncopyable cash seems impossible for trivial reasons Any printing technology the good guys can build, bad guys can in principle build also x (x,x) is a polynomial-time operation What’s done in practice: Have a trusted third party (the bank) authorize every transaction OK, but there are some cases where you want the convenience, privacy, and anonymity of cash, and it seems you can never make cash cryptographically secure Indeed you can’t, in classical physics… Uncertainty Principle: You can measure a particle’s position, or its momentum, but not both to unlimited precision Logical consequence: No-Cloning Theorem First Idea in the History of Quantum Info Wiesner 1969: Money that’s impossible to counterfeit, assuming only the validity of quantum mechanics Each bill includes a few hundred qubits (say electrons), secretly polarized in one of four random directions In a giant database, the bank remembers how it polarized every electron on every bill Want to verify a bill? Take it to the bank. Bank uses its knowledge of the polarizations to measure each electron in the appropriate basis: or Theorem: A counterfeiter who doesn’t know a bill’s state can copy it with probability at most (5/6)n (where n is the number of electrons per bill) Drawbacks of Wiesner’s scheme? 1. Need to keep bills from decohering in your wallet! 2. Bank needs to maintain a giant polarization database Solution (Bennett et al. ‘82): Pseudorandom functions 3. Only the bank knows how to authenticate the bills No analogue of a convenience-store clerk holding up a bill to the light Which brings us to… Public-Key Quantum Money (Secure Quantum Money That Anyone Can Authenticate) Overview of Results [A., CCC 2009] Public-key quantum money requires computational assumptions Secure public-key quantum money is possible, if counterfeiters only have black-box access to checking device (Already nontrivial: “Complexity-Theoretic No-Cloning Theorem”) “Explicit” (non-black-box) candidate scheme, based on random stabilizer states [AFGHKLS, submitted, 2009] Break of Aaronson’s scheme New candidate scheme, where not even the bank can duplicate a bill (Security assumption: Our scheme can’t be broken) Related task [A., CCC’09]: Quantum software copy-protection “Generic” copy-protection secure against black-box adversaries Explicit candidate schemes for copy-protecting the family of point functions Definition of Quantum Money Schemes n: Security parameter (all computations should be polynomial in n) B: Poly-size quantum circuit (the “bank”), which maps a secret key s{0,1}n to a public key es and quantum banknote s A: Poly-size quantum circuit (the “authenticator”), which takes (e,) as input and either accepts or rejects (B,A) has completeness error if for every s, PrAes , s accepts 1 . (B,A) has soundness error if for every poly(n)-size quantum circuit C (the “counterfeiter”) mapping sk to r>k output r 1 r registers s ,…, s , i PrAe , accepts k . i 1 s s Counterfeiter only gets s: scheme is private-key Counterfeiter gets both s and es: scheme is public-key Goal: A public-key scheme where completeness error and soundness error are both exponentially small Question: Does verifying a bill also destroy it? Answer: Not if is small enough! Theorem: No public-key quantum money scheme can be information-theoretically secure. Proof Sketch: A counterfeiter with unlimited computation time can do this… Let U be an ensemble of possible quantum money states Initially, U0 contains s for every s{0,1}n For t:=0 to n-1 { If the legitimate authenticator As* accepts a random state from Ut with high probability, we’re done! Otherwise, get a legitimate quantum money state s* Find an authenticator As that rejects most states in Ut, but accepts s* Let Ut+1 be the set of states in Ut that As accepts w.h.p. } Public-Key Quantum Money Secure Against Black-Box Adversaries Doesn’t Wiesner’s scheme already provide this? No! A counterfeiter could copy a bill, by using the checking device to figure out the polarization of one qubit at a time… Solution: The bank chooses an n-qubit quantum money state | uniformly at random under the Haar measure The checking device, U, accepts | and rejects every state orthogonal to | Key Question: Can a counterfeiter create additional copies of |, using k=poly(n) copies of | together with poly(n) queries to U? If the counterfeiter only had |k, and not U: No, by the No-Cloning Theorem If the counterfeiter only had U, and not |k: No, by the optimality of Grover’s search algorithm U must be queried (2n/2) times to find | But what if the counterfeiter has both? Complexity-Theoretic No-Cloning Theorem Let | be an n-qubit state. Suppose we’re given |k, as well as a black box U that accepts | and rejects all states orthogonal to |. Then to prepare r>k states 1,…,r such that r i 1 i k , we need this many queries to U: 2 2n 2 r r k log k Proof requires generalizing Ambainis’s adversary method, to the case where the quantum algorithm’s initial state already encodes some information about the target state Explicit Candidate Scheme A stabilizer state is a state obtainable from |0…0 by applying Hadamard, Controlled-NOT, and Phase gates only: 1 1 1 1 0 , 0 2 1 1 0 0 1 0 0 0 0 0 1 0 0 , 1 0 1 0 These states can 0 i always be efficiently prepared! In my scheme, a dollar bill consists of: L random stabilizer states |C1,…,|CL on n qubits each A table of measurements to apply to the |Ci’s A (conventional) digital signature of the table The table: C1 M 11 M 12 M 13 M14 For each |Ci, we have lots C2 C3 of random garbage M 21 M 31 measurements, but also a M 22 M 32 secret fraction that M 23 M 33 commute with |Ci M 24 M 34 Hope: Learning classical of the |Ci’s, or descriptions copying them in any other way, To verify a bill:intractable is computationally (a “noisy problem”) 1. Verify the table’s digital parity signature 2. For each i, apply a random measurement Mij to |Ci 1 3. Accept if more than of the measurements do 2 2 Breaking Aaronson’s Scheme Two cases: 1. is extremely small. Then the test is “too weak,” and we can guess our own states |Ci that pass the test 2. is reasonably large. Then for to each |Ci, consider a Here we’re able adapt an graph of the possible measurements, with an eigenvector-based algorithm ofedge between Mij and Mik iff they commute with each other: Alon, Krivelevich, and Sudakov (SODA’98) for finding large planted The “secret” measurements Mi1 M i6 cliques in random graphs with |Ci also that commute Mi2 Mi5 Mi3 Mi4 commute with each other. Thus, the problem reduces to finding a “planted clique” in a random-looking graph. Our New Scheme 1 n/2 2 1 x,x,r , hm x 2nnx/ 2rr1h, 1sig m n x0,1 x0 ,1 1. Start with an equal superposition over all n-bit strings 2. Compute randomly-chosen hash functions h1,…,hm:{0,1}n{0,1} (with m ~ n) 3. Measure h1(x),…,hm(x), leaving a superposition | over all x’s for which h1,…,hm take on prescribed values r1,…,rm 4. As the dollar bill, distribute |, r=(r1,…,rm), and a conventional digital signature of r To verify a bill ||r|sig(r): 1. Verify r’s digital signature. 2. Construct a Markov chain M, whose stationary distribution is uniform over the set S = {x : h1(x)=r1,…,hm(x)=rm}. Using M, verify that | is an equal superposition over S. Conjecture: Any quantum algorithm needs exponential time to copy | Striking feature of this scheme: The bank can’t copy |, any more than a counterfeiter can!! Nor (we believe) can the bank efficiently create two bills with the same “serial number” r Unlike with the stabilizer scheme, here there’s no obvious “classical secret” that lets you copy a bill if you learn it Quantum Software Copy-Protection Finally, a serious use for quantum computing We know copy-protection is fundamentally impossible in the classical world (not that that’s stopped people from trying…) Question: Can you have a quantum state |f that lets you efficiently compute an unknown Boolean function f:{0,1}n{0,1}, but can’t be efficiently used to prepare more states that also let you efficiently compute f? A task closely related to quantum money—which like the latter, seems “on the verge of being possible” Question: When you run a “quantum program” |f, do you also destroy that program? For the software company, maybe that would be a feature, not a bug! However, if you buy k copies of |f, for some k=poly(n), you can make the “damage” to |fk on each run exponentially small One Implication: Any quantum copy-protection scheme will have to rely on computational assumptions (just like the public-key quantum money schemes) Obvious obstruction to copy-protection: Suppose you could efficiently learn f, given oracle access to f. Then there’s no hope of copy-protecting f, using quantum mechanics or anything else. Theorem: Modulo that obstruction, it’s possible to quantumly copy-protect any family of functions, provided the pirates have only black-box access to the device that measures the states |f. Proof follows the same outline as black-box security proof for quantum money, but is more complicated Need to construct a “simulator,” which converts any algorithm for pirating |f into an algorithm for learning f Copy-Protecting Point Functions Point function: Think: The UNIX password program 1 if x s f s x 0 otherwise Except, given the quantum program |s, we want it to be hard not merely to learn the password s, but even to create more programs able to recognize s! Possible Solution: Use s to generate a pseudorandom quantum circuit Us, then set s : U s 00 To compute fs(x), measure U x1 s in the standard basis, and see if you get back the all-0 string Summary Unforgeable money (and copy-protected software, etc.) remains one of the most striking potential applications of quantum mechanics to computer science So we’ve been revisiting this 40-year-old idea using the arsenal of modern CS theory Biggest challenge: Secure quantum money that anyone can verify (not just the bank) I showed how to achieve this in the ‘black-box world’ But in the ‘real’ world, finding a scheme that withstands attack is harder than it looks! Maybe we found one anyway; time will tell Open Problems Can we base the security of public-key quantum money on a “standard” cryptographic assumption? How about copyprotection? Can we copy-protect anything besides point functions? Can we get provably-secure public-key quantum money, with the help of only a classical black box? Other “non-cloneable functionalities”: keys? ID cards? Can we keep a quantum money state coherent for more than a few seconds?