mirror of
https://github.com/logos-storage/plonky2.git
synced 2026-01-13 03:03:05 +00:00
6c4ef29fec
* Simplify loop and remove clippy.
* Offset auxiliary coefficients so they're always positive.
* Split mul aux input into lo/hi parts.
* Rename register.
* Combine `QUO_INPUT_{LO,HI}`; rearrange some columns.
* Split `MODULAR_AUX_INPUT` into high and low pieces.
* Remove range_check_error debug output.
* First draft of generating the range checks.
* Remove opcodes for operations that were defined elsewhere.
* Clean up interface to build arithmetic trace.
* Fix "degree too high" bug in DIV by zero.
* Fix constraint_transition usage in recursive compare.
* Fix variable name; use named constant.
* Fix comment values.
* Fix bug in recursive MUL circuit.
* Superficial improvements; remove unnecessary genericity.
* Fix bug in recursive MULMOD circuit.
* Remove debugging noise; expand test.
* Minor comment.
* Enforce assumption in assert.
* Make DIV its own operation.
* Make MOD it's own operation; rename structs; refactor.
* Expand basic test.
* Remove comment.
* Put Stark operations in their own file.
* Test long traces.
* Minor comment.
* Address William's comments.
* Use `const_assert!` instead of `debug_assert!` because Clippy.
269 lines
10 KiB
Rust
269 lines
10 KiB
Rust
//! Support for the EVM MUL instruction.
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//!
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//! This crate verifies an EVM MUL instruction, which takes two
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//! 256-bit inputs A and B, and produces a 256-bit output C satisfying
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//!
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//! C = A*B (mod 2^256),
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//!
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//! i.e. C is the lower half of the usual long multiplication
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//! A*B. Inputs A and B, and output C, are given as arrays of 16-bit
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//! limbs. For example, if the limbs of A are a[0]...a[15], then
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//!
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//! A = \sum_{i=0}^15 a[i] β^i,
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//!
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//! where β = 2^16 = 2^LIMB_BITS. To verify that A, B and C satisfy
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//! the equation we proceed as follows. Define
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//!
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//! a(x) = \sum_{i=0}^15 a[i] x^i
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//!
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//! (so A = a(β)) and similarly for b(x) and c(x). Then A*B = C (mod
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//! 2^256) if and only if there exists q such that the polynomial
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//!
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//! a(x) * b(x) - c(x) - x^16 * q(x)
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//!
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//! is zero when evaluated at x = β, i.e. it is divisible by (x - β);
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//! equivalently, there exists a polynomial s (representing the
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//! carries from the long multiplication) such that
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//!
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//! a(x) * b(x) - c(x) - x^16 * q(x) - (x - β) * s(x) == 0
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//!
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//! As we only need the lower half of the product, we can omit q(x)
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//! since it is multiplied by the modulus β^16 = 2^256. Thus we only
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//! need to verify
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//!
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//! a(x) * b(x) - c(x) - (x - β) * s(x) == 0
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//!
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//! In the code below, this "constraint polynomial" is constructed in
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//! the variable `constr_poly`. It must be identically zero for the
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//! multiplication operation to be verified, or, equivalently, each of
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//! its coefficients must be zero. The variable names of the
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//! constituent polynomials are (writing N for N_LIMBS=16):
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//!
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//! a(x) = \sum_{i=0}^{N-1} input0[i] * x^i
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//! b(x) = \sum_{i=0}^{N-1} input1[i] * x^i
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//! c(x) = \sum_{i=0}^{N-1} output[i] * x^i
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//! s(x) = \sum_i^{2N-3} aux[i] * x^i
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//!
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//! Because A, B and C are 256-bit numbers, the degrees of a, b and c
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//! are (at most) 15. Thus deg(a*b) <= 30 and deg(s) <= 29; however,
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//! as we're only verifying the lower half of A*B, we only need to
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//! know s(x) up to degree 14 (so that (x - β)*s(x) has degree 15). On
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//! the other hand, the coefficients of s(x) can be as large as
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//! 16*(β-2) or 20 bits.
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//!
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//! Note that, unlike for the general modular multiplication (see the
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//! file `modular.rs`), we don't need to check that output is reduced,
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//! since any value of output is less than β^16 and is hence reduced.
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use plonky2::field::extension::Extendable;
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use plonky2::field::packed::PackedField;
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use plonky2::field::types::Field;
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use plonky2::hash::hash_types::RichField;
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use plonky2::iop::ext_target::ExtensionTarget;
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use crate::arithmetic::columns::*;
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use crate::arithmetic::utils::*;
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use crate::constraint_consumer::{ConstraintConsumer, RecursiveConstraintConsumer};
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pub fn generate<F: RichField>(lv: &mut [F]) {
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let input0 = read_value_i64_limbs(lv, MUL_INPUT_0);
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let input1 = read_value_i64_limbs(lv, MUL_INPUT_1);
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const MASK: i64 = (1i64 << LIMB_BITS) - 1i64;
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// Input and output have 16-bit limbs
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let mut output_limbs = [0i64; N_LIMBS];
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// Column-wise pen-and-paper long multiplication on 16-bit limbs.
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// First calculate the coefficients of a(x)*b(x) (in unreduced_prod),
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// then do carry propagation to obtain C = c(β) = a(β)*b(β).
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let mut cy = 0i64;
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let mut unreduced_prod = pol_mul_lo(input0, input1);
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for col in 0..N_LIMBS {
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let t = unreduced_prod[col] + cy;
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cy = t >> LIMB_BITS;
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output_limbs[col] = t & MASK;
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}
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// In principle, the last cy could be dropped because this is
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// multiplication modulo 2^256. However, we need it below for
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// aux_limbs to handle the fact that unreduced_prod will
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// inevitably contain one digit's worth that is > 2^256.
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lv[MUL_OUTPUT].copy_from_slice(&output_limbs.map(|c| F::from_canonical_i64(c)));
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pol_sub_assign(&mut unreduced_prod, &output_limbs);
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let mut aux_limbs = pol_remove_root_2exp::<LIMB_BITS, _, N_LIMBS>(unreduced_prod);
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aux_limbs[N_LIMBS - 1] = -cy;
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for c in aux_limbs.iter_mut() {
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// we store the unsigned offset value c + 2^20
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*c += AUX_COEFF_ABS_MAX;
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}
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debug_assert!(aux_limbs.iter().all(|&c| c.abs() <= 2 * AUX_COEFF_ABS_MAX));
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lv[MUL_AUX_INPUT_LO].copy_from_slice(&aux_limbs.map(|c| F::from_canonical_u16(c as u16)));
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lv[MUL_AUX_INPUT_HI]
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.copy_from_slice(&aux_limbs.map(|c| F::from_canonical_u16((c >> 16) as u16)));
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}
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pub fn eval_packed_generic<P: PackedField>(
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lv: &[P; NUM_ARITH_COLUMNS],
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yield_constr: &mut ConstraintConsumer<P>,
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) {
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let base = P::Scalar::from_canonical_u64(1 << LIMB_BITS);
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let is_mul = lv[IS_MUL];
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let input0_limbs = read_value::<N_LIMBS, _>(lv, MUL_INPUT_0);
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let input1_limbs = read_value::<N_LIMBS, _>(lv, MUL_INPUT_1);
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let output_limbs = read_value::<N_LIMBS, _>(lv, MUL_OUTPUT);
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let aux_limbs = {
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// MUL_AUX_INPUT was offset by 2^20 in generation, so we undo
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// that here
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let offset = P::Scalar::from_canonical_u64(AUX_COEFF_ABS_MAX as u64);
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let mut aux_limbs = read_value::<N_LIMBS, _>(lv, MUL_AUX_INPUT_LO);
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let aux_limbs_hi = &lv[MUL_AUX_INPUT_HI];
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for (lo, &hi) in aux_limbs.iter_mut().zip(aux_limbs_hi) {
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*lo += hi * base - offset;
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}
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aux_limbs
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};
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// Constraint poly holds the coefficients of the polynomial that
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// must be identically zero for this multiplication to be
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// verified.
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//
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// These two lines set constr_poly to the polynomial a(x)b(x) - c(x),
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// where a, b and c are the polynomials
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//
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// a(x) = \sum_i input0_limbs[i] * x^i
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// b(x) = \sum_i input1_limbs[i] * x^i
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// c(x) = \sum_i output_limbs[i] * x^i
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//
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// This polynomial should equal (x - β)*s(x) where s is
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//
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// s(x) = \sum_i aux_limbs[i] * x^i
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//
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let mut constr_poly = pol_mul_lo(input0_limbs, input1_limbs);
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pol_sub_assign(&mut constr_poly, &output_limbs);
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// This subtracts (x - β) * s(x) from constr_poly.
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pol_sub_assign(&mut constr_poly, &pol_adjoin_root(aux_limbs, base));
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// At this point constr_poly holds the coefficients of the
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// polynomial a(x)b(x) - c(x) - (x - β)*s(x). The
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// multiplication is valid if and only if all of those
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// coefficients are zero.
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for &c in &constr_poly {
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yield_constr.constraint(is_mul * c);
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}
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}
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pub fn eval_ext_circuit<F: RichField + Extendable<D>, const D: usize>(
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builder: &mut plonky2::plonk::circuit_builder::CircuitBuilder<F, D>,
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lv: &[ExtensionTarget<D>; NUM_ARITH_COLUMNS],
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yield_constr: &mut RecursiveConstraintConsumer<F, D>,
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) {
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let is_mul = lv[IS_MUL];
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let input0_limbs = read_value::<N_LIMBS, _>(lv, MUL_INPUT_0);
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let input1_limbs = read_value::<N_LIMBS, _>(lv, MUL_INPUT_1);
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let output_limbs = read_value::<N_LIMBS, _>(lv, MUL_OUTPUT);
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let aux_limbs = {
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let base = builder.constant_extension(F::Extension::from_canonical_u64(1 << LIMB_BITS));
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let offset =
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builder.constant_extension(F::Extension::from_canonical_u64(AUX_COEFF_ABS_MAX as u64));
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let mut aux_limbs = read_value::<N_LIMBS, _>(lv, MUL_AUX_INPUT_LO);
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let aux_limbs_hi = &lv[MUL_AUX_INPUT_HI];
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for (lo, &hi) in aux_limbs.iter_mut().zip(aux_limbs_hi) {
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//*lo = lo + hi * base - offset;
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let t = builder.mul_sub_extension(hi, base, offset);
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*lo = builder.add_extension(*lo, t);
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}
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aux_limbs
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};
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let mut constr_poly = pol_mul_lo_ext_circuit(builder, input0_limbs, input1_limbs);
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pol_sub_assign_ext_circuit(builder, &mut constr_poly, &output_limbs);
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let base = builder.constant_extension(F::Extension::from_canonical_u64(1 << LIMB_BITS));
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let rhs = pol_adjoin_root_ext_circuit(builder, aux_limbs, base);
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pol_sub_assign_ext_circuit(builder, &mut constr_poly, &rhs);
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for &c in &constr_poly {
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let filter = builder.mul_extension(is_mul, c);
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yield_constr.constraint(builder, filter);
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}
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}
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#[cfg(test)]
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mod tests {
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use plonky2::field::goldilocks_field::GoldilocksField;
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use plonky2::field::types::{Field, Sample};
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use rand::{Rng, SeedableRng};
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use rand_chacha::ChaCha8Rng;
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use super::*;
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use crate::arithmetic::columns::NUM_ARITH_COLUMNS;
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use crate::constraint_consumer::ConstraintConsumer;
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const N_RND_TESTS: usize = 1000;
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// TODO: Should be able to refactor this test to apply to all operations.
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#[test]
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fn generate_eval_consistency_not_mul() {
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type F = GoldilocksField;
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let mut rng = ChaCha8Rng::seed_from_u64(0x6feb51b7ec230f25);
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let mut lv = [F::default(); NUM_ARITH_COLUMNS].map(|_| F::sample(&mut rng));
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// if `IS_MUL == 0`, then the constraints should be met even
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// if all values are garbage.
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lv[IS_MUL] = F::ZERO;
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let mut constraint_consumer = ConstraintConsumer::new(
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vec![GoldilocksField(2), GoldilocksField(3), GoldilocksField(5)],
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GoldilocksField::ONE,
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GoldilocksField::ONE,
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GoldilocksField::ONE,
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);
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eval_packed_generic(&lv, &mut constraint_consumer);
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for &acc in &constraint_consumer.constraint_accs {
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assert_eq!(acc, GoldilocksField::ZERO);
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}
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}
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#[test]
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fn generate_eval_consistency_mul() {
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type F = GoldilocksField;
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let mut rng = ChaCha8Rng::seed_from_u64(0x6feb51b7ec230f25);
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let mut lv = [F::default(); NUM_ARITH_COLUMNS].map(|_| F::sample(&mut rng));
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// set `IS_MUL == 1` and ensure all constraints are satisfied.
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lv[IS_MUL] = F::ONE;
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for _i in 0..N_RND_TESTS {
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// set inputs to random values
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for (ai, bi) in MUL_INPUT_0.zip(MUL_INPUT_1) {
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lv[ai] = F::from_canonical_u16(rng.gen());
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lv[bi] = F::from_canonical_u16(rng.gen());
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}
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generate(&mut lv);
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let mut constraint_consumer = ConstraintConsumer::new(
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vec![GoldilocksField(2), GoldilocksField(3), GoldilocksField(5)],
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GoldilocksField::ONE,
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GoldilocksField::ONE,
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GoldilocksField::ONE,
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);
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eval_packed_generic(&lv, &mut constraint_consumer);
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for &acc in &constraint_consumer.constraint_accs {
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assert_eq!(acc, GoldilocksField::ZERO);
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}
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}
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}
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}
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