Let $B_n$ be a sequence of random matrices and $$ \underset{n\rightarrow \infty}{\text{plim}}(B_n) = A, $$ with A invertible. Does this imply that $$ \underset{n\rightarrow \infty}{\text{plim}}(B_n^{-1}) = A^{-1}? $$
2026-03-30 02:07:48.1774836468
If a random matrix converges to an invertible constant matrix $A$, does its inverse converge to $inv(A)$?
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