mirror of https://github.com/status-im/EIPs.git
Typos and clarification.
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@ -35,7 +35,7 @@ Address: 0x8
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For a cyclic group `G` (written additively) of prime order q let `log_P: G -> F_q` be the discrete logarithm on this group with respect to a generator `P`, i.e. `log_P(x)` is the integer `n` such that `n * P = x`.
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For a cyclic group `G` (written additively) of prime order q let `log_P: G -> F_q` be the discrete logarithm on this group with respect to a generator `P`, i.e. `log_P(x)` is the integer `n` such that `n * P = x`.
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The precompiled contract is defined as follows, where the two groups `G_1` and `G_2` and their generators `P_1` and `P_2` are defined below:
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The precompiled contract is defined as follows, where the two groups `G_1` and `G_2` and their generators `P_1` and `P_2` are defined below (they have the same order `q`):
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```
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```
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Input: (a1, b1, a2, b2, ..., ak, bk) from (G_1 x G_2)^k
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Input: (a1, b1, a2, b2, ..., ak, bk) from (G_1 x G_2)^k
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@ -43,17 +43,17 @@ Output: If the length of the input is incorrect or any of the inputs are not ele
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the respective group or are not encoded correctly, the call fails.
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the respective group or are not encoded correctly, the call fails.
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Otherwise, return one if
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Otherwise, return one if
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log_P1(a1) * log_P2(b1) + ... + log_P1(ak) * log_P2(bk) = 0
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log_P1(a1) * log_P2(b1) + ... + log_P1(ak) * log_P2(bk) = 0
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and zero else.
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(in F_q) and zero else.
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```
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```
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### Definition of the groups
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### Definition of the groups
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The groups `G_1` and `G_1` are cyclic groups on the elliptic curve `alt_bn128` defined by the curve equation
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The groups `G_1` and `G_2` are cyclic groups of prime order `q` on the elliptic curve `alt_bn128` defined by the curve equation
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`Y^2 = X^3 + 3`.
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`Y^2 = X^3 + 3`.
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The group `G_1` is a cyclic group of prime order on the above curve over the field `F_p` with `p = 21888242871839275222246405745257275088696311157297823662689037894645226208583` with generator `P1 = (1, 2)`.
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The group `G_1` is a cyclic group on the above curve over the field `F_p` with `p = 21888242871839275222246405745257275088696311157297823662689037894645226208583` with generator `P1 = (1, 2)`.
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The group `G_2` is a cyclic group of prime order in the same elliptic curve over a different field `F_p^2 = F_p[X] / (X^2 + 1)` (p is the same as above) with generator
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The group `G_2` is a cyclic group on the same elliptic curve over a different field `F_p^2 = F_p[X] / (X^2 + 1)` (p is the same as above) with generator
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```
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```
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P2 = (
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P2 = (
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11559732032986387107991004021392285783925812861821192530917403151452391805634 * i +
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11559732032986387107991004021392285783925812861821192530917403151452391805634 * i +
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