I'm submitting a file with the sensitive data to a 3rd party, could anyone explain what is the point in signing it and encrypting at the same time? Does just encrypting not verify my identity (the 3rd party requested it to be signed and then encrypted)?
You sign with your private key. Signature is proof of origin, it proves that you were in possession of the private key therefore the data must be from you, and the data was not altered.
You encrypt with the destination public key. This is to ensure that only the destination can decrypt it.
As you see, the signature and encryption serve different purposes.
Signing is putting your signature on a letter, and encrypting is putting the letter in an envelope. The envelope keeps other people from reading the letter. The signature proves that you wrote the letter.
Additionally, you sign and then encrypt, in that order, because if you instead put the letter in the envelope first, and then sign the envelope, this doesn't really prove that you wrote letter. You could argue in front of a judge that you didn't get to see the letter before the envelope was sealed.
Finally, you should not use the same key for both signing and encrypting. There are cryptographic reasons, but another, simpler reason is that the key that you use for encrypting can be held in escrow by other people (for example, the company you work for) to have access to the contents of all of your envelopes if needed, but the key you use for signing should only be given to people you would trust to legally sign in your place, as if a power of attorney.
Related
I have searched for HOURS on how this works and I just can't get how this can be. The only given definitions are that public keyed encrypted message can only be decrypted by private key. To me, that's just nonsense and I will explain.
A website needs to be downloaded by your browser which also means that Javascript scripts and all the other stuff are accessible to anyone that catches your website if he wishes too. This also means that now, this person knows how you calculate your stuff with your public key making it possible WITHOUT the private key to decrypt it.
I'm just trying to figure out how this works and to me it does not make sens that you CANNOT decrypt an ecrypted text from a public key when you have access to all the calculations made from the side it encrypted.
I mean, when you send a password for example, first, on YOUR end, the browser's end, it encrypts the data to be recieved by the server. By encrypting the data from the browser's end, anyone that took a look on your source code can know how you encrypted it which now can be used to decrypt it. I am creating a new encryption system for our website where the server randomly creates a session key that can only be used by the user with the corresponding session. So only the 2 computers can talk to each other with the same key so if you use the same key on another computer, it just won't work as each key is stored for each session which the key dies after a set amount of time. With what I read, this seams to be called a symetric key system. I want to try and program my own assymetric key system but in all cases when I read, I can only figure out that no matter what happens as an encryption on the client's side, if a malicious person intercepts just before sending the information, he has access to how the encryption worked and therefor, does not need the private key on the server side as he just needs to reverse the process knowing how it was done on the client's side.
I'm starting to think myself as stupid thinking that way.
I'll add a little more information as I think we don't quite catch what I mean. When sending a password, say my name "David" and let's name our user WebUser. We will name our maleficient user BadGuy. So BadGuy hapopens to integrate himself in between WebUser and his browser. BadGuy also recieves ALL javascripts of the webpage permitting him to see how the calculations work before it is sent. WebUser enters his password "David" which is submitted to the javascript encryption system. Right off the bat, BadGuy does not need to decrypot anything as he already caught the password. BUT when the website responds, BadGuy has all the calculations and can use the receieved encrypted data and decrypt it using the decryption calculations he can see in the recieved web pages code.
So the only thing I can understand is that Assymetric keys are used for encryption which technically is decryptable using public known numbers. But in cas of RSA, these 2 numbers are so large that it would take years to figure out the known decryptor. As I can also undersnat is that it is pretty much easier to create the 2 numbers from the private number. But in any case, the encryption process usually ends up with a shared temporary intimate key between the two parties for for faster commuinication and that noone can ever prevent a BagGuy between User and Browser but with todays technocolgies, the real threat is more MiTM attacks where one will sniff the network. In all cases, there is no definate way to communicate 100% of the data in a undecryptable way as at least 50% of it is decryptable i/e data coming from one side or data going to the other side.
Assymetric encryption has two keys, a public and a private key, as you correctly described, so don't feel stupid. Both keys can be used for encryption and decryption, however, if data encrypted by the public key can only be decrypted by the private key and data encrypted by the private key can only be decrypted by the public key.
As a result, in order to be successfully involved in a communication using assymetric encryption you will need to have both a public and a private key.
You share your public key with others, that is, whatever data you receive, it will be encrypted with the public key. You will subsequently be able to decrypt it using your private key, which is your secret. When you send data to the other side of the communication, you encrypt it using your private key and the other side, which has your public key will be able to decrypt it.
Consider the example of versioning. You are involved in a project with some team members. When you pull the commits of others, it is encrypted with your public key, so once it is downloaded at your end, you will be able to decrypt it via your private key. As you work and do your commits, you will push the changes into the repository, encrypted using your private key. The other side of the communication already has your public key and will be able to decrypt it. It is important that you do not share your private key with anyone, so your team-mates will not be able to impersonate you, committing malicious code in your name. You can share your public key with anyone, but it is recommended to share it only with trusted people, like your team-mates, so no one else will be able to decrypt anything encrypted by your private key.
Essentially your public key is a ridiculously large number, which is the result by multiplying two primes (private key). The two primes could be found out by prime factorization, but since the public key is a very very large number, doing the prime factorization would take such a looong time that no one will sit and wait for the time (centuries) while the factorization is being executed and the results are found out.
A session id is a value which identifies a session. If there is a single such value, then it is not an assymetric encryption, as there is no public and private key involved and once someone steals the session ID, as you correctly pointed out, the malicious third person/system can impersonate the actual user and do nasty things. So the problem you have identified actually exists, but this is not a new problem and solutions were implemented. The solution you are looking for is HTTPS. Once your site gets a proper certificate, you will be able to use assymetric encryption safe and sound. Under the hood the server will have the public key of the user's session, while the user will use the private key to encrypt/decrypt and if a middle man intercepts the public key of the session (which is not a session id), the malicious third person will not be able to impersonate the actual user. Read more here:
https://en.wikipedia.org/wiki/Transport_Layer_Security
extending the previous answer
I'm just wandering how an attacker positionned between the user and his browser cannot intercept the connection details when they are clear texte to beggin with and to end with.
The magic here is called DH key exchange.
The symmetric encryption key is derived using Diffie–Hellman key exchange, where the common encryption key is exchanged.
Any "listening" party (your BadGuy) woudn't be able to derive the session key even by sniffing out the whole communications. The server will use its certificate and private key to make sure the client communicates with the legitimate target. This prevents an active "man in the middle" to pose as a false server.
it does not make sens that you CANNOT decrypt an ecrypted text from a public key when you have access to all the calculations made from the side it encrypted.
Asymmetric cryptography is based on so called "trapdoor" funtions. It means it is easy to calculate the function one way (e.g. encrypt data), but very difficult (not feasible) to od it opposite way without some secret value (private key). Indeed sometimes it is difficult to understand it and there are a lot of constraints under the asymmetric encryption is really secure. That's why you would always use some trusted library than do it yourself.
By encrypting the data from the browser's end, anyone that took a look on your source code can know how you encrypted it which now can be used to decrypt it.
Not without the random secret key, which is derived between the client and server during the key exchange (see the first paragraph).
I am creating a new encryption system for our website where the server randomly creates a session key that can only be used by the user with the corresponding session.
It's one of the rules in the field of cryptography - do not design your own crypto!
That's usually a bad idea. Please note the currently used secure channels (SSL, TLS, .. based on RSA, ECC) are designed, reviewed and used by a lot of smart people who know what they are doing, how to mitigate different attack vectors. And IMHO it is still not perfect, but it's the best we have.
I want to create an application, where multiple people should be able to communicate with each other securely (think of a decentral group chat) - sounds easy, but here is my problem:
As far as I understood, with asymmetrical encryption you have a public key and a private key. Everyone who wants to send a message to someone has to encrypt it with the public key and the recipient can decrypt it with the private key.
But if there are more than two people that should be able to read all messages, I don´t know how this should work...
Either everyone has the public and the private key - which I think is a bad idea - or everyone has to have everybodys public key and has to send a seperate message to each recipient.
Also, I want to make a 100% sure, that the one who sends a message really is who he pretends to be. (so nobody is able to "fake" messages)
Is there an encryption algorithm that solves my problem?
Controlling the extend of the recipient group
In a comment to Richard Schwartz' good answer, you ask
Is it possible with this algorithm to ensure that only one is able to invite others? As far as I understood, everybody could distribute the decrypted session key.
When applying the protocol in a group chat scenario, don't let the term "session key" mislead you. Rather, think of the key for symmetric encryption as a "message key": Each time someone sends a message to the group, they should generate a new random symmetric key, encrypt it with every legit receiver's public key separately and prepend all these cryptograms to the symmetrically encrypted message. This way, each sender decides independently whom they consider a part of the legit recipients group of their own sent messages.
This will give the protocol some more transmission overhead, but this probably won't matter in practice. What could matter is the 'cost' of getting larger amounts of 'good' randomness (entropy) to generate sufficiently unpredictable message keys. So an acceptable optimization might be that, if the group of legit recipients has remained the same, a sender might re-use the session key of their own previously sent message. Never though should they re-purpose a sessions key received from another group member for sending messages of their own.
Off course, even if each sender decides independently whom they consider a legit recipient of their message, you can't keep any legit recipient from compromising messages they received: They can simply forward the messages unencrypted (or encrypted for someone not in the original recipient group) to whomever they want.
Ensuring authenticity
In an edit to your original question, you added
Also, I want to make a 100% sure, that the one who sends a message really is who he pretends to be. (so nobody is able to "fake" messages)
Encryption can't do that, but cryptography has another way to make sure that
the message actually comes from whom claimed to have sent it
the message hasn't been tampered with since
And the way of ensuring these things is signatures, which also are something that public-private-key cryptography enables. Let senders sign their messages with their private key. (Which usually means 'encrypting' a cryptographically secure hash of the message with the private key.) And let receivers verify the signatures (by 'decrypting' the signature with the sender's public key and comparing the result with a hash of the message they computed themselves.)
Don't roll your own anything (except when you should)
Richard's answers advices you to not roll your own (pseudo) random number generator. For anything you plan to use in production, I'd extend this to anything encryption:
Don't invent your own protocols
Don't invent your own cyphers, signatures or hash functions
Don't invent your own way of gathering entropy
Don't roll your own implementations of any of the above, even if invented by others
Instead, use well-established cryptography libraries. These are written and reviewed by experts in both cryptographic theory and in the practices of writing secure software. And while even these libraries are often enough found to have (sometimes embarrassing) security issues, nothing you'll come up with yourself will be nearly as secure as them.
Though, for learning, implementing any or all of the listed stuff (including pseudo random number generators) is great exercise and helps you understand at least some aspects of the underlying cryptography. And this understanding is important, as it's often difficult enough to correctly and securely use the well-established libraries, even when you do have some knowledge of the concepts they reveal through their interfaces.
And of course for innovating within cryptography, inventing new stuff (and getting it scrutinizingly reviewed by the community of experts in the field) is necessary, too. That new stuff just shouldn't be used for anything serious before it has passed that review successfully.
I assume you mean asymmetric encryption, not asynchronous encryption.
In most cases, we don't actually use an asymmetric cipher to encrypt the content of messages. That's because messages can be large, and asymmetric ciphers are slow in comparison to symmetric ciphers. It's also because of the issue you are contending with here: in a multi-party commmunicaiton, you'd like to be able to just send the message once and have everybody be able to read it. So the trick is that we combine asymmetric and symmetric techniques into a protocol that solves the problem.
First, we generate a random symmetric key which we can call the "session key". We're going to distribute this session key to all recipients, but we need to do this securely. Here's where we're actually going to use asymmetric encryption. We encrypt the session key once for each recipient using each of their public keys and an asymmetric cipher (such as RSA), and we send the encrypted session key to each recipeint. We can send it to each recipient separately, or we can just build a structure that looks like this:
"recip1|recip1EncryptedSessionKey|recip2|recip2EncryptesSessionKey..."
and send the whole thing out to all recipients, each of whom will be able to parse it and decrypt their own encrypted copy of the session key. (This is generally how it's done in encrypted email: the list of all encrypted versions of the session key for all recipients is enclosed with the message, and everyone gets the exact same email.)
Once we've securely distributed the session key to all recipients, we can use the session key to encrypt each message just once with a symmetric cipher (such as AES), and send the same encrypted message to all recipients. Since they all have received a copy of the session key, they can all read it and act on it.
Note that as in all things having to do with encryption, it is crucial that the session key is really random. Don't just rely on a plain vanilla random number generator for it, and for heavens sake don't roll your own. Make sure that you use a cryptographically secure pseudorandom number generator.
A real chat system would likely be quite a bit more complicated, probably with a mechanism for re-establishing a new session key periodically, and the details of a secure protocol can be quite intricate. I.e., consider how you would protect against a bad-guy stepping in and fooling everyone into using a session key of his choosing! But the basics are as above.
I did some research on the topic but could not find anything similar to my question. So I hope some of you great guys may help me out.
I want to use AES128 encryption (CFB-Mode) for the networking in my application between two individual clients. The data being exchanged consists only of textual strings of a specific structure, for example, the first bytes allways tell the recipient the kind of message they are receiving, so they can process them. With AES I want to ensure the confidentiality of the message, but now the question of "integrity" arises.
Normaly you would consider using a MAC. But isn't it guaranteed that nobody has altered the message, if the recipient is able to decrypt it correctly, i.e. that the message can be used correctly in his application because of the string's format? Wouldn't altering (even 1 bit) the encrypted message by a third party result in garbage during decryption?
Furthermore let's assume that the application is a multi-party peer-to-peer-game, where two of the players are communicating with each other on a private but AES-encrypted channel. Now the originator of the message is not playing fair and intentionally sending a fraudulent encrypted message to convey an impression that the message has been altered by a random third party (to force a player to quit). Now the recipient would have no chance to determine if the message has been altered or if the sender acts fraudulent, am I right? So Integrity would not be of much use in such a situation and could be neglected?
This may sound like an odd and out of world example. But it's something I recently encountered in a similar application and I am asking myself if there is a solution to the problem or if I got the basic Idea of AES encryption.
As you said, you may detect changes in the format of the plain text message after encryption. But at what level would it go wrong? Do you have something that is large and redundant enough to be tested? What are you going to do if the altered plain text results in some obscure exception somewhere down the line? With CFB (like most modes) an attacker can make sure that only the last part of the message is altered, for instance, and leave the first blocks intact.
And you are worried about cheats as well.
In my opinion, you are much better off using a MAC or HMAC algorithm, or a cipher mode that provides integrity/authentication on top of confidentiality (EAX or GCM for instance). If you are sure nobody else has the symmetric key, an authentication check (such as a MAC) will prove that the data has been signed by the correct key. So no, the user cannot claim that the data has been changed in transport if the authenticity checks succeed.
The next question becomes: can you trust that the symmetric key is only in possession of the other player? For this you might want to use some sort of PKI scheme (using assymetric keys) together with a key exchange mechanism such as DH. But that is for a later, if you decide to go that way.
This is a bit out of my depth, but...
Yes, modifying the encrypted bytes of an AES encrypted message should cause the decryption to fail (this has been my experience with the c# implementation). The client who decrypts will know the message is invalid. EDIT: apparently this is not the case. Looks like you'd need a CRC or hash to verify the message was successfully decrypted. The more serious problem is if the secret AES key is leaked (and in a peer-to-peer environment, the key has to be sent so the receiver can decrypt the message at all). Then a 3rd party can send messages as if they were a legitimate client, and they will be accepted as OK.
Integrity is much harder. I'm not entirely sure how robust you want things to be, but I suspect you want to use public key encryption. This allows you to include a hash of the message (like a signature or MAC) based on the private key to assert the message validity. The receiver uses the public key to verify the hash and thus the original message is OK. The main advantage of public key encryption over symmetric encryption like AES is you don't have to send the private key, only the public key. This makes it much harder to impersonate a client. SSL/TLS uses public key encryption.
In any case, once you have identified a client sending invalid messages, you're in the world of deciding to trust that client or not. That is, is the corruption due to malicious behaviour (what you're worried about)? Or a faulty client implementation (incompetence)? Or a faulty communications link?. And this is where encryption (or at least my knowledge of it) won't help you any more!
Additional regarding integrity:
If you assume no one else has access to your secret key, a CRC, hash, or HMAC would all suffice to ensure you detected changes. Simply take the body of your message, calculate the CRC, hash, whatever and append as a footer. If the hash doesn't match when you decrypt, the message has been altered.
The assumption that the secret key remains secret is quite reasonable. Especially if after some number of messages you generate new ones. SSH and WiFi's WPA both generate new keys periodically.
If you can't assume the secret key is secret, then you need to go to PKI to sign the message. With the AES key in a malicious 3rd party, they'll just generate whatever messages they want with the key.
There may be some mileage in including a sequence number in your message based on a RNG. If you use the same RNG and same seed for both parties, they should be able to predict what sequence number comes next. A 3rd party would need to intercept the original seed, and know how many messages have been sent to send valid but forged messages. (This assumes no messages can ever be lost or dropped.)
I know this is more or less an algorithm or design problem and not so much programming, but I hope it's alright.
I am using a blinded message and having it signed by C. After the signing I want to remove the blinding and have other users A and B be able to share the message. Is this safe or can the signer still read these messages if they have the public and private keys? Should I take further steps after unblinding to ensure the confidentiality?
I have read various math formulas explaining how this works, but I am more of a programmer than a mathematician. I want to ensure the confidentiality and I am not sure if it's working.
Signatures do not ensure confidentiality. If you have data which must be transmitted but should remain confidential, then you must use a transmission mechanism which ensures confidentiality.
You apparently also want the message to be signed by entity C, but without giving any clue on the message to C. Generally speaking, the signing entity only needs to know the hash of the signed data. The signer may then try to "guess" the data by hashing potential messages and see if one matches the hash it received. This is the point where blind signatures come into action: to prevent the signer from even seeing the hashed message.
It so happens that with RSA, the hashed message can be recovered from the signature and the signer's public key. The signer (C) certainly knows his own public key. Hence, the signature itself must be kept confidential (otherwise, it would make no sense to use blind signatures in the first place). Thus, whatever mechanism you use to keep the message itself confidential when it is transmitted from A to B, must also be applied to the signature (and the signature is not that mechanism).
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What is the difference between encrypting some data vs signing some data (using RSA)?
Does it simply reverse the role of the public-private keys?
For example, I want to use my private key to generate messages so only I can possibly be the sender. I want my public key to be used to read the messages and I do not care who reads them. I want to be able to encrypt certain information and use it as a product-key for my software. I only care that I am the only one who can generate these. I would like to include my public key in my software to decrypt/read the signature of the key. I do not care who can read the data in the key, I only care that I am the only verifiable one who can generate them.
Is signing useful in this scenario?
When encrypting, you use their public key to write a message and they use their private key to read it.
When signing, you use your private key to write message's signature, and they use your public key to check if it's really yours.
I want to use my private key to generate messages so only I can possibly be the sender.
I want my public key to be used to read the messages and I do not care who reads them
This is signing, it is done with your private key.
I want to be able to encrypt certain information and use it as a product key for my software.
I only care that I am the only one who can generate these.
If you only need to know it to yourself, you don't need to mess with keys to do this. You may just generate random data and keep it in a database.
But if you want people to know that the keys are really yours, you need to generate random data, keep in it a database AND sign it with your key.
I would like to include my public key in my software to decrypt/read the signature of the key.
You'll probably need to purchase a certificate for your public key from a commercial provider like Verisign or Thawte, so that people may check that no one had forged your software and replaced your public key with theirs.
In RSA crypto, when you generate a key pair, it's completely arbitrary which one you choose to be the public key, and which is the private key. If you encrypt with one, you can decrypt with the other - it works in both directions.
So, it's fairly simple to see how you can encrypt a message with the receiver's public key, so that the receiver can decrypt it with their private key.
A signature is proof that the signer has the private key that matches some public key. To do this, it would be enough to encrypt the message with that sender's private key, and include the encrypted version alongside the plaintext version. To verify the sender, decrypt the encrypted version, and check that it is the same as the plaintext.
Of course, this means that your message is not secret. Anyone can decrypt it, because the public key is well known. But when they do so, they have proved that the creator of the ciphertext has the corresponding private key.
However, this means doubling the size of your transmission - plaintext and ciphertext together (assuming you want people who aren't interested in verifying the signature, to read the message). So instead, typically a signature is created by creating a hash of the plaintext. It's important that fake hashes can't be created, so cryptographic hash algorithms such as SHA-2 are used.
So:
To generate a signature, make a hash from the plaintext, encrypt it with your private key, include it alongside the plaintext.
To verify a signature, make a hash from the plaintext, decrypt the signature with the sender's public key, check that both hashes are the same.
There are two distinct but closely related problems in establishing a secure communication
Encrypt data so that only authorized persons can decrypt and read it.
Verify the identity/authentication of sender.
Both of these problems can be elegantly solved using public key cryptography.
I. Encryption and decryption of data
Alice wants to send a message to Bob which no one should be able to read.
Alice encrypts the message with Bob's public key and sends it over.
Bob receives the message and decrypts it using his private Key.
Note that if A wants to send a message to B, A needs to use the Public
key of B (which is publicly available to anyone) and neither public
nor private key of A comes into picture here.
So if you want to send a message to me you should know and use my public key which I provide to you and only I will be able to decrypt the message since I am the only one who has access to the corresponding private key.
II. Verify the identity of sender (Authentication)
Alice wants to send a message to Bob again. The problem of encrypting the data is solved using the above method.
But what if I am sitting between Alice and Bob, introducing myself as 'Alice' to Bob and sending my own message to Bob instead of forwarding the one sent by Alice. Even though I can not decrypt and read the original message sent by Alice(that requires access to Bob's private key) I am hijacking the entire conversation between them.
Is there a way Bob can confirm that the messages he is receiving are actually sent by Alice?
Alice signs the message with her private key and sends it over. (In practice, what is signed is a hash of the message, e.g. SHA-256 or SHA-512.)
Bob receives it and verifies it using Alice's public key. Since Alice's public key successfully verified the message, Bob can conclude that the message has been signed by Alice.
Yeah think of signing data as giving it your own wax stamp that nobody else has. It is done to achieve integrity and non-repudiation. Encryption is so no-one else can see the data. This is done to achieve confidentiality. See wikipedia http://en.wikipedia.org/wiki/Information_security#Key_concepts
A signature is a hash of your message signed using your private key.
Signing is producing a "hash" with your private key that can be verified with your public key. The text is sent in the clear.
Encrypting uses the receiver's public key to encrypt the data; decoding is done with their private key.
So, the use of keys is not reversed (otherwise your private key wouldn't be private anymore!).
You are describing exactly how and why signing is used in public key cryptography. Note that it's very dangerous to sign (or encrypt) aritrary messages supplied by others - this allows attacks on the algorithms that could compromise your keys.
Signing indicates you really are the source or vouch for of the object signed. Everyone can read the object, though.
Encrypting means only those with the corresponding private key can read it, but without signing there is no guarantee you are behind the encrypted object.
Functionally, you use public/private key encryption to make certain only the receiver can read your message. The message is encrypted using the public key of the receiver and decrypted using the private key of the receiver.
Signing you can use to let the receiver know you created the message and it has not changed during transfer. Message signing is done using your own private key. The receiver can use your public key to check the message has not been tampered.
As for the algorithm used: that involves a one-way function see for example wikipedia. One of the first of such algorithms use large prime-numbers but more one-way functions have been invented since.
Search for 'Bob', 'Alice' and 'Mallory' to find introduction articles on the internet.
What is the difference between encrypting some data vs signing some data (using RSA)?
Encryption preserves confidentiality of the message ("some data"), while signing provides non-repudiation: i.e. only the entity that signed it could have signed it. There are functional differences as well; read on.
Does it simply reverse the role of the public-private keys?
Absolutely not. The use of the same private keys for signing and decryption (or, likewise, the same public keys for verification and encryption) is frowned upon, as you should not mix purposes. This is not so much a mathematical issue (RSA should still be secure), but a problem with key management, where e.g. the signing key should have a shorter live and contain more protection before it is used.
For the same message, you should use the senders private key for signing and the receivers trusted public key for encryption. Commonly sign-then-encrypt is used otherwise an adversary could replace the signature with his own. Likewise you should use the private key of the receiver for decryption and the trusted public key of the sender for verification.
Furthermore, you should understand that signature generation doesn't use "encryption with the private key". Although all RSA operations are based upon modular exponentiation, the padding scheme is entirely different for signature generation. Furthermore, the public key has entirely different properties than the RSA private key in all practical uses of RSA.
For example, I want to use my private key to generate messages so only I can possibly be the sender.
That's non-repudiation property, which can be achieved by signing.
I want my public key to be used to read the messages and I do not care who reads them.
The public key should be considered known by all. If you want everybody to read the messages, then you simply do not encrypt them.
Signing will generally not influence the content of the message. The message is is considered separate from signatures. Officially such signatures are known as "signatures with appendix" where the appendix is the message. It's a bit weird name as the message is considered more important than the signature over it, but yeah. Only few signatures offer (partial) message recovery; they are not used much anymore and are generally considered deprecated.
Note that signature protocols such as CMS may deploy a container format that includes both the message and the signature. In that case you'd need first get the - still unencrypted - message out of the container, much like unzipping a file from a plain .zip archive. So the message may be hidden from view and cannot be directly used in that case.
I want to be able to encrypt certain information and use it as a product-key for my software. I only care that I am the only one who can generate these.
Encryption is used to achieve confidentiality. In the past RSA signature generation was often thought of as "encryption with the private key". However, the operations are quite different as explained above, and the later standards desperately try and separate encryption and signature generation.
I would like to include my public key in my software to decrypt/read the signature of the key. I do not care who can read the data in the key, I only care that I am the only verifiable one who can generate them.
Yes, this is called establishing trust in the public key. However, protecting your program code is very different from protecting messages. You can perform code signing but then you'd need something to check the signature outside of your code. There are operating systems that offer this.
There is Microsoft Authenticode for instance. Application stores like the iStore and Android app store may or may not use code signing, but they offer some reassurance that your application isn't cloned or at least not cloned within the store. Cryptography is not always the solution after all.
Keeping your code from being cloned / altered at all is much harder, and you'd be solidly in DRM territory if you go that way.
Is signing useful in this scenario?
Yes, absolutely. It can certainly help making sure that the messages were only signed by you, if there is trust in the public key. If it can be helpful for authenticating your application code / integrated public key depends entirely on the environment that you expect to run the code in.
In your scenario, you do not encrypt in the meaning of asymmetric encryption; I'd rather call it "encode".
So you encode your data into some binary representation, then you sign with your private key. If you cannot verify the signature via your public key, you know that the signed data is not generated with your private key. ("verification" meaning that the unsigned data is not meaningful)
Answering this question in the content that the questioners intent was to use the solution for software licensing, the requirements are:
No 3rd party can produce a license key from decompiling the app
The content of the software key does not need to be secure
Software key is not human readable
A Digital Signature will solve this issue as the raw data that makes the key can be signed with a private key which makes it not human readable but could be decoded if reverse engineered. But the private key is safe which means no one will be able to make licenses for your software (which is the point).
Remember you can not prevent a skilled person from removing the software locks on your product. So if they have to hack each version that is released. But you really don't want them to be able to generate new keys for your product that can be shared for all versions.
Python
The PyNaCl documentation has an example of 'Digital Signature' which will suite the purpose. http://pynacl.readthedocs.org/en/latest/signing/
and of cause NaCl project to C examples
What is the difference between encrypting some data vs signing some data (using RSA)?
RSA merely the only public-key cryptosystem that naively supports both public-key encryption and digital signatures.
This usually confuses beginners since various sources/lecturers that say
RSA decryption is the RSA signature.
No, it is not!
The confusing comes from the textbook RSA
the textbook RSA encryption;
message m and calculates c = m^e mod n for encryption and m = c^d mod n for the decryption.
the textbook RSA signatures;
message m and calculates sg = m^d mod n for verification and m == sg^e mod n for the signature verification.
Both are not secure and they are not used in the real-life!
Does it simply reverse the role of the public-private keys?
No, it is not!
Encryption
For RSA encryption one must be using either RSASSA-PKCS1-v1_5 padding or Optimal Asymmetric Encryption Padding (OAEP). These paddings have overhead to the message. For example, PKCS1-v1_5 defined as
It has an EM structure as this
EM = 0x00 || 0x02 || PS || 0x00 || M.
so what are they;
PS is at least eight FFs block
M is the message
the first 0x00 guarantees that EM is less than the modulus.
The rest details like the size of FF block etc. can be found in rfc 8017 section 7.2.1
So it has a special message structure to be secure which is proven to be secure very lately (2018). The padding has at least 11-byte overhead.
Signature
The correct term for signature is signing and verification. For secure signing, RSA needs RSA-PSS (Probabilistic signature scheme). The structure is a bit complex, a picture will tell most of it
Once you hash the message and properly padded, then you can use your private key to sign your padded message!
For the verification, use the public key on the signed message and verify using the padding rules.
Prefer OAEP since RSASSA-PKCS1-v1_5 hard to implement correctly and those incorrect implementations caused many attacks over the year despite that is is proven to be secure.
Let finish all with the Cornell University page;
RSA Signing is Not RSA Decryption