1. Key Management Network Systems Security Mort Anvari

2. 9/16/20042 Key Management Asymmetric encryption helps address key distribution problems Two aspects distribution of public keys use of public-key encryption to distribute secret keys

3. 9/16/20043 Distribution of Public Keys Four alternatives of public key distribution Public announcement Publicly available directory Public-key authority Public-key certificates

4. 9/16/20044 Public Announcement Users distribute public keys to recipients or broadcast to community at large E.g. append PGP keys to email messages or post to news groups or email list Major weakness is forgery anyone can create a key claiming to be someone else and broadcast it can masquerade as claimed user before forgery is discovered

5. 9/16/20045 Publicly Available Directory Achieve greater security by registering keys with a public directory Directory must be trusted with properties: contains {name, public-key} entries participants register securely with directory participants can replace key at any time directory is periodically published directory can be accessed electronically Still vulnerable to tampering or forgery

6. 9/16/20046 Public-Key Authority Improve security by tightening control over distribution of keys from directory Has properties of directory Require users to know public key for the directory Users can interact with directory to obtain any desired public key securely require real-time access to directory when keys are needed

7. 9/16/20047 Public-Key Authority

8. 9/16/20048 Public-Key Certificates Certificates allow key exchange without real- time access to public-key authority A certificate binds identity to public key usually with other info such as period of validity, authorized rights, etc With all contents signed by a trusted Public- Key or Certificate Authority (CA) Can be verified by anyone who knows the CA’s public key

9. 9/16/20049 Public-Key Certificates

10. 9/16/200410 Distribute Secret Keys Using Asymmetric Encryption Can use previous methods to obtain public key of other party Although public key can be used for confidentiality or authentication, asymmetric encryption algorithms are too slow So usually want to use symmetric encryption to protect message contents Can use asymmetric encryption to set up a session key

11. 9/16/200411 Simple Secret Key Distribution Proposed by Merkle in 1979 A generates a new temporary public key pair A sends B the public key and A’s identity B generates a session key K s and sends encrypted K s (using A’s public key) to A A decrypts message to recover K s and both use

12. 9/16/200412 Problem with Simple Secret Key Distribution An adversary can intercept and impersonate both parties of protocol A generates a new temporary public key pair {KU a, KR a } and sends KU a || ID a to B Adversary E intercepts this message and sends KU e || ID a to B B generates a session key K s and sends encrypted K s (using E’s public key) E intercepts message, recovers K s and sends encrypted K s (using A’s public key) to A A decrypts message to recover K s and both A and B unaware of existence of E

13. 9/16/200413 Distribute Secret Keys Using Asymmetric Encryption if A and B have securely exchanged public-keys ?

14. 9/16/200414 Problem with Previous Scenario Message (4) is not protected by N 2 An adversary can intercept message (4) and replay an old message or insert a fabricated message

15. 9/16/200415 Order of Encryption Matters What can be wrong with the following protocol? A  B:N B  A:E KUa [E KRb [K s ||N]] An adversary sitting between A and B can get a copy of secret key K s without being caught by A and B!

16. 9/16/200416 Diffie-Hellman Key Exchange First public-key type scheme proposed By Diffie and Hellman in 1976 along with advent of public key concepts A practical method for public exchange of secret key Used in a number of commercial products

17. 9/16/200417 Diffie-Hellman Key Exchange Use to set up a secret key that can be used for symmetric encryption cannot be used to exchange an arbitrary message Value of key depends on the participants (and their private and public key information) Based on exponentiation in a finite (Galois) field (modulo a prime or a polynomial) - easy Security relies on the difficulty of computing discrete logarithms (similar to factoring) – hard

18. 9/16/200418 Primitive Roots From Euler’s theorem: a ø(n) mod n=1 Consider a m mod n=1, GCD(a,n)=1 must exist for m= ø(n) but may be smaller once powers reach m, cycle will repeat If smallest is m= ø(n) then a is called a primitive root if p is prime, then successive powers of a “generate” the group mod p Not every integer has primitive roots

19. 9/16/200419 Primitive Root Example: Power of Integers Modulo 19

20. 9/16/200420 Discrete Logarithms Inverse problem to exponentiation is to find the discrete logarithm of a number modulo p Namely find x where a x = b mod p Written as x=log a b mod p or x=ind a,p (b) If a is a primitive root then discrete logarithm always exists, otherwise may not 3 x = 4 mod 13 has no answer 2 x = 3 mod 13 has an answer 4 While exponentiation is relatively easy, finding discrete logarithms is generally a hard problem

21. 9/16/200421 Diffie-Hellman Setup All users agree on global parameters large prime integer or polynomial q α which is a primitive root mod q Each user (e.g. A) generates its key choose a secret key (number): x A < q compute its public key: y A = α x A mod q Each user publishes its public key

22. 9/16/200422 Diffie-Hellman Key Exchange Shared session key for users A and B is K AB : K AB = α x A. x B mod q = y A x B mod q (which B can compute) = y B x A mod q (which A can compute) K AB is used as session key in symmetric encryption scheme between A and B Attacker needs x A or x B, which requires solving discrete log

23. 9/16/200423 Diffie-Hellman Example Given Alice and Bob who wish to swap keys Agree on prime q=353 and α=3 Select random secret keys: A chooses x A =97, B chooses x B =233 Compute public keys: y A =3 97 mod 353 = 40 (Alice) y B =3 233 mod 353 = 248 (Bob) Compute shared session key as: K AB = y B x A mod 353 = 248 97 = 160 (Alice) K AB = y A x B mod 353 = 40 233 = 160 (Bob)

24. 9/16/200424 Next Class Hashing functions Message digests