//! Demonstrates how to use Nova to produce a recursive proof of the correct execution of
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//! iterations of the MinRoot function, thereby realizing a Nova-based verifiable delay function (VDF).
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//! We execute a configurable number of iterations of the MinRoot function per step of Nova's recursion.
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type G1 = pasta_curves::pallas::Point;
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type G2 = pasta_curves::vesta::Point;
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use ::bellperson::{gadgets::num::AllocatedNum, ConstraintSystem, SynthesisError};
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use ff::PrimeField;
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use flate2::{write::ZlibEncoder, Compression};
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use nova_snark::{
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traits::{
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circuit::{StepCircuit, TrivialTestCircuit},
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Group,
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},
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CompressedSNARK, PublicParams, RecursiveSNARK,
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};
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use num_bigint::BigUint;
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use std::time::Instant;
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#[derive(Clone, Debug)]
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struct MinRootIteration<F: PrimeField> {
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x_i: F,
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y_i: F,
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x_i_plus_1: F,
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y_i_plus_1: F,
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}
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impl<F: PrimeField> MinRootIteration<F> {
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// produces a sample non-deterministic advice, executing one invocation of MinRoot per step
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fn new(num_iters: usize, x_0: &F, y_0: &F) -> (Vec<F>, Vec<Self>) {
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// although this code is written generically, it is tailored to Pallas' scalar field
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// (p - 3 / 5)
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let exp = BigUint::parse_bytes(
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b"23158417847463239084714197001737581570690445185553317903743794198714690358477",
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10,
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)
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.unwrap();
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let mut res = Vec::new();
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let mut x_i = *x_0;
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let mut y_i = *y_0;
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for _i in 0..num_iters {
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let x_i_plus_1 = (x_i + y_i).pow_vartime(exp.to_u64_digits()); // computes the fifth root of x_i + y_i
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// sanity check
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let sq = x_i_plus_1 * x_i_plus_1;
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let quad = sq * sq;
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let fifth = quad * x_i_plus_1;
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debug_assert_eq!(fifth, x_i + y_i);
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let y_i_plus_1 = x_i;
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res.push(Self {
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x_i,
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y_i,
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x_i_plus_1,
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y_i_plus_1,
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});
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x_i = x_i_plus_1;
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y_i = y_i_plus_1;
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}
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let z0 = vec![*x_0, *y_0];
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(z0, res)
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}
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}
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#[derive(Clone, Debug)]
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struct MinRootCircuit<F: PrimeField> {
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seq: Vec<MinRootIteration<F>>,
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}
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impl<F> StepCircuit<F> for MinRootCircuit<F>
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where
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F: PrimeField,
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{
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fn arity(&self) -> usize {
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2
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}
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fn synthesize<CS: ConstraintSystem<F>>(
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&self,
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cs: &mut CS,
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z: &[AllocatedNum<F>],
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) -> Result<Vec<AllocatedNum<F>>, SynthesisError> {
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let mut z_out: Result<Vec<AllocatedNum<F>>, SynthesisError> =
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Err(SynthesisError::AssignmentMissing);
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// use the provided inputs
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let x_0 = z[0].clone();
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let y_0 = z[1].clone();
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// variables to hold running x_i and y_i
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let mut x_i = x_0;
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let mut y_i = y_0;
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for i in 0..self.seq.len() {
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// non deterministic advice
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let x_i_plus_1 =
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AllocatedNum::alloc(cs.namespace(|| format!("x_i_plus_1_iter_{i}")), || {
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Ok(self.seq[i].x_i_plus_1)
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})?;
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// check the following conditions hold:
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// (i) x_i_plus_1 = (x_i + y_i)^{1/5}, which can be more easily checked with x_i_plus_1^5 = x_i + y_i
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// (ii) y_i_plus_1 = x_i
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// (1) constraints for condition (i) are below
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// (2) constraints for condition (ii) is avoided because we just used x_i wherever y_i_plus_1 is used
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let x_i_plus_1_sq = x_i_plus_1.square(cs.namespace(|| format!("x_i_plus_1_sq_iter_{i}")))?;
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let x_i_plus_1_quad =
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x_i_plus_1_sq.square(cs.namespace(|| format!("x_i_plus_1_quad_{i}")))?;
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cs.enforce(
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|| format!("x_i_plus_1_quad * x_i_plus_1 = x_i + y_i_iter_{i}"),
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|lc| lc + x_i_plus_1_quad.get_variable(),
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|lc| lc + x_i_plus_1.get_variable(),
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|lc| lc + x_i.get_variable() + y_i.get_variable(),
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);
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if i == self.seq.len() - 1 {
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z_out = Ok(vec![x_i_plus_1.clone(), x_i.clone()]);
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}
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// update x_i and y_i for the next iteration
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y_i = x_i;
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x_i = x_i_plus_1;
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}
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z_out
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}
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fn output(&self, z: &[F]) -> Vec<F> {
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// sanity check
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debug_assert_eq!(z[0], self.seq[0].x_i);
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debug_assert_eq!(z[1], self.seq[0].y_i);
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// compute output using advice
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vec![
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self.seq[self.seq.len() - 1].x_i_plus_1,
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self.seq[self.seq.len() - 1].y_i_plus_1,
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]
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}
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}
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fn main() {
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println!("Nova-based VDF with MinRoot delay function");
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println!("=========================================================");
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let num_steps = 10;
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for num_iters_per_step in [1024, 2048, 4096, 8192, 16384, 32768, 65535] {
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// number of iterations of MinRoot per Nova's recursive step
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let circuit_primary = MinRootCircuit {
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seq: vec![
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MinRootIteration {
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x_i: <G1 as Group>::Scalar::zero(),
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y_i: <G1 as Group>::Scalar::zero(),
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x_i_plus_1: <G1 as Group>::Scalar::zero(),
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y_i_plus_1: <G1 as Group>::Scalar::zero(),
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};
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num_iters_per_step
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],
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};
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let circuit_secondary = TrivialTestCircuit::default();
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println!("Proving {num_iters_per_step} iterations of MinRoot per step");
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// produce public parameters
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let start = Instant::now();
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println!("Producing public parameters...");
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let pp = PublicParams::<
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G1,
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G2,
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MinRootCircuit<<G1 as Group>::Scalar>,
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TrivialTestCircuit<<G2 as Group>::Scalar>,
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>::setup(circuit_primary.clone(), circuit_secondary.clone());
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println!("PublicParams::setup, took {:?} ", start.elapsed());
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println!(
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"Number of constraints per step (primary circuit): {}",
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pp.num_constraints().0
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);
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println!(
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"Number of constraints per step (secondary circuit): {}",
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pp.num_constraints().1
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);
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println!(
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"Number of variables per step (primary circuit): {}",
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pp.num_variables().0
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);
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println!(
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"Number of variables per step (secondary circuit): {}",
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pp.num_variables().1
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);
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// produce non-deterministic advice
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let (z0_primary, minroot_iterations) = MinRootIteration::new(
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num_iters_per_step * num_steps,
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&<G1 as Group>::Scalar::zero(),
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&<G1 as Group>::Scalar::one(),
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);
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let minroot_circuits = (0..num_steps)
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.map(|i| MinRootCircuit {
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seq: (0..num_iters_per_step)
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.map(|j| MinRootIteration {
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x_i: minroot_iterations[i * num_iters_per_step + j].x_i,
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y_i: minroot_iterations[i * num_iters_per_step + j].y_i,
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x_i_plus_1: minroot_iterations[i * num_iters_per_step + j].x_i_plus_1,
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y_i_plus_1: minroot_iterations[i * num_iters_per_step + j].y_i_plus_1,
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})
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.collect::<Vec<_>>(),
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})
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.collect::<Vec<_>>();
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let z0_secondary = vec![<G2 as Group>::Scalar::zero()];
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type C1 = MinRootCircuit<<G1 as Group>::Scalar>;
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type C2 = TrivialTestCircuit<<G2 as Group>::Scalar>;
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// produce a recursive SNARK
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println!("Generating a RecursiveSNARK...");
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let mut recursive_snark: RecursiveSNARK<G1, G2, C1, C2> = RecursiveSNARK::<G1, G2, C1, C2>::new(
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&pp,
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&minroot_circuits[0],
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&circuit_secondary,
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z0_primary.clone(),
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z0_secondary.clone(),
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);
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for (i, circuit_primary) in minroot_circuits.iter().take(num_steps).enumerate() {
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let start = Instant::now();
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let res = recursive_snark.prove_step(
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&pp,
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circuit_primary,
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&circuit_secondary,
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z0_primary.clone(),
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z0_secondary.clone(),
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);
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assert!(res.is_ok());
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println!(
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"RecursiveSNARK::prove_step {}: {:?}, took {:?} ",
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i,
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res.is_ok(),
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start.elapsed()
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);
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}
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// verify the recursive SNARK
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println!("Verifying a RecursiveSNARK...");
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let start = Instant::now();
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let res = recursive_snark.verify(&pp, num_steps, &z0_primary, &z0_secondary);
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println!(
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"RecursiveSNARK::verify: {:?}, took {:?}",
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res.is_ok(),
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start.elapsed()
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);
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assert!(res.is_ok());
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// produce a compressed SNARK
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println!("Generating a CompressedSNARK using Spartan with IPA-PC...");
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let (pk, vk) = CompressedSNARK::<_, _, _, _, S1, S2>::setup(&pp).unwrap();
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let start = Instant::now();
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type EE1 = nova_snark::provider::ipa_pc::EvaluationEngine<G1>;
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type EE2 = nova_snark::provider::ipa_pc::EvaluationEngine<G2>;
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type S1 = nova_snark::spartan::RelaxedR1CSSNARK<G1, EE1>;
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type S2 = nova_snark::spartan::RelaxedR1CSSNARK<G2, EE2>;
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let res = CompressedSNARK::<_, _, _, _, S1, S2>::prove(&pp, &pk, &recursive_snark);
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println!(
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"CompressedSNARK::prove: {:?}, took {:?}",
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res.is_ok(),
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start.elapsed()
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);
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assert!(res.is_ok());
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let compressed_snark = res.unwrap();
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let mut encoder = ZlibEncoder::new(Vec::new(), Compression::default());
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bincode::serialize_into(&mut encoder, &compressed_snark).unwrap();
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let compressed_snark_encoded = encoder.finish().unwrap();
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println!(
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"CompressedSNARK::len {:?} bytes",
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compressed_snark_encoded.len()
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);
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// verify the compressed SNARK
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println!("Verifying a CompressedSNARK...");
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let start = Instant::now();
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let res = compressed_snark.verify(&vk, num_steps, z0_primary, z0_secondary);
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println!(
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"CompressedSNARK::verify: {:?}, took {:?}",
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res.is_ok(),
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start.elapsed()
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);
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assert!(res.is_ok());
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println!("=========================================================");
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}
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}
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