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Matrix Multiplication in Finite Fields
Not parallelization, not vectorization but a secret 3rd thing
Fileforma is an independent laboratory dedicated to researching custom binary formats for Artificial Intelligence. \({Result} = \begin{bmatrix} (AJ + BM + CP) & (AK + BN + CQ) & (AL + BO + CR) \\ (DJ + EM + FP) & (DK + EN + FQ) & (DL + EO + FR) \\ (GJ + HM + IP) & (GK + HN + IQ) & (GL + HO + IR) \end{bmatrix}\) The Chinese Remainder Theorem states that a unique integer represents sets of mods across different finite fields.
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