Secret-key encryption: AES Model Terminology AES

1. Applied cryptography: encryption and digital signatureSecret-key encryption: AESPublic-key encryption: RSADigital signature Network Security

2. Secret-key encryption: AESModelTerminologyAES Network Security

3. Security problem eavesdropper Eve: eavesdropper Open networks How are you? This is Alice. Alice Bob Network Security

4. Secret-key encryption eavesdropper ??? Open networks Encryption/ decryption Encryption/ decryption ?Xx#4fa9$3pd1@$^85f Alice Bob Secure channel K K Network Security

5. Model cryptanalysis P’, K’ Encryption: E Decryption:D C: ciphertext P: plaintext P: plaintext K: key K: key Network Security

6. Terminology • Plaintext P: the message • Ciphertext C: the encrypted message • Secret key K: a binary string of some fixed length • Encryption algorithm E • E(K,P)=EK(P)=C • Decryption algorithm D • D(K,C)=DK(C)=P, for C=EK(P)=C • D(K, E(K,P))=P Network Security

7. Terminology (cont.) • Cryptosystem (or code) • Key space: the set of all possible keys • Message space: the set of all possible messages • Ciphertext space: the set of all possible ciphertexts • Encryption algorithm: key spacemessage spaceciphertext space • Decryption algorithm: key spaceciphertext spacemessage space Network Security

8. General use • All users use the same encryption and decryption algorithms • A pair of users establish a secret key from the key space between them • Each user has N-1 keys • Total N(N-1)/2 keys • Alice and Bob use KA,B for secure communication, where KA,B is known to Alice and Bob only Network Security

9. Performance requirement • Encryption and decryption algorithms must • Simple • Very fast • Secure • Software implementation • 10M-100M bits per second • Hardware implementation • 100M-1G bits per second Network Security

10. Cryptanalysis: basic assumptions • Encryption and decryption algorithms are public • Only the key is unknown • Successful attack • Get partial or whole key • Get partial or whole plaintext of the challenge ciphertext Network Security

11. Attack types • Ciphertext only attack • Given some ciphertext C1, C2,… • Known plaintext attack • Given some pairs of plaintext and ciphertext(P1,C1), (P2,C2),… • Chosen plaintext attack • Given pairs of plaintext and ciphertext (P1,C1), (P2,C2),…, where Pi’s are chosen by the attacker Network Security

12. Attack types (cont.) • Chosen ciphertext attack • Given pairs of plaintext and ciphertext (P1,C1), (P2,C2),…, where Ci’s are chosen by the attacker • Chosen text attack • Given pairs of plaintext and ciphertext (P1,C1), (P2,C2),…, where some Pi’s and some Cj’s are chosen by the attacker Network Security

13. Security types • Unconditionally(information-theoretically)secure • No matter how much resources (time, space, ciphertext) is given, the attacker cannot uniquely determine the key or the plaintext of the challenge ciphertext • Computationally secure • The attacker cannot get the key or the ciphertext of the challenge ciphertext using limited resources Network Security

14. How large is large ? Network Security

15. Scale magnitude Network Security

16. One-time pad: cryptosystem • Key space: m-bit strings • Plaintext space: m-bit strings • Ciphertext space: m-bit strings • Encryption: C=E(K,P)=P⊕K • Decryption: P=D(K,C)=C⊕K • C⊕K=P⊕K⊕K=P • KEY IS USED ONLY ONCE • Key length = message length Network Security

17. One-time pad: security • Key must be chosen randomly and used only once • Unconditionally (totally) secure • Given a fixed ciphertext C, for every plaintext P, there is a key K=P⊕C • Therefore, there is no way that the attacker knows the exact key K. • Impractical in most cases since plaintext length is equal to key length Network Security

18. Multi-stage cipher E1 E2 Em-1 Em … P C K1 K2 Km-1 Km Dm Dm-1 D2 D1 … C P Km Km-1 K2 K1 Encryption Decryption Network Security

19. Multi-stage cipher (cont.) • Each sub-cipher • Simple • Very fast • Not so secure (but, easy to analyze) • Concatenated ciphers • Simple • Fast (but, m times slower than sub-cipher) • More secure • Tradeoff: security vs. speed • More sub-ciphers  more secure  slower • Less sub-ciphers  less secure  faster Network Security

20. AES • Advanced Encryption Standard • Motivation: to replace DES • NIST called for proposal, Jan 2, 1997, with selection criteria • Security • Computational efficiency • Memory requirement • Hardware and software suitability • Simplicity • Flexibility • Licensing requirements Network Security

21. AES (cont.) • NIST, Oct 2, 2000, announced • The AES algorithm is Rijndael • Rijndael • Joan Daemen & Vincent Rijmen (Belgium) • Key size: 128, 192, 256 • Block size: 128, 192, 256 • Round: flexible Network Security

22. Mathematical background • Byte-level operations • Each byte consists of 8 bits (over the field GF(28)) • Example: (57)160x7+x6+0x5+x4+0x3+x2+x+1 • Addition (bitwise XOR) • Example: 57+83=D4 • (x6+x4+x2+x+1)+(x7+x+1)=x7+x6+x4+x2 • Multiplication (mod m(x)) • m(x)=x8+x4+x3+x+1 or (11B)16 : irreducible polynomial • Example: 5783 (mod m(x))=C1 • (x6+x4+x2+x+1)(x7+x+1) mod m(x)= x13+x11+x9+x8+x6+x5+x4+x3+1 mod m(x)= x7+x6+1 Network Security

23. Mathematical background (cont.) • Word-level operations • Each word consists of 4 bytes • Bytes are operated over GF(28) • a(x)=a3y3+a2y2+a1y+a0, where ai over GF(28) • b(x)=b3y3+b2y2+b1y+b0, where bi over GF(28) • Definition: a(y)b(y)=a(y)b(y) mod y4+1 Network Security

24. Mathematical background (cont.) • d(y) = a(y)  b(y) = d3y3+d2y2+d1y+d0 • d0 = a0· b0 +a3 · b1 +a2· b2 +a1·b3 • d1 = a1· b0 +a0 · b1 + a3· b2 + a2· b3 • d2 = a2· b0 +a1 · b1 + a0· b2 + a3· b3 • d3 = a3· b0 +a2 · b1 + a1· b2 + a0· b3 Byte-level operation Network Security

25. Rijndael Linear mixing layer Xi Xi+1 Non-linear layer Key addition layer • Iterated block cipher • Variable block length: 128, 192, 256 • Variable key length: 128, 192, 256 • Design techniques • Whitening: original plaintext+the first sub-key • Wide trail strategy Network Security

26. Plaintext Nb • State: an intermediate cipher result • PlaintextState bytes array: 4*Nb • 16 bytes • 24 bytes • 32 bytes • Each Nb presents 32 bits Network Security

27. Cipher key Nk • KeyKey bytes array: 4*Nk • 16 bytes • 24 bytes • 32 bytes • Each Nk represents 32 bits Network Security

28. Rounds Network Security

29. Specification • Main steps • An initial round-key addition • Nr-1 rounds • A final round • Pseudo C code Rijndael(State, CipherKey) { KeyExpansion(CipherKey, ExpandedKey) ; AddRoundKey(State, ExpandedKey); For( i=1; i<Nr; i++ ) Round(State, ExpandedKey + Nb*i) ; FinalRound(State, ExpandedKey + Nb*Nr); } Network Security

30. Specification (cont.) • Round(State, RoundKey) { ByteSub(State); ShiftRow(State); MixColumn(State); AddRoundKey(State, RoundKey); } • FinalRound(State, RoundKey) { ByteSub(State) ; ShiftRow(State) ; AddRoundKey(State, RoundKey); } Network Security

31. Key schedule • CipherKey is expanded to Nr+1 sub-keys • Each sub-key is Nb*32-bit long • the block size • The first sub-key is for initial whitening • The middle Nr-1 sub-keys are for Nr-1 rounds • The last sub-key is for the final round Network Security

32. Key expansion Computed from previous 4 words 1st 32 bits 2nd 32 bits … … Network Security

33. Key expansion (cont.) Filled with cipher key  Compute next Nk words Network Security

34. ByteSub(State) • High Non-linear • Invertible S-box • One single S-box Network Security

35. ByteSub(State) (cont.) • S-box • 8 bits  8 bits (byte-level operation) • Invertible • a(x)  b(x)=a-1(x) mod m(x)=x8+x4+x3+x+1 • Computed by extended Euclidean algorithm to find b(x) and c(x) such that b(x)a(x)+c(x)m(x)=1 • Note: ’00’ ’00’ • b(x)=b7x7+b6x6+b5x5+b4x4+b3x3+b2x2+b1x+b0 Network Security

36. ByteSub(State) (cont.) • d(x)=d7x7+d6x6+d5x5+d4x4+d3x3+d2x2+d1x+d0 • S(a(x))=d(x) Network Security

37. ShiftRow(State) Network Security

38. MixColumn(State) • c(y) = ‘03’ y3+‘01’ y2+‘01’ y+‘02’ • High intra-column diffusion • Interaction with ShiftRow • High diffusion over multiple rounds C(y) Network Security

39. AddRoundKey(State, ExpandedKey) Network Security

40. Decryption • Every step is “invertible”, but sub-keys are used in reverse order • InvRound(State, RoundKey){ AddRoundKey(State, RoundKey}; InvMixColumn(State); InvShiftRow(State); InvByteSub(State); } • InvMixColumn, c(y) is replaced by d(y)=c(y)-1 mod y4+1 =’03’ y3 + ’01’ y2 + ’01’ y + ’02’ Network Security

41. Motivation • Solve two difficult problems of secret-key cryptosystems • Problem I: Key distribution • Goal: need no key establishment between two users and no key distribution center, which knows the secret keys of users • Problem II: Digital signature (universal authentication) • Goal: wide spread commercial use Network Security

42. Public-Key Encryption: RSAPrinciplesRSA algorithmDH key exchange Network Security

43. Public-key system • Two related keys (a key pair) • Public key KU– publicly known by every one • Private key KR – known only by the owner only • Security requirement • Computationally infeasible to determine the decryption key from the encryption key Network Security

44. Types of public-key systems • Public-key encryption • Every one can send messages to every one securely • For secrecy (privacy) of messages • Each user possesses only a pair of keys • Digital signature • Emulate the social signature • For authentication of messages/users • Every one can check validity of a signature, signed by some user • Key exchange • Two distant users establish a session key over an insecure channel Network Security

45. Network Security

46. Public-key encryption • Key generation: each (end) user X generates a pair of keys (KUX, KRX) • User X keeps secret his decryption key KRX • User X publishes his encryption key KUX in public directory • When a user Y wishes to send message M to X, it encrypts M with X’s public key KUX as C=E(KUX, M).NOTE: every one can encrypt messages • When X received the ciphertext C, it uses KRX to compute the plaintext M=D(KUX, C) Network Security

47. Public-key encryption (cont.) • Key generation algorithm (probabilistic): security parameter  a key pair • Encryption algorithm E: public key  plaintext  ciphertext • Decryption algorithm D: private key  ciphertext  plaintext • Equation: M=D(KRX, E(KUX, M)) Network Security

48. Comparison Network Security

49. RSA public-key system Key generation algorithm: Input: k; • Randomly generate two primes p and q of length k/2 bits; • Compute n=pq; (n is k-bit long) • Randomly select e, 2e(n)-1, withgcd(e, (n))=1; (Note: (n)=(p-1)(q-1)) • Compute d=e-1 mod (n); • KU=(e, n), KR=(d, n) (Note: (1) p, q are not needed any more; (2) e and d are symmetric, ie. e=d-1 mod n) Network Security

50. RSA public-key system (cont.) Encryption algorithm E: Input: ((e,n), M); (0Mn-1) • Compute C=Me mod n; • Output(C). Decryption algorithm D: Input: ((d,n), C); (0Cn-1) • Compute M=Ce mod n; • Output(M). Network Security