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@ -13,9 +13,7 @@ use crate::{ |
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poly_iop::{prelude::SumCheck, PolyIOP},
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IOPProof,
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};
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use arithmetic::{
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build_eq_x_r_vec, fix_last_variables, DenseMultilinearExtension, VPAuxInfo, VirtualPolynomial,
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};
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use arithmetic::{build_eq_x_r_vec, DenseMultilinearExtension, VPAuxInfo, VirtualPolynomial};
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use ark_ec::{AffineCurve, PairingEngine, ProjectiveCurve};
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use ark_std::{end_timer, log2, start_timer, One, Zero};
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use std::{marker::PhantomData, rc::Rc};
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@ -38,10 +36,11 @@ where |
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/// Steps:
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/// 1. get challenge point t from transcript
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/// 2. build eq(t,i) for i in [0..k]
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/// 3. build \tilde g(i, b) = eq(t, i) * f_i(b)
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/// 4. compute \tilde eq
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/// 5. run sumcheck on \tilde eq * \tilde g(i, b)
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/// 6. build g'(a2) where (a1, a2) is the sumcheck's point
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/// 3. build \tilde g_i(b) = eq(t, i) * f_i(b)
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/// 4. compute \tilde eq_i(b) = eq(b, point_i)
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/// 5. run sumcheck on \sum_i=1..k \tilde eq_i * \tilde g_i
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/// 6. build g'(X) = \sum_i=1..k \tilde eq_i(a2) * \tilde g_i(X) where (a2) is
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/// the sumcheck's point 7. open g'(X) at point (a2)
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pub(crate) fn multi_open_internal<E, PCS>(
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prover_param: &PCS::ProverParam,
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polynomials: &[PCS::Polynomial],
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@ -64,7 +63,6 @@ where |
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let num_var = polynomials[0].num_vars;
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let k = polynomials.len();
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let ell = log2(k) as usize;
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let merged_num_var = num_var + ell;
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// challenge point t
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let t = transcript.get_and_append_challenge_vectors("t".as_ref(), ell)?;
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@ -72,40 +70,39 @@ where |
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// eq(t, i) for i in [0..k]
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let eq_t_i_list = build_eq_x_r_vec(t.as_ref())?;
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// \tilde g(i, b) = eq(t, i) * f_i(b)
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// \tilde g_i(b) = eq(t, i) * f_i(b)
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let timer = start_timer!(|| format!("compute tilde g for {} points", points.len()));
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let mut tilde_g_eval = vec![E::Fr::zero(); 1 << (ell + num_var)];
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let block_size = 1 << num_var;
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let mut tilde_gs = vec![];
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for (index, f_i) in polynomials.iter().enumerate() {
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let mut tilde_g_eval = vec![E::Fr::zero(); 1 << num_var];
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for (j, &f_i_eval) in f_i.iter().enumerate() {
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tilde_g_eval[index * block_size + j] = f_i_eval * eq_t_i_list[index];
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tilde_g_eval[j] = f_i_eval * eq_t_i_list[index];
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}
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tilde_gs.push(Rc::new(DenseMultilinearExtension::from_evaluations_vec(
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num_var,
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tilde_g_eval,
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)));
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}
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let tilde_g = Rc::new(DenseMultilinearExtension::from_evaluations_vec(
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merged_num_var,
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tilde_g_eval,
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));
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end_timer!(timer);
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let timer = start_timer!(|| format!("compute tilde eq for {} points", points.len()));
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let mut tilde_eq_eval = vec![E::Fr::zero(); 1 << (ell + num_var)];
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for (index, point) in points.iter().enumerate() {
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let mut tilde_eqs = vec![];
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for point in points.iter() {
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let eq_b_zi = build_eq_x_r_vec(point)?;
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let start = index * block_size;
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tilde_eq_eval[start..start + block_size].copy_from_slice(eq_b_zi.as_slice());
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tilde_eqs.push(Rc::new(DenseMultilinearExtension::from_evaluations_vec(
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num_var, eq_b_zi,
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)));
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}
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let tilde_eq = Rc::new(DenseMultilinearExtension::from_evaluations_vec(
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merged_num_var,
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tilde_eq_eval,
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));
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end_timer!(timer);
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// built the virtual polynomial for SumCheck
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let timer = start_timer!(|| format!("sum check prove of {} variables", num_var + ell));
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let timer = start_timer!(|| format!("sum check prove of {} variables", num_var));
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let step = start_timer!(|| "add mle");
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let mut sum_check_vp = VirtualPolynomial::new(num_var + ell);
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sum_check_vp.add_mle_list([tilde_g.clone(), tilde_eq], E::Fr::one())?;
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let mut sum_check_vp = VirtualPolynomial::new(num_var);
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for (tilde_g, tilde_eq) in tilde_gs.iter().zip(tilde_eqs.into_iter()) {
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sum_check_vp.add_mle_list([tilde_g.clone(), tilde_eq], E::Fr::one())?;
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}
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end_timer!(step);
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let proof = match <PolyIOP<E::Fr> as SumCheck<E::Fr>>::prove(&sum_check_vp, transcript) {
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@ -120,15 +117,23 @@ where |
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end_timer!(timer);
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// (a1, a2) := sumcheck's point
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let step = start_timer!(|| "open at a2");
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let a1 = &proof.point[num_var..];
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// a2 := sumcheck's point
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let a2 = &proof.point[..num_var];
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end_timer!(step);
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// build g'(a2)
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// build g'(X) = \sum_i=1..k \tilde eq_i(a2) * \tilde g_i(X) where (a2) is the
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// sumcheck's point \tilde eq_i(a2) = eq(a2, point_i)
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let step = start_timer!(|| "evaluate at a2");
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let g_prime = Rc::new(fix_last_variables(&tilde_g, a1));
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let mut g_prime_evals = vec![E::Fr::zero(); 1 << num_var];
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for (tilde_g, point) in tilde_gs.iter().zip(points.iter()) {
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let eq_i_a2 = eq_eval(a2, point)?;
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for (j, &tilde_g_eval) in tilde_g.iter().enumerate() {
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g_prime_evals[j] += tilde_g_eval * eq_i_a2;
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}
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}
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let g_prime = Rc::new(DenseMultilinearExtension::from_evaluations_vec(
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num_var,
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g_prime_evals,
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));
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end_timer!(step);
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let step = start_timer!(|| "pcs open");
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@ -150,8 +155,8 @@ where |
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/// Steps:
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/// 1. get challenge point t from transcript
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/// 2. build g' commitment
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/// 3. ensure \sum_i eq(t, <i>) * f_i_evals matches the sum via SumCheck
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/// verification 4. verify commitment
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/// 3. ensure \sum_i eq(a2, point_i) * eq(t, <i>) * f_i_evals matches the sum
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/// via SumCheck verification 4. verify commitment
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pub(crate) fn batch_verify_internal<E, PCS>(
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verifier_param: &PCS::VerifierParam,
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f_i_commitments: &[Commitment<E>],
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@ -175,34 +180,33 @@ where |
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let k = f_i_commitments.len();
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let ell = log2(k) as usize;
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let num_var = proof.sum_check_proof.point.len() - ell;
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let num_var = proof.sum_check_proof.point.len();
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// challenge point t
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let t = transcript.get_and_append_challenge_vectors("t".as_ref(), ell)?;
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// sum check point (a1, a2)
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let a1 = &proof.sum_check_proof.point[num_var..];
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// sum check point (a2)
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let a2 = &proof.sum_check_proof.point[..num_var];
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// build g' commitment
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let eq_a1_list = build_eq_x_r_vec(a1)?;
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let eq_t_list = build_eq_x_r_vec(t.as_ref())?;
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let mut g_prime_commit = E::G1Affine::zero().into_projective();
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for i in 0..k {
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let tmp = eq_a1_list[i] * eq_t_list[i];
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for (i, point) in points.iter().enumerate() {
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let eq_i_a2 = eq_eval(a2, point)?;
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let tmp = eq_i_a2 * eq_t_list[i];
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g_prime_commit += &f_i_commitments[i].0.mul(tmp);
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}
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// ensure \sum_i eq(t, <i>) * f_i_evals matches the sum via SumCheck
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// verification
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let mut sum = E::Fr::zero();
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for (i, &e) in eq_t_list.iter().enumerate().take(k) {
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sum += e * proof.f_i_eval_at_point_i[i];
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}
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let aux_info = VPAuxInfo {
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max_degree: 2,
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num_variables: num_var + ell,
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num_variables: num_var,
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phantom: PhantomData,
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};
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let subclaim = match <PolyIOP<E::Fr> as SumCheck<E::Fr>>::verify(
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@ -219,11 +223,7 @@ where |
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));
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},
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};
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let mut eq_tilde_eval = E::Fr::zero();
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for (point, &coef) in points.iter().zip(eq_a1_list.iter()) {
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eq_tilde_eval += coef * eq_eval(a2, point)?;
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}
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let tilde_g_eval = subclaim.expected_evaluation / eq_tilde_eval;
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let tilde_g_eval = subclaim.expected_evaluation;
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// verify commitment
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let res = PCS::verify(
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Charles Chen
1 year ago