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In cryptography, RSA is an algorithm for public-key cryptography. It is the first algorithm known to be suitable for signing as well as encryption, and one of the first great advances in public key cryptography. RSA is widely used in electronic commerce protocols, and is believed to be secure given sufficiently long keys and the use of up-to-date implementations.

Clifford Cocks, a British mathematician working for the UK intelligence agency GCHQ, described an equivalent system in an internal document in 1973, but given the relatively expensive computers needed to implement it at the time, it was mostly considered a curiosity and, as far as is publicly known, was never deployed. His discovery, however, was not revealed until 1997 due to its top-secret classification, and Rivest, Shamir, and Adleman devised RSA independently of Cocks's work.

MIT was granted for a "Cryptographic communications system and method" that used the algorithm in 1983. The patent would have expired in 2003, but was released to the public domain by RSA on 21 September 2000. Since a paper describing the algorithm had been published in August 1977, prior to the December 1977 filing date of the patent application, regulations in much of the rest of the world precluded patents elsewhere and only the US patent was granted. Had Cocks' work been publicly known, a patent in the US might not have been possible either.

- Choose two distinct large random prime numbers $p$ and $q$
- Compute $n\; =\; pq,$
- $n,$ is used as the modulus for both the public and private keys
- Compute the totient: $varphi(n)\; =\; (p-1)(q-1)\; ,$.
- Choose an integer $e$ such that $1\; <\; e\; <\; varphi(n)$, and $e$ and $varphi\; (n)$ share no factors other than $1$ (i.e. $e$ and $varphi\; (n)$ are coprime)
- $e$ is released as the public key exponent
- Compute $d$ to satisfy the congruence relation $d\; e\; equiv\; 1pmod\{varphi(n)\}$; i.e. $de\; =\; 1\; +\; kvarphi(n)$ for some integer $k$.
- $d$ is kept as the private key exponent

Notes on the above steps:

- Step 1: Numbers can be probabilistically tested for primality.
- Step 3: changed in PKCS#1 v2.0 to $lambda(n)\; =\; \{rm\; lcm\}(p-1,\; q-1)\; ,$, where lcm is the least common multiple, instead of $varphi(n)\; =\; (p-1)(q-1)\; ,$.
- Step 4: A popular choice for the public exponents is $e,$ = 2
^{16}+ 1 = 65537. Some applications choose smaller values such as $e,$ = 3, 5, 17 or 257 instead. This is done to make encryption and signature verification faster on small devices like smart cards but small public exponents can lead to greater security risks. - Steps 4 and 5 can be performed with the extended Euclidean algorithm; see modular arithmetic.

The public key consists of the modulus $n,$ and the public (or encryption) exponent $e,$. The private key consists of the modulus $n,$ and the private (or decryption) exponent $d,$ which must be kept secret.

- For efficiency a different form of the private key can be stored:
- $p,$ and $q,$: the primes from the key generation,
- $dmod\; (p\; -\; 1),$ and $dmod(q\; -\; 1),$,
- $q^\{-1\}\; mod(p),$.
- All parts of the private key must be kept secret in this form. $p,$ and $q,$ are sensitive since they are the factors of $n,$, and allow computation of $d,$ given $e,$. If $p,$ and $q,$ are not stored in this form of the private key then they are securely deleted along with other intermediate values from key generation.
- Although this form allows faster decryption and signing by using the Chinese Remainder Theorem, it is considerably less secure since it enables side channel attacks. This is a particular problem if implemented on smart cards, which benefit most from the improved efficiency. (Start with $y\; =\; x^e\; mod\; n$ and let the card decrypt that. So it computes $y^d\; pmod\{p\}$ or $y^d\; pmod\{q\}$ whose results give some value $z$. Now, induce an error in one of the computations. Then $gcd(z-x,n)$ will reveal $p$ or $q$.)

He first turns M into a number $m,$ < $n,$ by using an agreed-upon reversible protocol known as a padding scheme. He then computes the ciphertext $c,$ corresponding to:

- $c\; =\; m^e\; mod\{n\}$

This can be done quickly using the method of exponentiation by squaring. Bob then transmits $c,$ to Alice.

Alice can recover $m,$ from $c,$ by using her private key exponent $d,$ by the following computation:

- $m\; =\; c^d\; mod\{n\}.$

Given $m,$, she can recover the original message M.

The above decryption procedure works because first

- $c^d\; equiv\; (m^e)^d\; equiv\; m^\{ed\}pmod\{n\}$.

Now, $e\; d\; equiv\; 1pmod\{(p\; -\; 1)(q\; -\; 1)\}$, and hence

- $e\; d\; equiv\; 1pmod\{p\; -\; 1\},$ and

- $e\; d\; equiv\; 1pmod\{q\; -\; 1\},$

which can also be written as

- $e\; d\; =\; k\; (p\; -\; 1)\; +\; 1,$ and

- $e\; d\; =\; h\; (q\; -\; 1)\; +\; 1,$

for proper values of $k,$ and $h,$. If $m,$ is not a multiple of $p,$ then $m,$ and $p,$ are coprime because $p,$ is prime; so by Fermat's little theorem

- $m^\{(p-1)\}\; equiv\; 1\; pmod\{p\}$

and therefore, using the first expression for $e\; d,$,

- $m^\{ed\}\; =\; m^\{k\; (p-1)\; +\; 1\}\; =\; (m^\{p-1\})^k\; m\; equiv\; \{1\}^k\; m\; =\; m\; pmod\{p\},$.

If instead $m,$ is a multiple of $p,$, then

- $m^\{ed\}\; equiv\; 0^\{ed\}\; =\; 0\; equiv\; m\; pmod\{p\}$.

Using the second expression for $e\; d,$, we similarly conclude that

- $m^\{ed\}\; equiv\; m\; pmod\{q\},$.

Since $p,$ and $q,$ are distinct prime numbers, they are relatively prime to each other, so the fact that both primes divide $m^\{ed\}\; -\; m$ implies their product $pq,$ divides $m^\{ed\}\; -\; m$, which means

- $m^\{ed\}\; equiv\; m\; pmod\{pq\}$.

Thus,

- $c^d\; equiv\; m\; pmod\{n\}$.

Here is an example of RSA encryption and decryption. The parameters used here are artificially small, but one can also Transwiki:Generate a keypair using OpenSSL.

- Choose two prime numbers
- :$p\; =\; 61$ and $q=53$
- Compute $n\; =\; p\; q\; ,$
- :$n=61*53=3233$
- Compute the totient $varphi(n)\; =\; (p-1)(q-1)\; ,$
- :$varphi(n)\; =\; (61\; -\; 1)(53\; -\; 1)\; =\; 3120,$
- Choose $e>1$ coprime to 3120
- :$e=17$
- Compute $d,$ such that $d\; e\; equiv\; 1pmod\{varphi(n)\},$ e.g., by computing the modular multiplicative inverse of e modulo $varphi(n),$:
- :$d=2753$
- :17 * 2753 = 46801 = 1 + 15 * 3120.

The public key is ($n=3233$, $e=17$). For a padded message $m,$ the encryption function is:

- $c\; =\; m^emod\; \{n\}\; =\; m^\{17\}\; mod\; \{3233\}.$

The private key is ($n=3233$, $d=2753$). The decryption function is:

- $m\; =\; c^dmod\; \{n\}\; =\; c^\{2753\}\; mod\; \{3233\}.$

For example, to encrypt $m=123$, we calculate

- $c\; =\; 123^\{17\}mod\; \{3233\}\; =\; 855.$

To decrypt $c\; =\; 855$, we calculate

- $m\; =\; 855^\{2753\}mod\; \{3233\}\; =\; 123$.

Both of these calculations can be computed efficiently using the square-and-multiply algorithm for modular exponentiation.

When used in practice, RSA is generally combined with some padding scheme. The goal of the padding scheme is to prevent a number of attacks that potentially work against RSA without padding:

- When encrypting with low encryption exponents (e.g., e = 3) and small values of the m, (i.e. m<n
^{1/e}) the result of $m^e$ is strictly less than the modulus n. In this case, ciphertexts can be easily decrypted by taking the eth root of the ciphertext over the integers. - If the same clear text message is sent to e or more recipients in an encrypted way, and the receivers share the same exponent e, but different p, q, and n, then it is easy to decrypt the original clear text message via the Chinese remainder theorem. Johan Håstad noticed that this attack is possible even if the cleartexts are not equal, but the attacker knows a linear relation between them . This attack was later improved by Don Coppersmith .
- Because RSA encryption is a deterministic encryption algorithm – i.e., has no random component – an attacker can successfully launch a chosen plaintext attack against the cryptosystem, by encrypting likely plaintexts under the public key and test if they are equal to the ciphertext. A cryptosystem is called semantically secure if an attacker cannot distinguish two encryptions from each other even if the attacker knows (or has chosen) the corresponding plaintexts. As described above, RSA without padding is not semantically secure.
- RSA has the property that the product of two ciphertexts is equal to the encryption of the product of the respective plaintexts. That is $m\_1^em\_2^eequiv\; (m\_1m\_2)^epmod\{n\}.$ Because of this multiplicative property a chosen-ciphertext attack is possible. E.g. an attacker, who wants to know the decryption of a ciphertext c=m
^{e}mod n may ask the holder of the secret key to decrypt an unsuspicious-looking ciphertext $c\text{'}\; =\; c\; r^ebmod\; n$ for some value r chosen by the attacker. Because of the multiplicative property $c\text{'}$ is the encryption of $mr\; bmod\; n$. Hence, if the attacker is successful with the attack, he will learn $mr\; bmod\; n$ from which he can derive the message m by multiplying mr with the modular inverse of r modulo n.

To avoid these problems, practical RSA implementations typically embed some form of structured, randomized padding into the value m before encrypting it. This padding ensures that m does not fall into the range of insecure plaintexts, and that a given message, once padded, will encrypt to one of a large number of different possible ciphertexts.

Standards such as PKCS#1 have been carefully designed to securely pad messages prior to RSA encryption. Because these schemes pad the plaintext m with some number of additional bits, the size of the un-padded message M must be somewhat smaller. RSA padding schemes must be carefully designed so as to prevent sophisticated attacks which may be facilitated by a predictable message structure. Early versions of the PKCS#1 standard (up to version 1.5) used a construction that turned RSA into a semantically secure encryption scheme. This version was later found vulnerable to a practical adaptive chosen ciphertext attack. Later versions of the standard include Optimal Asymmetric Encryption Padding (OAEP), which prevents these attacks. The PKCS#1 standard also incorporates processing schemes designed to provide additional security for RSA signatures, e.g., the Probabilistic Signature Scheme for RSA (RSA-PSS).

Suppose Alice wishes to send a signed message to Bob. She can use her own private key to do so. She produces a hash value of the message, raises it to the power of d mod n (as she does when decrypting a message), and attaches it as a "signature" to the message. When Bob receives the signed message, he uses the same hash algorithm in conjunction with Alice's public key. He raises the signature to the power of e mod n (as he does when encrypting a message), and compares the resulting hash value with the message's actual hash value. If the two agree, he knows that the author of the message was in possession of Alice's secret key, and that the message has not been tampered with since.

Note that secure padding schemes such as RSA-PSS are as essential for the security of message signing as they are for message encryption, and that the same key should never be used for both encryption and signing purposes.

The RSA problem is defined as the task of taking eth roots modulo a composite n: recovering a value m such that c=m^{e} mod n, where (n, e) is an RSA public key and c is an RSA ciphertext. Currently the most promising approach to solving the RSA problem is to factor the modulus n. With the ability to recover prime factors, an attacker can compute the secret exponent d from a public key (n, e), then decrypt c using the standard procedure. To accomplish this, an attacker factors n into p and q, and computes (p-1)(q-1) which allows the determination of d from e. No polynomial-time method for factoring large integers on a classical computer has yet been found, but it has not been proven that none exists. See integer factorization for a discussion of this problem.

As of 2005, the largest number factored by a general-purpose factoring algorithm was 663 bits long (see RSA-200), using a state-of-the-art distributed implementation. RSA keys are typically 1024–2048 bits long. Some experts believe that 1024-bit keys may become breakable in the near term (though this is disputed); few see any way that 4096-bit keys could be broken in the foreseeable future. Therefore, it is generally presumed that RSA is secure if n is sufficiently large. If n is 256 bits or shorter, it can be factored in a few hours on a personal computer, using software already freely available. Keys of 512 bits (or less) have been shown to be practically breakable in 1999 when RSA-155 was factored by using several hundred computers. A theoretical hardware device named TWIRL and described by Shamir and Tromer in 2003 called into question the security of 1024 bit keys. It is currently recommended that n be at least 2048 bits long.

In 1994, Peter Shor published Shor's algorithm, showing that a quantum computer could in principle perform the factorization in polynomial time. However, quantum computation is still in the early stages of development and may never prove to be practical.

p and q should not be 'too close', lest the Fermat factorization for n be successful, if p-q, for instance is less than 2n^{1/4} (which for even small 1024-bit values of n is 3x10^{77}) solving for p and q is trivial. Furthermore, if either p-1 or q-1 has only small prime factors, n can be factored quickly by Pollard's p − 1 algorithm, and these values of p or q should therefore be discarded as well.

It is important that the secret key d be large enough. Michael J. Wiener showed that if p is between q and 2q (which is quite typical) and d < n^{1/4}/3, then d can be computed efficiently from n and e. There is no known attack against small public exponents such as e=3, provided that proper padding is used. However, when no padding is used or when the padding is improperly implemented then small public exponents have a greater risk of leading to an attack, such as for example the unpadded plaintext vulnerability listed above. 65537 is a commonly used value for e. This value can be regarded as a compromise between avoiding potential small exponent attacks and still allowing efficient encryptions (or signature verification). The NIST Special Publication on Computer Security (SP 800-78 Rev 1 of August 2007) does not allow public exponents e smaller than 65537, but does not state a reason for this restriction.

This procedure raises additional security issues. For instance, it is of utmost importance to use a strong random number generator for the symmetric key, because otherwise Eve (an eavesdropper wanting to see what was sent) could bypass RSA by guessing the symmetric key.

Kocher described a new attack on RSA in 1995: if the attacker Eve knows Alice's hardware in sufficient detail and is able to measure the decryption times for several known ciphertexts, she can deduce the decryption key d quickly. This attack can also be applied against the RSA signature scheme. In 2003, Boneh and Brumley demonstrated a more practical attack capable of recovering RSA factorizations over a network connection (e.g., from a Secure Socket Layer (SSL)-enabled webserver). This attack takes advantage of information leaked by the Chinese remainder theorem optimization used by many RSA implementations.

One way to thwart these attacks is to ensure that the decryption operation takes a constant amount of time for every ciphertext. However, this approach can significantly reduce performance. Instead, most RSA implementations use an alternate technique known as cryptographic blinding. RSA blinding makes use of the multiplicative property of RSA. Instead of computing c^{d} mod n, Alice first chooses a secret random value r and computes (r^{e}c)^{d} mod n. The result of this computation is r m mod n and so the effect of r can be removed by multiplying by its inverse. A new value of r is chosen for each ciphertext. With blinding applied, the decryption time is no longer correlated to the value of the input ciphertext and so the timing attack fails.

Simple Branch Prediction Analysis (SBPA) claims to improve BPA in a non-statistical way. In their paper, "On the Power of Simple Branch Prediction Analysis", the authors of SBPA (Onur Aciicmez and Cetin Kaya Koc) claim to have discovered 508 out of 512 bits of an RSA key in 10 iterations.

- Clifford Cocks
- Quantum cryptography
- Cryptographic key length
- Computational complexity theory
- Diffie-Hellman key exchange
- RSA Factoring Challenge
- List of software patents

- Menezes, Alfred; Paul C. van Oorschot; Scott A. Vanstone (1996).
*Handbook of Applied Cryptography*. CRC Press. - Rivest, R.; A. Shamir; L. Adleman (1978). "A Method for Obtaining Digital Signatures and Public-Key Cryptosystems".
*Communications of the ACM*21 (2): pp.120-126. - Cormen, Thomas H.; Charles E. Leiserson; Ronald L. Rivest; Clifford Stein (2001).
*Introduction to Algorithms*. 2e, MIT Press and McGraw-Hill.

- The Original RSA Patent as filed with the U.S. Patent Office by Rivest; Ronald L. (Belmont, MA), Shamir; Adi (Cambridge, MA), Adleman; Leonard M. (Arlington, MA), December 14, 1977, Patent Number 4405829.
- PKCS #1: RSA Cryptography Standard (RSA Laboratories website)
- The PKCS #1 standard "provides recommendations for the implementation of public-key cryptography based on the RSA algorithm, covering the following aspects: cryptographic primitives; encryption schemes; signature schemes with appendix; ASN.1 syntax for representing keys and for identifying the schemes".
- Thorough walk through of RSA
- RSA demo with Java and Javascript
- RSA demo Applet
- How the RSA Cipher Works
- Menezes, Oorschot, Vanstone, Scott: Handbook of Applied Cryptography (free PDF downloads), see Chapter 8
- Onur Aciicmez, Cetin Kaya Koc, Jean-Pierre Seifert: On the Power of Simple Branch Prediction Analysis
- A New Vulnerability In RSA Cryptography, CAcert NEWS Blog
- Example of an RSA implementation with PKCS#1 padding (LGPL source code)
- Kocher's article about timing attacks

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Last updated on Friday October 10, 2008 at 18:17:12 PDT (GMT -0700)

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This article is licensed under the GNU Free Documentation License.

Last updated on Friday October 10, 2008 at 18:17:12 PDT (GMT -0700)

View this article at Wikipedia.org - Edit this article at Wikipedia.org - Donate to the Wikimedia Foundation

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