On nilpotent singular $\mathbb F_2^{n\times n}$ matrices

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Let $M$ be a $0/1$ matrix over $\mathbb F_2^{n\times n}$ with determinant $0$.

The set of such singular matrices form a semigroup.

~~The set of nilpotent matrices of size $n\times n$ form a semigroup.~~

~~Are there always permutations $P,Q$ such that $PMQ$ is nilpotent?~~

~~How many permutations $P,Q$ are always there such that $PMQ$ is nilpotent?~~
If $T$ is nilpotent, there is always a $k\leq n$ such that there is always a row or column with all $0$s in $T^k$. What is a tight upper bound on $k$ as a function of $n$ that works for all nilpotent matrices in $\mathbb F_2^{n\times n}$?
~~Are there always permutations $P,Q$ such that $(PMQ)^2$ contains a $0$ row or a $0$ column?~~

asked Apr 18, 2023 at 3:54

Turbo

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$\begingroup$ $M=\pmatrix{1&1\cr0&0\cr}$ has determinant zero, but there are no permutations $P,Q$ such that $PMQ$ is nilpotent. $\endgroup$
– Gerry Myerson
Commented Apr 18, 2023 at 7:34
$\begingroup$ I think it is called index when the matrix vanishes valnishes. There is no nomenclature for the $k$ introduced. $\endgroup$
– Turbo
Commented Apr 18, 2023 at 16:10
$\begingroup$ The nilpotent elements do not form a subsemigroup. Take E_12 E_21=E_11 $\endgroup$
– Benjamin Steinberg
Commented Apr 18, 2023 at 19:13
1

$\begingroup$ If n is a power of 2 the answer to 3 is k=n. Take I+P where P is the permutation matrix of order 2^n corresponding to the cyclic permutation (1,2,...,n) $\endgroup$
– Benjamin Steinberg
Commented Apr 18, 2023 at 20:12
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$\begingroup$ Sorry, in my last comment I meant of order n which is a power of 2 $\endgroup$
– Benjamin Steinberg
Commented Apr 19, 2023 at 0:22

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