Base implementation follows from these papers,
- Field extensions arithmetic
- Multiplication and Squaring on Pairing-Friendly Fields
- https://ia.cr/2006/471
- Augusto Jun Devegili, Colm O hEigeartaigh, Michael Scott, and Ricardo Dahab
- Lazy reduction
- Faster Explicit Formulas for Computing Pairings over Ordinary Curves
- https://ia.cr/2010/526
- Diego F. Aranha, Koray Karabina, Patrick Longa, Catherine H. Gebotys, and Julio López
- Miller loop for fixed Q
- Fixed point pairings
- https://ia.cr/2010/342
- Craig Costello and Douglas Stebila
- Pairing implementation
- Realms of pairing
- https://ia.cr/2013/722.pdf
- Diego F. Aranha, Paulo S. L. M. Barreto, Patrick Longa, and Jefferson E. Ricardini
- Final exponentiation squarings
- SQUARING IN CYCLOTOMIC SUBGROUPS
- https://ia.cr/2010/542
- Koray Karabina
- Efficient miller loop steps and final exponentiation
- Pairings in Rank-1 Constraint Systems
- https://ia.cr/2022/1162
- Youssef El Housni, École Polytechnique, ConsenSyS R&D
- On Proving Pairings
- https://ia.cr/2024/640
- by Andrija Novakovic (Geometry Research) and Liam Eagen (Alpen Labs, Zeta Function Technologies)
Section 4 Eliminating the Final Exponentiation
Here's a rough outline of what we are implementing from the paper,
Two elements A and B ∈ Fq12 are equivalent if there exists some C such that,
x . c ^ r = y
Witness c allows replacing the whole final exponentiation with just checking for above equivalence.
Exponentiation by r can be replaced with rt for some t which allows embedding the exponentiation into the main miller loop.
For BN254 curve,
Section 4.3 shows we can use,
λ = 6x + 2 + q − q^2 + q^3 where λ = 3rm′
And check,
x . c ^ λ = y
Exponentiation by λ can be broken like this, 6x + 2 + q − q^2 + q^3
6x + 2 can happen within the Miller loop.
And q − q^2 + q^3 can use Frobenius mappings.
- Faster Extension Field multiplications for Emulated Pairing Circuits
- https://hackmd.io/@feltroidprime/B1eyHHXNT
- Feltroid Prime (Garaga)
Taking an FQ12 direct extension as a polynomial of degree 11, product of polynomials can be used to verify the committed coefficients with Schwartz Zippel lemma.
As described in https://hackmd.io/@feltroidprime/B1eyHHXNT,
For A and B element of Fq12 represented as direct extensions,
A(x) * B(x) = R(x) + Q(x) * P12(x)
where R(x) is a polynomial of degree 11 or less.
- Commitment contains 64 coefficients
- F ∈ Fq12, miller loop aggregation
- L1_L2 ∈ Sparse01234, Loop step lines L1 and L2 multiplied for lower degree
- L3 ∈ Sparse034, Last L3 line
F(x) * F(x) * L1_L2(x) * L3(x) = R(x) + Q(x) * P12(x)
- Commitment contains 42 coefficients
- F ∈ Fq12, miller loop aggregation
- L1, L2, L3 ∈ Sparse01234, Loop step lines
- Witness ∈ Fq12, Residue witness (or it's inverse based on the bit value)
F(x) * F(x) * L1(x) * L2(x) * L3(x) * Witness(x) = R(x) + Q(x) * P12(x)
- Commitment contains 42 coefficients
- F ∈ Fq12, miller loop aggregation
- L1, L2, L3 ∈ Sparse01234, Correction step lines
F(x) * L1(x) * L2(x) * L3(x) = R(x) + Q(x) * P12(x)