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CS 312: Algorithm Analysis

This work is licensed under a Creative Commons Attribution-Share Alike 3.0 Unported License . CS 312: Algorithm Analysis. Lecture #5: Public-Key Cryptography with RSA. Slides by: Eric Ringger, with contributions from Mike Jones, Eric Mercer, Sean Warnick. Announcements. HW #3 Due Now

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CS 312: Algorithm Analysis

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  1. This work is licensed under a Creative Commons Attribution-Share Alike 3.0 Unported License. CS 312: Algorithm Analysis Lecture #5: Public-Key Cryptography with RSA Slides by: Eric Ringger, with contributions from Mike Jones, Eric Mercer, Sean Warnick

  2. Announcements • HW #3 Due Now • Project #1 • Early: today (by 5pm) • Due: Wednesday (by 5pm) • Holiday: Monday • Next topic: Divide and Conquer • Beginning Wednesday

  3. Objectives • Understand the big picture for cryptography • Introduce Public Key Cryptography • Apply all of our favorite algorithms to define RSA • Understand why RSA is secure

  4. Punch-Line • RSA • Named after Rivest, Shamir, Adleman • Gives strong guarantees of security • Exploits: • Polynomial time computability of: • Modular Exponentiation – modexp() • Greatest Common Divisor – extended-Euclid() • Fermat Primality Testing – primality2() • Intractability of: • Factoring • Modular root finding

  5. Cryptography • Alice and Bob want to communicate in private • Eve is an eavesdropper • Alice wants to send message x to Bob • She encrypts clear-text with • She sends the cypher-text to Bob • Bob decrypts with • Goal: If Eve intercepts , without she can do nothing.

  6. Cryptography • Past: private key protocols • Exchange codebook • E.g., One-time Pad • E.g., AES (Advanced Encryption Standard) • Present: public key protocols • Never need to meet • eBob() is publicly available • Only Bob possesses dBob() • Alice can quickly run eBob() • Bob can quickly run dBob() • Without dBob(), Eve must perform operations like factoring large numbers. Have fun! • E.g., RSA

  7. Public Key Cryptography Bob Alice Publishes his public key Thanks to Diffie, Hellman, and Merkle

  8. Public Key Cryptography Bob Alice Get’s Bob’spublic key Thanks to Diffie, Hellman, and Merkle

  9. Public Key Cryptography Bob Alice Uses the key to encrypt her message

  10. Public Key Cryptography Bob Alice Sends the encrypted message over an open channel

  11. Public Key Cryptography Bob Alice Uses private knowledge to decrypt the message sends the encrypted message over an open channel

  12. Public Key Cryptography • RSA: • Messages from Alice and Bob are numbers modulo N • Messages larger than N are broken into blocks • Encryption is a bijection on {0,1, …, N-1} • i.e., a permutation • Decryption is its inverse Function that is both one-to-one and onto

  13. Number Theory • Let and be any two primes • Let • Let “the totient” • Let be a number relatively prime to • Then • is a bijection on • Let = the multiplicative inverse of mod. • Then • is also a bijection on • Furthermore, for all ,

  14. Key Generation Bob needs to generate his public and private keys. • He picks two large -bit random primes and (how?) • What role should primality2() play? • Test random -bit numbers: to find one • Public key is • Where • Where is an (at most) -bit number relatively prime to • Often , which permits fast encoding • Private key is , the multiplicative inverse ofmodulo • How to compute? • extended-Euclid((p-1)(q-1), e) That should help with exercise HW#4: 1.27

  15. Sending Messages Alice wants to send to Bob • She looks up his public key • She encodes • How to compute? • He receives and decodes it: • How to compute? That’s it!

  16. Example • Let p = 5; q = 11 • Let N = p * q = 55 • Let e = 3 • gcd(e, (p-1)(q-1)) = • Thus, public key = (N, e) = (55, 3) • Private key: d = 3-1 mod 40 = 27 • Encryption of x: y = x3 mod 55 • Decryption of y: x = y27 mod 55 • Let x = 13 • y  133 52 (mod 55) • x = 5227 mod 55 = 13

  17. How Safe is RSA? • There are two main attacks. • The first: • Factor the public key N into its primes • Invert to get • Given and (ciphertext), compute using modular exponentiation. • Factoring is hard, but nobody knows how hard. • It is unlikely to be in either P or NP-complete.

  18. How Safe is RSA? • The second attack involves computing • Reasoning: y1/e  (xe (mod N))1/e • (xe)1/e • x (mod N) • However, there is no known efficient algorithm for finding modular roots.

  19. Brute Force Attacks • Try all values of – harder than factoring • Try all primes from 1 to • Use computers: require time to crack

  20. The Punch-line • The crux of the security behind RSA • Efficient algorithms / Polynomial time computability of: • Modular Exponentiation – modexp() • Greatest Common Divisor – extended-Euclid() • Primality Testing – primality2() • Absence of efficient algorithms / Intractability of: • Factoring • Modular root finding

  21. Using Public Key Authentication • PGP (Pretty Good Privacy) uses Fermat in it's primality test. • SSH: use ssh-keygen to generate a suitable pair of keys. • The prime number is tested using two methods. • The second of which is Miller-Rabin and some filtering based on known composites • (see source code) • From man ssh: • Put your public key on the server (presumably because anyone can see your server) • Put your private key on your client (because you control it). • ssh can use public key authentication to verify that you are who you say you are without a password. • "the server checks if this key is permitted • if so, sends the user (actually the ssh program running on behalf of the user) a challenge, a random number, encrypted by the user's public key • The challenge can only be decrypted using the proper private key. • The user's client then decrypts the challenge using the private key, proving that he/she knows the private key but without disclosing it to the server.“

  22. RSA and SSH client server [public key] [private key] login encrypt a random number decrypt the random number If numbers match, then you must have the private key

  23. Thoughts • Security of this scheme remains unproven • Factoring large numbers into their primes may turn out to be easy or unnecessary to break the code • Can you break it, or prove it is hard to break? • Are there other “one-way” functions to do the job? • Can we approximately break the code—derive a message m within provable bounds of the clear-text x? • Are there alternative handshaking schemes to facilitate private communication without prior coordination? • Need creative minds on this problem (cool jobs at NSA)

  24. Assignment • Read: Sections 2.1 & 2.2 • HW #4: 1.27, 2.1, 2.5(a-e) using the Master Theorem • Due next Friday because • Holiday on Monday • Proj. #1 is due Wednesday

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