Hörmander's condition

In mathematics, an orthostochastic matrix is a doubly stochastic matrix whose entries are the square of the absolute value of some orthogonal matrix.

The detailed definition is as follows. A square matrix B of size n is doubly stochastic (or bistochastic) if all its rows and columns sum to 1 and all its entries are nonnegative real numbers, each of whose rows and columns sums to 1. It is orthostochastic if there exists an orthogonal matrix O such that

${\displaystyle B_{ij}=O_{ij}^2\text{ for }i,j=1,\dots ,n.}$

All 2-by-2 doubly stochastic matrices are orthostochastic (and also unistochastic) since for any

${\displaystyle B=\left[\begin{array}{cc}a& 1-a\\ 1-a& a\end{array}\right]}$

we find the corresponding orthogonal matrix

${\displaystyle O=\left[\begin{array}{cc}\cos \varphi & \sin \varphi \\ -\sin \varphi & \cos \varphi \end{array}\right],}$

with ${\displaystyle {\cos }^2\varphi =a,}$ such that ${\displaystyle B_{ij}=O_{ij}^2.}$

For larger n the sets of bistochastic matrices includes the set of unistochastic matrices, which includes the set of orthostochastic matrices and these inclusion relations are proper.

References

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