Paley construction

In mathematics, Paley's theorem is a theorem on Hadamard matrices. It was proved in 1933 and is named after the English mathematician Raymond Paley.

Let ${\displaystyle q}$ be an odd prime or ${\displaystyle 0}$. Let ${\displaystyle n}$ be a natural number. Then there exists a Hadamard matrix ${\displaystyle H}$ of order

${\displaystyle m=2^{k}(q^{n}+1),}$

where ${\displaystyle k}$ is a natural number such that

${\displaystyle m\equiv 0\mathrm {\,mod\,} 4.}$

If ${\displaystyle m}$ is of the above form, then ${\displaystyle H}$ can be constructed using a Paley construction. If ${\displaystyle m}$ is divisible by 4 but is not of the above form, then the Paley class is undefined. Currently, Hadamard matrices have been shown to exist for all ${\displaystyle m\equiv 0\mathrm {\,mod\,} 4}$ for ${\displaystyle m<668}$.

• Paley–Wiener theorem

• Paley, R.E.A.C. (1933). "On orthogonal matrices". J. Math. Phys. 12: 311–320.

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