Abstract
Given a polynomial of degree n, a test of O(n 2) elementary operations and growth factor 1 is presented in order to check the Routh–Hurwitz conditions. This optimal growth factor guarantees that the test presents better stability properties than other known tests. We also present a test of O(n 3) elementary operations and growth factor 1 in order to check if a matrix is strictly totally positive. Finally, totally positive matrices are characterized by their symmetric-triangular decompositions.
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