Computing the complexification of a semialgebraic set
by
Nicolai Vorobjov
University of Bath
Coauthors: M-F Roy

We describe an algorithm for producing the smallest complex algebraic variety containing a given semialgebraic set S in Rⁿ, and all the irreducible components of S. Let S be defined by s polynomials of degrees less than d with integer coefficients of bit lengths less than M. Then the complexity of the algorithm is bounded from above by a polynomial in M, sⁿ, dⁿ². We prove that the geometric degree of the complexification is less than sⁿd^O(n), while the degrees of polynomials defining the complexification and irreducible components are less than d^O(n). The algorithm has many applications, like computing the real radical of a polynomial ideal, while the degree bound can be used for proving new complexity lower bounds for algebraic comptation trees.

Date received: February 23, 1999