# How to make a simple public-key cryptographic algorithm? [closed]

I want to make a simple public-key(asymmetric) encryption. It doesn't have the be secure, I just want to understand the concepts behind them. For instance, I know simple symmetric ciphers can be made with an XOR. I saw in a thread on stackexchange that you need to use trapdoor functions, but I can't find much about them. I want to say, take a group of bytes, and be able to split them someway to get a public/private key. I get the ideas of a shared secret. Say, I generate the random number of 256(not random at all :P), and I split it into 200 and 56. If I do an XOR with 200, I can only decrypt with 200. I want to be able to split numbers random and such to be able to do it asymmetrically.

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I just want to know how it works, I don't have any uses for encryptions. All of the stuff online explain the outer-shell, but not the generation, etc, of public-key systems. –  user2507230 Sep 26 '13 at 0:38
This question appears to be off-topic because it is about crypto theory. –  GregS Sep 26 '13 at 0:39
You need to do some reading about crypto. Get a good book. You can't possibly expect to learn the fundamentals of PK crypto on a site dedicated to specific programming problems. –  Jonathon Reinhart Sep 26 '13 at 0:41

## closed as off-topic by GregS, Jonathon Reinhart, madth3, Soner Gönül, RDCSep 26 '13 at 7:35

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OK, just simple demo-idea, based on adding/modulto operation.

1. Lets we have modulto value, for our example 256. This is public-known, common value.

2. Lets you generate random secret private key in interval [1-255], for example, pri=133. Keep secret key in the pocket.

3. Generate public key, pub = 256 - pri = 123. This public key (123) you can share to the world. Imagine, 3rd party does not know, how to compute private key from a public. So, they know only public key (123).

4. Someone from public want to send you encrypted ASCII-byte. He get his byte, and adding to it public key by modulto 256 operation:

encrypted = (input_value + pub) % modulto;

For example, I want send you letter "X", ASCII code = 88 in encrypted form. So, I compute:

``````(88 + 123) % 256 = 211;
``````
1. I am sending you value 211 - encrypted byte.

2. You decrypt it by same scheme with your private key:

decrypted = (input_value + pri) % 256 = (211 + 133) % 256 = 88;

Of course, using simple generation pair in this example is weak, because of well-known algorithm for generate private key from a public, and anybody can easy recover private from modulto and public. But, in real cryptography, this algorithms is not known. But, theoretically, can be discovered in future.

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I must add: "The best cyphers are known by all" there's a lot of empirical evidence for this (although some forms change their name to 'obscuration') –  Alec Teal Sep 26 '13 at 0:59
The modulto, is it the shared secret, or just the size of the byte it's in reference to? decrypted = (input_value + pri) % 256 = (221 + 123) % 256 = 88; That % 256, if it was the shared secret, then a simple 256 - 123 would result in the private key? –  user2507230 Sep 26 '13 at 1:13
I figured it out completely! Thanks man! –  user2507230 Sep 26 '13 at 1:33
modulto is shared information. I selected 256, because of adding in the uint8_t automatically doing by modulto 256. So, in the simple implementation, do not needed use this operation. But you can use any another modulto which is more than max_you_byte_value, for example, 150. If pri = 50, then pub = 150-50 = 100. There will work same math: enc = (88 + 100) % 150 = 38; dec = (38 + 50) % 150 = 88. –  maxihatop Sep 26 '13 at 1:59

http://en.wikipedia.org/wiki/RSA_(algorithm)

Is the standard one on which the (whole) internet is based

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Given that it was invented at GCHQ and the UK government wouldn't even allow its inventors to claim credit when R, S and A filed their patent I think we can be sure its pretty secure. Now your random prime number generator could be full of holes for sure. –  James Robinson Sep 26 '13 at 0:41
That tells me about how it generates the keys, kinda, but how does it encrypt/decrypt with the keys? –  user2507230 Sep 26 '13 at 0:43
Did you read the article? i.e. the paragraphs marked encryption and decryption right at the top –  James Robinson Sep 26 '13 at 0:44
I figured it out, thanks. :) –  user2507230 Sep 26 '13 at 1:11