Bit Complexity of Jordan Normal Form and Spectral Factorization

Abstract: We study the bit complexity of two related fundamental computational problems in linear algebra and control theory. Our results are: (1) An Õ(n ω+3 a+n 4 a 2 +n ω log(1/ǫ)) time algorithm for finding an ǫ−approximation to the Jordan Normal form of an integer matrix with a−bit entries, where ω is the exponent of matrix multiplication. (2) An Õ(n 6 d 6 a + n 4 d 4 a 2 + n 3 d 3 log(1/ǫ)) time algorithm for ǫ-approximately computing the spectral factorization P(x) = Q * (x)Q(x) of a given monic n × n rational mat… Show more