Questions tagged [factoring]
The decomposition of an integer number to the product of other integers. Algorithms such as RSA are based on the premise that no practical way has been found was to factorize large integers when they have been produced by multiplying two large primes.
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Finding square roots in $QR_{n}$ when its order has a small factor
I am stuck at a homework problem to find the square root of a quadratic residue $b$ in $Z_n$ ($n$ is not a prime). Currently, I have figured out that there exists a number $a \in Z_n$ such that $a^2 \...
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Why does sum of remainders of numbers divided by known factors, and repeating the process over and over, give factors of the two starting numbers? [closed]
While working with serial division/remainder method of finding factors, I have found that using knowns such as the known factors of a comparative number, or the difference between a number to be ...
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Integer factorization $n = pq$ with additional knowledge of $\lfloor \sqrt{p} \rfloor \oplus \lfloor \sqrt{q}\rfloor$
We know that we can factor integer $n = pq$ when we know that $p\oplus q$, where $\oplus$ means xor. If we know $\lfloor \sqrt{p} \rfloor \oplus \lfloor \sqrt{q}\rfloor$, can we factor $n$?
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finding r-th root in $\mathbb{Z}/n\mathbb{Z}$
I was reading the paper One-way Accumulators: A Decentralized Alternative to Digital Signatures by Benaloh and de Mare [link], and in section 4.2, they say that given $z\in (\mathbb{Z}/n\mathbb{Z})^*$ ...
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Big prime factor of the prime number you feed to Diffie Hellman
They say the security of Diffie-Hellman depends on the factorization of (N-1), where N is the big prime number you feed it.
More specifically, (N-1) itself has to have a big prime factor, such as (N-1)...
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Noisy Quantum Gates Spoil Shor's Factorization Attack
Update:
In Lipton and Regan's blog, Scott Aaranson and Craig Gidney have commented that the results are not unexpected and also not a deal-breaker in that dealing with this type of noise is already ...
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Can some cryptographic conclusions in the prime field be applied to the Galois field?
Such as integer factorization problem and discrete logarithm problem. Assuming a large polynomial is obtained by multiplying two generated polynomials, is it NP hard to decompose it into these two ...
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How did they factor RSA 240?
Since NFS runs in essentially $n^{1/3}$ time, and RSA-240 is a composite of two 120-digit primes, shouldn't this have taken at least $10^{40}$ operations, not including any overhead? Even if you could ...
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RSA : Is there a way to compute phi(n) or N itself if we only know e, d and a ciphertext?
I am trying to solve a problem where private key exponent d, ciphertext c, and public key exponent e (65537) are known.
How can I calculate φ(n) or n itself?
An extended version of the problem would ...
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Time Complexity of RSA Trial Division
I'm having trouble understanding how time complexity of trial division is exponential.
If it takes $\sqrt n$ tries to factor $n$ in the worst case scenario then time complexity is $\mathcal{O}(\sqrt n)...
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Non probabilistic algorithm : Given secret key $d$ we can factorize $n$ assuming $e$ is small
I read in an introduction to a paper that if $e$ is small enough and we were given secret key $d$ in RSA, then there is an efficient deterministic algorithm to factorize $n$. I've searched about that ...
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Quantum Computing Used to Break RSA by "fixing" Schnorr's Recent Factorization Claim?
There is a claim by Chinese researchers making the rounds (Schneier's blog here) that RSA can be broken by Quantum Computers. The paper is on arXiv.
Wading through the discussion in Schneier's blog, ...
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RSA: exploiting consecutive primes
It's given 2 plaintexts $m_1$ and $m_2$, and 5 different values of $n\quad\{n_1, n_2, n_3, n_4, n_5\}$ which are generated as follows:
$n_1$ is a a product of two relatively small 128-bit $p$ and $q$ ...
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Does it weaken a RSA modulus to publish a generator of a small subgroup?
Let $n = P\cdot Q$ be the product of two safe primes $P = 2p+1$ and $Q=2q+1$.
Let $g$ be a generator of $C_{p} \subset \mathbb{Z}_n^*$, the multiplicative subgroup of order $p$. In other words, $g^p = ...
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Take n = 4633 and B = {−1, 2, 3}. Note the b-smooth numbers as {67, 68, 69}. Find the factor of n
This question is from Quadratic Sieve Factorization Method. Didn't find the solution on the web also. And not aware of how to solve such questions.
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How to factor $n = p.q$, where $p,q$ are primes, knowing a multiple of $\mathrm{lcm}(p-1, q-1)$? [duplicate]
I was reading this post https://senderek.com/SDLH/ about Shamir's hash function, which is defined as follows:
Let $p,q$ be positive prime integers and let $n=p\times q$. Let $\ell = \mathrm{lcm}(p-1, ...
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Is it secure if I disclose an element equals 1 modulo p in Zn?
Let $n = pq$, $p,q$ are two large primes, then $\mathbb{Z}_n^*\cong \mathbb{Z}_p^* \times \mathbb{Z}_q^*$. We disclose $n$ and keep $p, q$ secret. Is it secure if we disclose a random element $a$:
$a\...
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How fast is Factorization reduced to a Discrete Logarithm?
Given a RSA modulus $n$, which is the product of two safe primes:
\begin{align*}
P &= 2p + 1 \quad\quad\quad
Q = 2q + 1 \\
n &= P \cdot Q = 4p q + 2 p + 2 q + 1
\end{align*}
The ...
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Why if x ∉ Z*n then the gcd(x, n) != 1? RSA
I understand that if the $\gcd(x, n)\neq=1$ then the $\gcd$ is one of the $n$ prime factors, $q$ or $q$. But how is the fact that $x \not\in Z^*_n$ related to $\gcd(x, n)\neq 1$?
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How do I prove that if $\text{gcd}(m,n) \neq 1$, the result is $p$ or $q$ in RSA?
I understand that $\text{gcd}(m,n)$ needs to be $1$ so we can apply the Euler's theorem, and if it's not $1$, the result is one of the prime factors of $n$. But Why the result it is always $p$ or $q$? ...
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CTF question with hint "Quadratic method to solve ifp problem"
I totally have no idea about this Rabin decrypt problem.
source code:
https://github.com/shanzhuer/myctf/blob/main/crypto/rabin.py
Inside there were $2^{21}$ times of encryption and decryption of ...
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A probable attack for RSA (factorization): how to improve it?
A probable attack for RSA (factorization): how to improve it?
$N=8*G+3$ can be factored if there is a non-trivial negative $k$ such that
$\frac{(N*(9+24*k)-3)}{8}=-6*m^2 $
[to exclude the two trivial ...
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What kind of special numbers are not suitable as RSA keys?
I have read that some integers are not appropriate to be chosen as the modulus in an RSA cryptosystem. Some of these numbers are those that, given a modulus $n=pq$, then $p-1$ or $q-1$ do not have ...
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Is Fermat's Factorization Method used in any practical application?
Is there any use for Fermat's Factorization Method in the world of cryptography? I see that several algorithms are based on it, such as the quadratic sieve and general number field sieve. I understand ...
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How to factorize RSA modulus while given two Public Exponents and the difference between two Private Exponents?
The RSA modulus is the product of two $2048$-bit primes.
And the two Public Exponents are both $16$-bit.
I also got the difference between two Private Exponents $\left | d_1-d_2 \right |.$
Is there ...
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Breaking RSA with P,Q LSB bits
Let's say we have a certain amount of LSB bits of P and Q and we want to fully reconstruct them given N=P*Q. I know this problem was studied in literature by Coppersmith and that Lattice methods are ...
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Does a 2047-bit factoring oracle affect 2048-bit RSA security?
I started wondering. RSA relies on prime factorisation being hard. So if a 2047-bit oracle machine existed that could instantly factor any 2047-bit number (and you can't look inside at how it works), ...
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Is there a discrete log challenge?
RSA challenge is well-known and it has a wiki page.
Is there a discrete log for $\mathbb F_p$ where $p$ is Sophie-Germain prime?
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Historical key sizes for RSA and discrete log [closed]
What is the historical pattern for key size increases for rsa vs discrete log?
What are the current and future projected sizes for these?
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Factorization of the product of two specific primes
Help me please.
Consider specific primes $p = x^{d} + 1$ and $q = x^{e} + 1$ for some $x, d, e \in \mathbb{N}$. Can their product $n = pq$ be factorized faster than the product of general primes ? In ...
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Question about sequence length/count/security of $x\mapsto x^\alpha \mod (N=Q\cdot R)$, with $Q=2q_1q_2+1$ and $R=2r_1r_2+1$ and $\alpha = 2q_2r_2$
Given a number $N$ with
$$N=Q\cdot R$$
$$Q=2\cdot q_1 \cdot q_2+1$$
$$R=2\cdot r_1\cdot r_2+1$$
with different primes $P,Q,q_1,q_2,r_1,r_2$.
If we now choose an exponent $\alpha$ containing prime ...
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Which impact on security (factorization) has a common prime factor among prime factors? $N=P\cdot Q$ with $P=2\cdot F\cdot p+1$, $Q=2\cdot F\cdot q+1$
Which impact on security (factorization) has a common prime factor among the prime factors $P$,$Q$ of a number $N$
$$N=P\cdot Q$$
$$P=2\cdot F\cdot p+1$$
$$Q=2\cdot F\cdot q+1$$
with $F,q,p$ different ...
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Given $N$ with $d$ prime factors. Can the number of unique values $x^d \mod N$ calculated for $d>2$? Does the total amount decrease at some point?
Given a number $N$ with $d$ unique prime factors. Can the number of unique values $v$ with
$$v \equiv x^d \mod N$$
$$x\in[0,N-1]$$
$$N = \prod_{i=1}^{d} p_i$$
be calculated for $d>2$? (Q1)
Does ...
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A novel method for hiding data using prime numbers?
Has the following method of hiding data been proposed or studied? What is the efficiency or security of this method? What applications could use this method?
Data is to be hidden in a number that is ...
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Are there applications which cannot be done with only factoring trapdoor?
Suppose we only have to use factoring as trapdoor function and we are disallowed to use other trapdoors, are there applications currently deployed which cannot be done?
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How secure is a projection to a subspace with much lower member size for $x\mapsto x^a$ mod $N = PQ$, $P=2p+1$, $Q=2qr+1$, to target space $r=2abc+1$?
A cyclic sequence can be produced with
$$s_{i+1} = s_i^a \mod N$$
with $N = P \cdot Q$ and $P = 2\cdot p+1$ and $Q = 2\cdot q\cdot r+1$ and $r = 2\cdot u \cdot v \cdot w +1$ with $P,Q,p,q,r,u,v,w$ ...
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Can Shor's algorithm factor over finite fields/rings/groups?
Shor's algorithm can (efficiently) solve equations of the form:
$$n = pq$$
and
$$n = x^{2} + y^{2}$$
This question is simple: Can Shor's algorithm solve these equations in polynomial time when they ...
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Can Shor's algorithm factor over the gaussian integers?
This is related to this question about solving the following expression:
$$x^{2} + y^{2}$$
This can be factored over the gaussian integers as
$$(x + iy)(x - iy)$$
If one could factor a sum of two ...
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Is $\mathbb{Z}_2[x]$-irreducibility in ${\bf P}$?
A fast alternative to conventional multiplication is the carry-less product. It works exactly in the same way as the multiplication on the countable set of binary polynomials $\mathbb{Z}_2[x]$. We can ...
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Probability of choosing a base successfully in Pollard p-1 factorization method
In a problem about pollard p-1 factorization method, where $n=pq$.
We choose some random base $a$ , and an exponent $B$, where hopefully $p-1$ has small prime factors, and if so we hope to estimate $p ...
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How much work to find such $n$?
Let $W$ be a random $200$ bit number. How much work would it take to find a semiprime $n=p_1\cdot p_2$ such that $p_1,p_2 > 2^{50} $ and $|W-n|<2^{12}$?
More generally, let $W_b$ be a random ...
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Using Shor's algorithm to access RSA messages without factoring
Most of the time people forgot that the real aim of the adversary against encryption is accessing the message. For example, in the RSA case, we talk about the factoring of the modulus to reach the ...
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Rabin Cryptosystem: Chosen-Ciphertext Attack
I read in literature that Rabin Cryptosystem can be broken using chosen-ciphertext attack. It is described that after chosen ciphertext is decrypted attacker can factorize public key $n$ by using ...
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What are those RSA Challenges, DES Challenges and RSA Factoring Challenges
Can someone explain the differences between the DES challenge, the RSA challenges, and the RSA factoring challenge? What were the aims?
I think the factoring challenge was to encourage research, the ...
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Factoring a RSA modulus given parts of a Factor
e,N,c and around 2/3 of p are given and I need to get the whole p to decrypt c.
...
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The significance of the field of the factor in Lenstra’s ECM
I am going through Lenstra's Elliptic Curve Factorisation from Silverman's Mathematical Cryptography book.
I have understood the algorithm itself, but unable to understand a specific point the book ...
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RSA factorization knowing the form of p and q
I'm wondering if knowing the form of both factors (p and q) of a RSA modulus N is a significant help for factoring or not.
For instance:
p of the form 4k+3, so (p-3)%4 = 0
and q of the form 4k+7, so (...
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What would be the safety requirements for the primes in $n=p \cdot q$ regarding the factorization?
Let it be $p, q \in \mathbb{P}$ with $p,q \in [2^{b-1}, 2^b]$ for some $b \in \mathbb{N}$ and $p \cdot q = n \in \mathbb{N}$. What would be the distance between $p$ and $q$ (as a function of b) so ...
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Factoring RSA if prime p is used as the private exponent
I've got two 1024 bits primes $p,q$, and $n = p \cdot q$.
Now I know the result of $ c^{p} \bmod n = x$, also the value of $c$ is given, I wonder if it is possible to factorize $n$.
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Quadratic Sieve: Is there a thumb rule for deciding how many numbers to sieve?
In the Quadratic Sieve algorithm, we first decide on a B & then look for B-smooth prime factors by sieving using a quadratic polynomial.
I can find a few formulas which help figure out how to ...
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