'modular-arithmetic' New Answers

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Finding two inputs [i, j] of a custom Hash function where their Hashes are [H(i), H(j)] = [H(i), H(i)^2]

$i=j=0$, both representing the empty string and hashing to the integer $0$, is a trivial answer to the question for most of the plausible readings of “convert it to integer”. In the following I add to ...

fgrieu♦

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answered 11 hours ago

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What is the inverse of this generalised automaton (based on bitwise XOR and modular addition)?

As the paper says, there is not a simple expression. The $\boxplus$ operator is surprisingly complex as a Boolean algebraic expression. It does however act analogously to a $T$-function and so there ...

Daniel S

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answered 2 days ago

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Trying to understand the basic principle of RSA from Wikipedia

In $(m^e)^d\equiv m\pmod n$, as long as $e$ and $d$ are positive integers, the fragment $(m^e)^d$ means $m$ raised to the power $e$, then raised to the power $d$, that is $$\underbrace{{(\,\underbrace{...

fgrieu♦

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answered Sep 16 at 7:22

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RSA: in $E(x) \equiv x^e \pmod N$, do we apply the mod function to $x^e$?

$E(x) \equiv x^e \pmod N$ as in the question means that $E(x)$ is congruent to $x^e$ modulo $N$, equivalently that $x^e-E(x)$ is a multiple of $N$. But it gives not bound for $E(x)$, thus does not ...

fgrieu♦

137k

answered Sep 4 at 6:49

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New answers tagged modular-arithmetic

Finding two inputs [i, j] of a custom Hash function where their Hashes are [H(i), H(j)] = [H(i), H(i)^2]

What is the inverse of this generalised automaton (based on bitwise XOR and modular addition)?

Trying to understand the basic principle of RSA from Wikipedia

RSA: in $E(x) \equiv x^e \pmod N$, do we apply the mod function to $x^e$?

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New answers tagged modular-arithmetic

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