I know: Never do your own crypto.

But this question is just theoretical.

Assume you do a Diffie-Hellmann Key Exchange with a server to produce a shared secret `x`

.
Then use a cryptographic hash function like sha3 to generate a pseudorandom bitstream like this: `p_i = sha3(x||p_(i-1))`

.

To encrypt the data simply xor all outgoing packets with the corresponding `p_i`

.
I realize that the key stream for otp must be completely random to assure the unbreakability, but would this scheme at least be as hard to break as the underlying hash function or the DH?

In my opinion it should be, but I'm new to crypto so please prove me wrong :)

Since the shared secret is only used for one session and assuming the hash function is a random oracle no keystream is ever used twice. By including `x`

in every `p_i`

an attacker has to break (not only find a collision) the first sent packet in order to decrypt the rest of the session, breaking any other packet will most likely be a collision and not give away the needed `x`

, only the content of this packet.
Also, breaking any packet requires at least plaintext knowledge but it gives you only this particular hash, not the previous/next hashes.

Thanks,

Zap