Optimal algorithms of Gram-Schmidt type
Abstract
Three algorithms of Gram-Schmidt type are given that produce an orthogonal decomposition of finite d-dimensional symmetric, alternating, or Hermitian forms over division rings. The first uses d3/3+O(d2) ring operations with very simple implementation. Next, that algorithm is adapted in two new directions. One is an optimal sequential algorithm whose complexity matches the complexity of matrix multiplication. The other is a parallel NC algorithm with similar complexity.
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