I need the following answer for research purposes.

Let $A$ be a $m \times n$ random matrix with iid ${\rm Bernouli}(p)$ entries. Is there any result on the spectal gap of $AA^{T}$ (similar to well known random matrix laws like Tracy-Widom)?

I need the following answer for research purposes.

Let $A$ be a $m \times n$ random matrix with iid ${\rm Bernoulli}(p)$ entries. Is there any result on the spectral gap of $AA^{T}$ (similar to well known random matrix laws like Tracy-Widom)?

I need the following answer for research purpose. Let $A$ be $m \times n$ random matrix with iid bernouli(p) entries. Is there any result on the spectal gap of $AA^{T}$ (similar to well known random matrixlaws like tracy widom).

I need the following answer for research purposes.

Let $A$ be a $m \times n$ random matrix with iid ${\rm Bernouli}(p)$ entries. Is there any result on the spectal gap of $AA^{T}$ (similar to well known random matrix laws like Tracy-Widom)?