Ranks of Quotients, Remainders and p-Adic Digits of Matrices
Abstract
For a prime p and a matrix A ∈ Zn × n, write A as A = p (A \,quo\, p) + (A \,rem\, p) where the remainder and quotient operations are applied element-wise. Write the p-adic expansion of A as A = A[0] + p A[1] + p2 A[2] + ·s where each A[i] ∈ Zn × n has entries between [0, p-1]. Upper bounds are proven for the Z-ranks of A \,rem\, p, and A \,quo\, p. Also, upper bounds are proven for the Z/pZ-rank of A[i] for all i 0 when p = 2, and a conjecture is presented for odd primes.
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