In ECDSA, why is (r,−s mod n) complementary to (r, s)?












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I am trying to find resources in previous malleability posts, but couldn't find derivations/proofs of this fact or how the exact low-s value is derived. Any pointers would greatly appreciated.










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    2














    I am trying to find resources in previous malleability posts, but couldn't find derivations/proofs of this fact or how the exact low-s value is derived. Any pointers would greatly appreciated.










    share|improve this question

























      2












      2








      2







      I am trying to find resources in previous malleability posts, but couldn't find derivations/proofs of this fact or how the exact low-s value is derived. Any pointers would greatly appreciated.










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      I am trying to find resources in previous malleability posts, but couldn't find derivations/proofs of this fact or how the exact low-s value is derived. Any pointers would greatly appreciated.







      ecdsa transaction-malleability






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      asked yesterday









      James C.

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          ECDSA signatures are pairs (r,s) such that r = x(m/sG + r/sP) mod n, where P is the public key and m is the message digest. x() in that equation means "the X coordinate of".



          In that equation, if you substitute s = -s', you get *r = x(m/(-s')*G + r/(-s)P) mod n, or *r = x(-(m/s'*G + r/s'P)).



          However, it is true that for any point Q, x(Q) = x(-Q), as negating a point only affects the Y coordinate. Thus, *r = x(m/s'*G + r/s'P) mod n, or (r,s') is valid signature whenever (r,s) is.






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          • Thank you very much. I understand negating a scalar over ff, but not why that negated scalar * point will result in a point with the same x-coord as scalar * point.
            – James C.
            yesterday











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          ECDSA signatures are pairs (r,s) such that r = x(m/sG + r/sP) mod n, where P is the public key and m is the message digest. x() in that equation means "the X coordinate of".



          In that equation, if you substitute s = -s', you get *r = x(m/(-s')*G + r/(-s)P) mod n, or *r = x(-(m/s'*G + r/s'P)).



          However, it is true that for any point Q, x(Q) = x(-Q), as negating a point only affects the Y coordinate. Thus, *r = x(m/s'*G + r/s'P) mod n, or (r,s') is valid signature whenever (r,s) is.






          share|improve this answer





















          • Thank you very much. I understand negating a scalar over ff, but not why that negated scalar * point will result in a point with the same x-coord as scalar * point.
            – James C.
            yesterday
















          3














          ECDSA signatures are pairs (r,s) such that r = x(m/sG + r/sP) mod n, where P is the public key and m is the message digest. x() in that equation means "the X coordinate of".



          In that equation, if you substitute s = -s', you get *r = x(m/(-s')*G + r/(-s)P) mod n, or *r = x(-(m/s'*G + r/s'P)).



          However, it is true that for any point Q, x(Q) = x(-Q), as negating a point only affects the Y coordinate. Thus, *r = x(m/s'*G + r/s'P) mod n, or (r,s') is valid signature whenever (r,s) is.






          share|improve this answer





















          • Thank you very much. I understand negating a scalar over ff, but not why that negated scalar * point will result in a point with the same x-coord as scalar * point.
            – James C.
            yesterday














          3












          3








          3






          ECDSA signatures are pairs (r,s) such that r = x(m/sG + r/sP) mod n, where P is the public key and m is the message digest. x() in that equation means "the X coordinate of".



          In that equation, if you substitute s = -s', you get *r = x(m/(-s')*G + r/(-s)P) mod n, or *r = x(-(m/s'*G + r/s'P)).



          However, it is true that for any point Q, x(Q) = x(-Q), as negating a point only affects the Y coordinate. Thus, *r = x(m/s'*G + r/s'P) mod n, or (r,s') is valid signature whenever (r,s) is.






          share|improve this answer












          ECDSA signatures are pairs (r,s) such that r = x(m/sG + r/sP) mod n, where P is the public key and m is the message digest. x() in that equation means "the X coordinate of".



          In that equation, if you substitute s = -s', you get *r = x(m/(-s')*G + r/(-s)P) mod n, or *r = x(-(m/s'*G + r/s'P)).



          However, it is true that for any point Q, x(Q) = x(-Q), as negating a point only affects the Y coordinate. Thus, *r = x(m/s'*G + r/s'P) mod n, or (r,s') is valid signature whenever (r,s) is.







          share|improve this answer












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          share|improve this answer










          answered yesterday









          Pieter Wuille

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          45.5k393154












          • Thank you very much. I understand negating a scalar over ff, but not why that negated scalar * point will result in a point with the same x-coord as scalar * point.
            – James C.
            yesterday


















          • Thank you very much. I understand negating a scalar over ff, but not why that negated scalar * point will result in a point with the same x-coord as scalar * point.
            – James C.
            yesterday
















          Thank you very much. I understand negating a scalar over ff, but not why that negated scalar * point will result in a point with the same x-coord as scalar * point.
          – James C.
          yesterday




          Thank you very much. I understand negating a scalar over ff, but not why that negated scalar * point will result in a point with the same x-coord as scalar * point.
          – James C.
          yesterday


















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