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I am trying to implement Paillier Cryptosystem in Java and facing a doubt with the definition of the modulo set WITH A STAR. Specifically, what do we mean if we add a star to Zn?

I am confused between two:

1) It is the set of prime numbers. 2) It is the set Zn minus the element zero.

Google search didnt help. At least not to me.

enter image description here

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closed as off topic by High Performance Mark, Daniel Fischer, GregS, finnw, Graviton Dec 5 '12 at 2:25

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This is off-topic; the answer is more likely to be found in your textbook (or whatever the source of that tiny image is) than here on SO. –  High Performance Mark Dec 1 '12 at 9:41
    
@HighPerformanceMark this is the source of the image [link] (enpub.fulton.asu.edu/sensip/SenSIP_Papers/…; ' I have searched a lot of textbooks, referred a prof. too, and searched thoroughly in the paper, but no clue is there. –  rajatIIT Dec 1 '12 at 12:12
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If R is a ring, like Z_n, the notation R^* (the ^ is meant to indicate that the asterisk is elevated) usually means the group of units in R, i.e. the group of elements that have a multiplicative inverse. Occasionally, the notation means the set of non-zero elements of the ring, but in the context of cryptography, I would be surprised if that were the intended meaning. –  Daniel Fischer Dec 1 '12 at 14:45

2 Answers 2

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As noted by Daniel Fischer (Z_n)* is the unit group of Z_n. Practically speaking, (Z_n)* is the set of integers x, 1 <= x < n, such that GCD(x,n) = 1.

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I dont know if your answer is correct but is the set of x GCD(x,n) = 1 equivalent to the set of all those x for which there exists a multiplicative inverse in the set Zn ?? –  rajatIIT Dec 2 '12 at 18:58
    
@rajatIIT: Yes, it is equivalent. –  GregS Dec 4 '12 at 0:29

This is number theory notation used in cryptography. Note that cryptographers usually use notation that is slightly different from modern number theory. There is a good introduction to number theory for cryptographers part one and part two available at Stanford's Introduction to Cryptography course. Part two of that sheet discusses (Z_n)*.

If you want to know more about number theory in general, I found Contemporary Abstract Algebra to be really helpful during my cryptography classes.

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