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An Improved Sign Determination Algorithm

In: Algebraic Geometry and its Applications

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  • John Canny

Abstract

Recently there has been a lot of activity in algorithms that work over real closed fields, and that perform such calculations as quantifier elimination or computing connected components of semi-algebraic sets. A cornerstone of this work is a symbolic sign determination algorithm due to Ben-Or, Kozen and Reif [1]. In this paper we describe a new sign determination method based on the earlier algorithm, but with two advantages: (i) It is faster in the univariate case, and (ii) In the general case, it allows purely symbolic quantifier elimination in pseudo-polynomial time. By purely symbolic, we mean that it is possible to eliminate a quantified variable from a system of polynomials no matter what the coefficient values are. The previous methods required the coefficients to be themselves polynomials in other variables. Our new method allows transcendental functions or derivatives to appear in the coefficients.

Suggested Citation

  • John Canny, 1994. "An Improved Sign Determination Algorithm," Springer Books, in: Chandrajit L. Bajaj (ed.), Algebraic Geometry and its Applications, chapter 26, pages 407-418, Springer.
    • Handle: RePEc:spr:sprchp:978-1-4612-2628-4_26
    DOI: 10.1007/978-1-4612-2628-4_26
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