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Exact(4)
Let A be a nonsingular matrix.
Proof Let S = (X, Y ) be a nonsingular matrix with.
Let A be a nonsingular matrix with nonzero diagonal entries.
In Theorem 3.1, we must point out that (16) requires (G t)) to be a nonsingular matrix (or regular matrix), that is, there exists a direct channel in between the output and input for systems (1).
Similar(56)
is a nonsingular matrix, where, for.
H ∗ T H ∗ is a nonsingular matrix.
In other words, (E+D_{1}G) is a nonsingular matrix.
where is a nonsingular matrix with real entries and.
By the assumption, is a nonsingular matrix, where is a unit matrix.
Furthermore, we can easily calculate that (53). is a nonsingular matrix, thus is satisfied.
if there is a nonsingular matrix with real entries such that (1.6).
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Justyna Jupowicz-Kozak
CEO of Professional Science Editing for Scientists @ prosciediting.com