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Some of the most important symmetric block ciphers in current use Triple DES IDEA Blowfish RC5 CAST-128 RC2. Conventional Encryption: Algorithms. Double DES C = E K2 [E K1 [P]]; D = D K1 [D K2 [C]] 112 bit key is safe from brute force attack
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Some of the most important symmetric block ciphers in current use Triple DES IDEA Blowfish RC5 CAST-128 RC2 Conventional Encryption: Algorithms
Double DES C = EK2[EK1[P]]; D = DK1[DK2[C]] 112 bit key is safe from brute force attack Need to examine if K3 s.t. EK2[EK1[P]] = EK3[P] The answer is No!! (Proved in 1992) # of mappings between 64-bit blocks = 264! =10347380000000000000000 DES defines one mapping for each different key, for a total # of mappings: 256 <1017 If DES is used twice with different keys, it will produce one of the many mappings that is not defined by a single application of DES Triple DES Multiple Encryption with DES
Let X = EK1(P). Clearly X = DK2(C) Given a known <P, C>, construct a table of size 256 with all values of K1 and EK1(P) Sort on EK1(P) Now decrypt C with all values of K2. Check all results against table Any match is a candidate <K1, K2> pair If this pair is checked with another plaintext-ciphertext pair, it can be determined with the probability 1-2-16 (If this pair is correct with another plaintext-ciphertext pair, it is a correct key with the probability 1-2-16 ) Total effort is O(256), not 2112 (Not much better than the 255 required for single DES) Triple DES Meet In The Middle Attack
C = EK3(DK2(EK1(P))) No cryptographic significance to middle decrypt operation backwards compatible with existing single DES (K1 = K2 = K3) Two-key Triple DES (K1 = K3) or three-key triple DES Security of Triple DES no known practical attacks brute force search impossible meet-in-the-middle attacks need 256 plaintext-ciphertext pairs per key A popular current alternative Major disadvantage is speed (3x slower) Triple DES Triple DES
Xuejia Lai and James Massey, ETH (Swiss Federal Institute of Technology), 1991 Patented patent is held by Ascom-Tech Non-commercial use of IDEA is free. Commercial licenses can be obtained by contacting Ascom-Tech Used in PGP 128-bit key, 64-bit block Variant Feistel network (not Feistel) Eight rounds + final transformation IDEA International Data Encryption Algorithm (IDEA)
Uses three operations. Each operation is performed on two 16-bit inputs to produce a single 16-bit output Bit-by-bit XOR ( ) (Unsigned 16-bit integers) addition modulo 216 ( ) (Unsigned 16-bit integers) multiplication modulo 216 + 1 (except that a block of all zeros is treated as representing 216 ( ) Three operations are incompatible in the sense that No pair of the three operations satisfies a distributive law. e.g., a (b c) (a b) (a c) No pair of the three operations satisfies an associative law. e.g., a (b c) (a b) c In IDEA, confusion is achieved by using these three separate operations in combination Provides a complex transformation of the input, making cryptanalysis much more difficult (than with a DES which uses just a single XOR) IDEA IDEA Basic Operations
Examples for 2-bit operands IDEA IDEA Basic Operations - Examples
Basic building block is the Multiplication/Addition (MA) structure F1,F2: Two 16-bit values derived from the plaintext Z5,Z6: Two 16-bit subkeys derived from the key G1,G2: Two 16-bit outputs In IDEA, diffusion is provided by MA Each output bit depends on every bit of inputs (plaintext-derived inputs and subkey inputs) This MA structure is repeated eight times, providing very effective diffusion IDEA IDEA Basic Building Block, MA
IDEA Overall IDEA Encryption Structure
IDEA Single Round of IDEA (1st Round) Transformation Sub-encryption
IDEA Output Transformation Stage of IDEA
IDEA Subkey Generation • 52 16-bit subkeys are generated from the 128-bit key • The first eight subkeys, Z1, Z2, …, Z8, are taken directly from the key • Then a circular left shift of 25 bit positions is applied to the key, and the next eight keys are extracted. • This procedure is repeated until all 52 subkeys are generated
IDEA IDEA Decryption • Use the same structure (algorithm) as the encryption, but with different subkeys • Decryption subkeys U1, …, U52 are derived from encryption subkeys
IDEA Encryption and Decryption Subkeys • Zj-1: multiplicative inverse; Zj Zj-1 = 1 • -Zj: additive inverse; -Zj Zj= 0
Designed by Bruce Schneier, 1993 Freely available (Unpatented; Royalty-free; No license required; Free source code available) Used in SSH, OpenBSD, IPSec Block cipher: 64-bit block Variable key length; 32 bits to 448 bits Fast encryption (much faster than DES and IDEA) Compact Simple Blowfish Blowfish
The key ranging from 32 bits to 448 bits (1 to 14 32-bit words) is stored in a K-array: K1, K2, …, Kj 1 j 14 The 18 32-bit subkeys are stored in the P-array: P1, P2, …, P18 There are 4 S-boxes, each with 8x32(=256) 32-bit entries P-array and then 4 S-boxes are initialized with fractional part of : Blowfish Subkey and S-Box Generation S1,0, S1,1, …, S1,255 S2,0, S2,1, …, S2,255 S3,0, S3,1, …, S3,255 S4,0, S4,1, …, S4,255 P1= 243F6A8816 P2= 85A308D316 S4,254= 578FDFE316 S4,255= 3AC372E616
P-array is XORed with K-array (reusing K-array if necessary): P1 = P1 K1, P2 = P2 K2, …, Pj = Pj Kj, Pj+1 = Pj+1 K1, Pj+2 = Pj+2 K2, … Then update P-array and S-boxes as follows: Where EP,S[Y] is the ciphertext produced by encrypting Y using Blowfish with the P and S arrays 521 executions in total are required to produce the final P and S arrays Blowfish Subkey and S-Box Initialization P1, P2 = EP,S[0] P3, P4 = EP,S[P1 || P2] P17, P18 = EP,S[P15 || P16] S1,0, S1,1 = EP,S[P17 || P18] S4,254, S4,255 = EP,S[P4,252 || P4,253]
Slight variant of classic Feistel network L and R are both processed in each round 16 rounds Two extra XORs at the end Blowfish Blowfish Encryption/Decryption
Uses addition modulo 232 and XOR Round function processes four bytes F(a, b, c, d) = ((S1,a + S2,b) S3,c) + S4,d Followed by Feistel swap Blowfish Single Blowfish Round
Key-dependent S-Boxes Operations are performed on both halves of data Time-consuming subkey generation process Makes it bad for rapid key switching, but makes brute force expensive Perfect avalanche effect Fast Blowfish Characteristics of Blowfish
Designed by Ronald Rivest (MIT Prof.) for RSA Data Security Secret-key block cipher Parameterized algorithm Features Data-dependent rotations Variable block size Variable key size Variable number of rounds RC5 RC5
Suitable for hardware and software Fast Adaptable to processors of different word lengths Variable number of rounds Variable-length key Simple Low memory usage High security Emphasis of data-dependent rotations RC5 Motivations
RC5 is word-oriented Two-word input and two-word output Representation Word size: w (16,32,64) Number of rounds: r (0,1, …, 255) Number of bytes in key K: b (0,1, …, 255) RC5 algorithm notation: RC5-w/r/b RC5 algorithm example: RC5-32/16/7 Similar to DES Two 32-bit word inputs and outputs 16 rounds 7-byte (56-bit) key RC5-32/12/16 “nominal” version RC5 Parameterization
RC5 performs complex operations on the secret key to generate a total of t subkeys, which are stored in S array, S[0],S[1], …, S[t-1] Each subkey is one word (w bits) in length Two subkeys are used in each round, and two more subkeys are used outside the r-round t = 2r+2 In key expansion, magic constants are used Pw = Odd((e - 2)2w); e=2.718281828…. (base of natural logarithms) Qw = Odd(( - 1)2w); =1.618033988…. (golden ratio = (1+sqr(5))/2) Odd(x): odd integer nearest to x Example RC5 Key Expansion w 16 32 64 Pw B7E1 B7E15163 B7E151628AED2A6B Qw 9E37 9E3779B9 9E3779B97F4A7C15
Step-1: Convert secret key bytes to words b byte key K, (K[0], K[1], …, K[b-1]) is converted to word array L[0], L[1], …, L[c-1] Step-2: Initialize subkey array S (S[0], S[1], …, S[t-1]) S[0] = Pw; for i=1 to t-1 do s[i] = s[i-1] + Qw; Step-3: Mix the secret key into subkey array S RC5 Key Expansion Algorithm • i=j=X=Y=0; • Do 3*max(t, c) times: • X=S[i]=(S[i]+X+Y)<<<3; • Y=L[j]=(L[j]+X+Y)<<<(X+Y); • i=(i+1) mod t; • j=(j+1) mod c; Note: <<< cyclic rotate left
RC5 RC5 Key Expansion
RC5 uses 3 primitive operations Addition, Subtraction (of words): modulo 2w Bitwise XOR Left, right circular rotation Encryption RC5 RC5 Encryption LE0 = A + S[0]; RE0 = B + S[1]; for i = 1 to r do LEi = ((LEi-1 REi-1) <<<REi-1) + S[2i]; REi = ((REi-1 LEi) <<<LEi) + S[2i+1];
RC5 RC5 Decryption for i = r downto 1 do RDi-1 = ((RDi – S[2i+1] >>>LDi) LDi) ; LDi-1 = ((LDi – S[2i] >>>Rdi-1) RDi-1) ; B = RD0 - S[1]; A = LD0 - S[0];
Developed by Carlisle Adams and Stafford Tavares Used in IPSec 64-bit block, 40- to 128-bit keys (in 8-bit increments) Classical Feistel network structure Sixteen rounds Two subkeys per round, one 32-bit (Kmi), one 5-bit (Kri) Three different round functions Four operations: addition(+) and subtraction(-) modulo 232, XOR, and (variable) circular left rotate (<<<) 5-bit subkey (Kri) determines rotate amount Encryption Decryption: same as encryption with the keys applied in reverse order CAST-128 CAST-128 L0||R0 = Plaintext for i = 1 to 16 do Li = Ri-1 Ri = Li-1 Fi[Ri-1, Kmi, Kri]; Ciphertext = L16||R16
CAST-128 I Ia Ib Ic Id CAST-128 Round Function F Definition of F Rounds 1,4 I=(Kmi+ Ri-1)<<<Kri) 7,10,13,16 F=((S1[Ia]S2[Ib])-S3[Ic])+S4[Id] Rounds 2,5 I=(KmiRi-1)<<<Kri) 8,11,14 F=((S1[Ia]-S2[Ib])+S3[Ic])S4[Id] Rounds 3,6 I=(Kmi-Ri-1)<<<Kri) 9,12,15 F=((S1[Ia]+S2[Ib])S3[Ic])-S4[Id]
CAST-128 uses 8 S-boxes Four of these, S-box 1 thru S-box 4 are used in the encryption/decryption process S-box 5 thru S-box 8 are used in the subkey generation S-boxes contain fixed (predefined) values Each S-box contains 256 32-bit values CAST-128 CAST-128 S-Boxes
Label the 128-bit (16-byte) key as: x0x1x3x4x5x6x7x8xAxBxCxDxExF Symbol Definitions Km1, …, Km16 Sixteen 32-bit masking subkeys (one per round) Kr1, …, Kr16 Sixteen 32-bit rotate subkeys (one per round), of which only the least significant 5 bits of each are used z0, …, zF Intermediate (temporary) bytes K1, …, K32 Intermediate (temporary) words K1 thru K32 are calculated from the key using S-boxes 5 thru 8 (See next pages) Then subkeys are defined as for i = 1 to 16 do Kmi = Ki; Kri = K16+i; CAST-128 CAST-128 Subkey Generation
CAST-128 CAST-128 Subkey Generation z0z1z2z3 = x0x1x2x3 S5[xD] S6[xF] S7[xC] S8[xE] S7[x8] z4z5z6z7 = x8x9xAxB S5[z0] S6[z2] S7[z1] S8[z3] S8[xA] z8z9zAzB = xCxDxExF S5[z7] S6[z6] S7[z5] S8[z4] S5[x9] zCzDzEzF = x4x5x6x7 S5[zA] S6[z9] S7[zB] S8[z8] S6[xB] K1 = S5[z8] S6[z9] S7[z7] S8[z6] S5[z2] K2 = S5[zA] S6[zB] S7[z5] S8[z4] S6[z6] K3 = S5[zC] S6[zD] S7[z3] S8[z2] S7[z9] K4 = S5[zE] S6[zF] S7[z1] S8[z0] S8[zC] x0x1x2x3 = z8z9zAzB S5[z5] S6[z7] S7[z4] S8[z6] S7[z0] x4x5x6x7 = z0z1z2z3 S5[x0] S6[x2] S7[x1] S8[x3] S8[z2] x8x9xAxB = z4z5z6z7 S5[x7] S6[x6] S7[x5] S8[x4] S5[z1] xCxDxExF = zCzDzEzF S5[xA] S6[x9] S7[xB] S8[x8] S6[z3] K5 = S5[x3] S6[x2] S7[xC] S8[xD] S5[x8] K6 = S5[x1] S6[x0] S7[xE] S8[xF] S6[xD] K7 = S5[x7] S6[x6] S7[x8] S8[x9] S7[x3] K8 = S5[x5] S6[x4] S7[xA] S8[xB] S8[x7] z0z1z2z3 = x0x1x2x3 S5[xD] S6[xF] S7[xC] S8[xE] S7[x8] z4z5z6z7 = x8x9xAxB S5[z0] S6[z2] S7[z1] S8[z3] S8[xA] z8z9zAzB = xCxDxExF S5[z7] S6[z6] S7[z5] S8[z4] S5[x9] zCzDzEzF = x4x5x6x7 S5[zA] S6[z9] S7[zB] S8[z8] S6[xB] K9 = S5[z3] S6[z2] S7[zC] S8[zD] S5[z9] K10 = S5[z1] S6[z0] S7[zE] S8[zF] S6[zC] K11 = S5[z7] S6[z6] S7[z8] S8[z9] S7[z2] K12 = S5[z5] S6[z4] S7[zA] S8[zB] S8[z6] x0x1x2x3 = z8z9zAzB S5[z5] S6[z7] S7[z4] S8[z6] S7[z0] x4x5x6x7 = z0z1z2z3 S5[x0] S6[x2] S7[x1] S8[x3] S8[z2] x8x9xAxB = z4z5z6z7 S5[x7] S6[x6] S7[x5] S8[x4] S5[z1] xCxDxExF = zCzDzEzF S5[xA] S6[x9] S7[xB] S8[x8] S6[z3] K13 = S5[x8] S6[x9] S7[x7] S8[x6] S5[x3] K14 = S5[xA] S6[xB] S7[x5] S8[x4] S6[x7] K15 = S5[xC] S6[xD] S7[x3] S8[x2] S7[x8] K16 = S5[xE] S6[xF] S7[x1] S8[x0] S8[xD]
CAST-128 CAST-128 Subkey Generation z0z1z2z3 = x0x1x2x3 S5[xD] S6[xF] S7[xC] S8[xE] S7[x8] z4z5z6z7 = x8x9xAxB S5[z0] S6[z2] S7[z1] S8[z3] S8[xA] z8z9zAzB = xCxDxExF S5[z7] S6[z6] S7[z5] S8[z4] S5[x9] zCzDzEzF = x4x5x6x7 S5[zA] S6[z9] S7[zB] S8[z8] S6[xB] K17 = S5[z8] S6[z9] S7[z7] S8[z6] S5[z2] K18 = S5[zA] S6[zB] S7[z5] S8[z4] S6[z6] K19 = S5[zC] S6[zD] S7[z3] S8[z2] S7[z9] K20 = S5[zE] S6[zF] S7[z1] S8[z0] S8[zC] x0x1x2x3 = z8z9zAzB S5[z5] S6[z7] S7[z4] S8[z6] S7[z0] x4x5x6x7 = z0z1z2z3 S5[x0] S6[x2] S7[x1] S8[x3] S8[z2] x8x9xAxB = z4z5z6z7 S5[x7] S6[x6] S7[x5] S8[x4] S5[z1] xCxDxExF = zCzDzEzF S5[xA] S6[x9] S7[xB] S8[x8] S6[z3] K21 = S5[x3] S6[x2] S7[xC] S8[xD] S5[x8] K22 = S5[x1] S6[x0] S7[xE] S8[xF] S6[xD] K23 = S5[x7] S6[x6] S7[x8] S8[x9] S7[x3] K24 = S5[x5] S6[x4] S7[xA] S8[xB] S8[x7] z0z1z2z3 = x0x1x2x3 S5[xD] S6[xF] S7[xC] S8[xE] S7[x8] z4z5z6z7 = x8x9xAxB S5[z0] S6[z2] S7[z1] S8[z3] S8[xA] z8z9zAzB = xCxDxExF S5[z7] S6[z6] S7[z5] S8[z4] S5[x9] zCzDzEzF = x4x5x6x7 S5[zA] S6[z9] S7[zB] S8[z8] S6[xB] K25 = S5[z3] S6[z2] S7[zC] S8[zD] S5[z9] K26 = S5[z1] S6[z0] S7[zE] S8[zF] S6[zC] K27 = S5[z7] S6[z6] S7[z8] S8[z9] S7[z2] K28 = S5[z5] S6[z4] S7[zA] S8[zB] S8[z6] x0x1x2x3 = z8z9zAzB S5[z5] S6[z7] S7[z4] S8[z6] S7[z0] x4x5x6x7 = z0z1z2z3 S5[x0] S6[x2] S7[x1] S8[x3] S8[z2] x8x9xAxB = z4z5z6z7 S5[x7] S6[x6] S7[x5] S8[x4] S5[z1] xCxDxExF = zCzDzEzF S5[xA] S6[x9] S7[xB] S8[x8] S6[z3] K29 = S5[x8] S6[x9] S7[x7] S8[x6] S5[x3] K30 = S5[xA] S6[xB] S7[x5] S8[x4] S6[x7] K31 = S5[xC] S6[xD] S7[x3] S8[x2] S7[x8] K32 = S5[xE] S6[xF] S7[x1] S8[x0] S8[xD]
CAST-128 CAST-128 S-Box S1 S-Box S1 30fb40d4 9fa0ff0b 6beccd2f 3f258c7a 1e213f2f 9c004dd3 6003e540 cf9fc949 bfd4af27 88bbbdb5 e2034090 98d09675 6e63a0e0 15c361d2 c2e7661d 22d4ff8e 28683b6f c07fd059 ff2379c8 775f50e2 43c340d3 df2f8656 887ca41a a2d2bd2d a1c9e0d6 346c4819 61b76d87 22540f2f 2abe32e1 aa54166b 22568e3a a2d341d0 66db40c8 a784392f 004dff2f 2db9d2de 97943fac 4a97c1d8 527644b7 b5f437a7 b82cbaef d751d159 6ff7f0ed 5a097a1f 827b68d0 90ecf52e 22b0c054 bc8e5935 4b6d2f7f 50bb64a2 d2664910 bee5812d b7332290 e93b159f b48ee411 4bff345d fd45c240 ad31973f c4f6d02e 55fc8165 d5b1caad a1ac2dae a2d4b76d c19b0c50 882240f2 0c6e4f38 a4e4bfd7 4f5ba272 564c1d2f c59c5319 b949e354 b04669fe b1b6ab8a c71358dd 6385c545 110f935d 57538ad5 6a390493 e63d37e0 2a54f6b3 3a787d5f 6276a0b5 19a6fcdf 7a42206a 29f9d4d5 f61b1891 bb72275e aa508167 38901091 c6b505eb 84c7cb8c 2ad75a0f 874a1427 a2d1936b 2ad286af aa56d291 d7894360 425c750d 93b39e26 187184c9 6c00b32d 73e2bb14 a0bebc3c 54623779 64459eab 3f328b82 7718cf82 59a2cea6 04ee002e 89fe78e6 3fab0950 325ff6c2 81383f05 6963c5c8 76cb5ad6 d49974c9 ca180dcf 380782d5 c7fa5cf6 8ac31511 35e79e13 47da91d0 f40f9086 a7e2419e 31366241 051ef495 aa573b04 4a805d8d 548300d0 00322a3c bf64cddf ba57a68e 75c6372b 50afd341 a7c13275 915a0bf5 6b54bfab 2b0b1426 ab4cc9d7 449ccd82 f7fbf265 ab85c5f3 1b55db94 aad4e324 cfa4bd3f 2deaa3e2 9e204d02 c8bd25ac eadf55b3 d5bd9e98 e31231b2 2ad5ad6c 954329de adbe4528 d8710f69 aa51c90f aa786bf6 22513f1e aa51a79b 2ad344cc 7b5a41f0 d37cfbad 1b069505 41ece491 b4c332e6 032268d4 c9600acc ce387e6d bf6bb16c 6a70fb78 0d03d9c9 d4df39de e01063da 4736f464 5ad328d8 b347cc96 75bb0fc3 98511bfb 4ffbcc35 b58bcf6a e11f0abc bfc5fe4a a70aec10 ac39570a 3f04442f 6188b153 e0397a2e 5727cb79 9ceb418f 1cacd68d 2ad37c96 0175cb9d c69dff09 c75b65f0 d9db40d8 ec0e7779 4744ead4 b11c3274 dd24cb9e 7e1c54bd f01144f9 d2240eb1 9675b3fd a3ac3755 d47c27af 51c85f4d 56907596 a5bb15e6 580304f0 ca042cf1 011a37ea 8dbfaadb 35ba3e4a 3526ffa0 c37b4d09 bc306ed9 98a52666 5648f725 ff5e569d 0ced63d0 7c63b2cf 700b45e1 d5ea50f1 85a92872 af1fbda7 d4234870 a7870bf3 2d3b4d79 42e04198 0cd0ede7 26470db8 f881814c 474d6ad7 7c0c5e5c d1231959 381b7298 f5d2f4db ab838653 6e2f1e23 83719c9e bd91e046 9a56456e dc39200c 20c8c571 962bda1c e1e696ff b141ab08 7cca89b9 1a69e783 02cc4843 a2f7c579 429ef47d 427b169c 5ac9f049 dd8f0f00 5c8165bf
Developed by Ron Rivest (RSA Data Security) 64-bit block cipher Variable key size (from one byte up to 128 bytes) Designed to be easy to implement on 16-bit microprocessor Use 16-bit word, 16-bit arithmetic (addition, XOR, AND, ~, rotate) Non-Feistel 18 rounds (mixing/mashing) Used in S/MIME RC2 RC2
RC2 assumes 128 (64 word) byte key buffer For byte operation, key array is L[0], …, L[127]; each L[i] is a byte For word operation, key array is K[0], …, K[63]; each K[i] is a 16-bit word These are alternative views of the same key buffer Key expansion Assume that exactly T bytes of key are supplied, 1 T 128 The purpose of key expansion algorithm is to modify the key buffer so that each bit of the expanded key depends in a complicated way on every bit of the supplied input key Key expansion begins by placing the supplied T-byte key into bytes L[0], …, L[T-1] of the key buffer L array is then computed making use of an auxiliary array P P array is a random permutation of values of 0,…,255, which is constructed based on p=3.14159… (See next page) The computation is RC2 RC2 Key Expansion for i = T to 127 do L[i] = P[L[i-1] + L[i-T]]; L[128-T] = P[L[128-T]] For i = 127 – T down to 0 do L[i]=P[L[i+1] L[i+T]];
RC2 PiTable (P-array) Here is the P array in hexadecimal notation: 0 1 2 3 4 5 6 7 8 9 a b c d e f 00: d9 78 f9 c4 19 dd b5 ed 28 e9 fd 79 4a a0 d8 9d 10: c6 7e 37 83 2b 76 53 8e 62 4c 64 88 44 8b fb a2 20: 17 9a 59 f5 87 b3 4f 13 61 45 6d 8d 09 81 7d 32 30: bd 8f 40 eb 86 b7 7b 0b f0 95 21 22 5c 6b 4e 82 40: 54 d6 65 93 ce 60 b2 1c 73 56 c0 14 a7 8c f1 dc 50: 12 75 ca 1f 3b be e4 d1 42 3d d4 30 a3 3c b6 26 60: 6f bf 0e da 46 69 07 57 27 f2 1d 9b bc 94 43 03 70: f8 11 c7 f6 90 ef 3e e7 06 c3 d5 2f c8 66 1e d7 80: 08 e8 ea de 80 52 ee f7 84 aa 72 ac 35 4d 6a 2a 90: 96 1a d2 71 5a 15 49 74 4b 9f d0 5e 04 18 a4 ec a0: c2 e0 41 6e 0f 51 cb cc 24 91 af 50 a1 f4 70 39 b0: 99 7c 3a 85 23 b8 b4 7a fc 02 36 5b 25 55 97 31 c0: 2d 5d fa 98 e3 8a 92 ae 05 df 29 10 67 6c ba c9 d0: d3 00 e6 cf e1 9e a8 2c 63 16 01 3f 58 e2 89 a9 e0: 0d 38 34 1b ab 33 ff b0 bb 48 0c 5f b9 b1 cd 2e f0: c5 f3 db 47 e5 a5 9c 77 0a a6 20 68 fe 7f c1 ad
Encryption algorithm takes a 64-bit input stored in R[0], R[1], R[2], R[3], and places the result back in R[0] thru R[3]. Algorithm consists of 18 rounds of two types: mixing and mashing Mixing round: RC2 RC2 Encryption R[0] = R[0] + K[j] + (R[3] & R[2]) + ((~R[3] & R[1]); R[0] = R[0] <<< 1; j = j + 1; R[1] = R[1] + K[j] + (R[0] & R[3]) + ((~R[0] & R[2]); R[1] = R[1] <<< 2; j = j + 1; R[2] = R[2] + K[j] + (R[1] & R[0]) + ((~R[1] & R[3]); R[2] = R[2] <<< 3; j = j + 1; R[3] = R[3] + K[j] + (R[2] & R[1]) + ((~R[2] & R[0]); R[3] = R[3] <<< 5; j = j + 1; Here j is the global variable; K[j] is the first subkey word that has not yet been used
Mashing round RC2 Initialize j to zero Perform five mixing rounds (j = 20) Perform one mashing round Perform six mixing rounds (j = 44) Perform one mashing round Perform five mixing rounds (j=64) Decryption: Inverse operation of encryption with the keys used in reverse order RC2 RC2 Encryption R[0] = R[0] + K[R[3] & 63]; R[1] = R[1] + K[R[0] & 63]; R[2] = R[2] + K[R[1] & 63]; R[3] = R[3] + K[R[2] & 63];
Variable key length Blowfish, RC5, CAST-128, RC2 Mixed operators More than one arithmetic and/or Boolean operator, especially ones that are not associative or distributive These operators provide nonlinearity as an alternative to S-boxes Data-dependent rotation Provide excellent confusion and diffusion RC5 Key-dependent rotation CAST-128 Characteristics of Advanced Block Ciphers Key features found in advanced symmetric block ciphers (not in DES)
Key-dependent S-boxes Blowfish Expensive key schedule computation Blowfish Variable round function (F) CAST-128 Variable plaintext/ciphertext block length RC5 Variable number of rounds RC5 Operation on both data halves each round IDEA, Blowfish, RC5 Characteristics of Advanced Block Ciphers
Prob. 4.5 Prob. 4.8 Prob. 4.9 Prob. 4.13 Chapter 4 HW
