snarky
is an OCaml front-end for writing R1CS SNARKs.
It is modular over the backend SNARK library, and comes with backends
from libsnark.
Disclaimer: This code has not been thoroughly audited and should not be used in production systems.
CAVEAT This repository contains a substantial amount of obsolete
code. Earlier versions of the Mina project (the primary user of this
code) used the C/C++ backend implemented in src/
; most of that code
is no longer used. The exceptions are src/intf
and src/base
.
- First install libsnark's dependencies by running scripts/depends.sh, or following the instructions here.
- Then, make sure you have opam installed.
- Finally, install
snarky
and its dependencies by running
opam pin add [email protected]:o1-labs/snarky.git
and answering yes to the prompts.
The best place to get started learning how to use the library are the annotated examples.
- Election: shows how to use Snarky to verify an election was run honestly.
- Merkle update: a simple example updating a Merkle tree.
The intention of this library is to allow writing snarks by writing what look
like normal programs (whose executions the snarks verify). If you're an experienced
functional programmer, the basic idea (simplifying somewhat) is that there is a monad
Checked.t
so that a value of type 'a Checked.t
is an 'a
whose computation is
certified by the snark. For example, we have a function
mul : var -> var -> (var, _) Checked.t.
Given v1, v2 : var
, mul v1 v2
is a variable containg the product of v1 and v2,
and the snark will ensure that this is so.
One computation useful in snarks is verifying membership in a list. This is
typically accomplished using authentication paths in Merkle trees. Given a
hash entry_hash
, an address (i.e., a list of booleans) addr0
and an
authentication path (i.e., a list of hashes) path0
, we can write a checked
computation for computing the implied Merkle root:
let implied_root entry_hash addr0 path0 =
let rec go acc addr path =
let open Let_syntax in
match addr, path with
| [], [] -> return acc
| b :: bs, h :: hs ->
let%bind l = Hash.if_ b ~then_:h ~else_:acc
and r = Hash.if_ b ~then_:acc ~else_:h
in
let%bind acc' = Hash.hash l r in
go acc' bs hs
| _, _ -> failwith "Merkle_tree.Checked.implied_root: address, path length mismatch"
in
go entry_hash addr0 path0
The type of this function is
val implied_root : Hash.var -> Boolean.var list -> Hash.var list -> (Hash.var, 'prover_state) Checked.t
The return type (Hash.var, 'prover_state) Checked.t
indicates that the function
returns a "checked computation" producing a variable containing a hash, and can be
run by a prover with an arbitrary state type 'prover_state
.
Compare this definition to the following "unchecked" OCaml function (assuming a function hash
):
let implied_root_unchecked entry_hash addr0 path0 =
let rec go acc addr path =
match addr, path with
| [], [] -> acc
| b :: bs, h :: hs ->
let l = if b then h else acc
and r = if b then acc else h
in
let acc' = hash l r in
go acc' bs hs
| _, _ ->
failwith "Merkle_tree.implied_root_unchecked: address, path length mismatch"
in
go entry_hash addr0 path0
;;
The two obviously look very similar, but the first one can be run to generate an R1CS (and also an "auxiliary input") to verify that computation.
$ dune build