Elimination theory

Known as: Elimination 
In commutative algebra and algebraic geometry, elimination theory is the classical name for algorithmic approaches to eliminating some variables… (More)
Wikipedia

Papers overview

Semantic Scholar uses AI to extract papers important to this topic.
2013
2013
Aging is a major risk factor for many neurological diseases and is associated with mild cognitive decline. Previous studies… (More)
  • figure 1
  • figure 2
  • figure 3
  • figure 4
  • figure 5
Is this relevant?
2008
2008
Tropical algebraic geometry offers new tools for elimination theory and implicitization. We determine the tropicalization of the… (More)
Is this relevant?
2008
2008
We study elimination theory in the context of Newton polytopes and develop its convex-geometry counterpart. 
Is this relevant?
2006
2006
  • Daniel Tunkelang
  • 2006
In this paper, we present Dynamic Category Sets, a novel approach that addresses the vocabulary problem for faceted data. In… (More)
  • figure 1
  • figure 2
Is this relevant?
Highly Cited
2005
Highly Cited
2005
A method is presented to compute the switching angles in a multilevel converter so as to produce the required fundamental voltage… (More)
  • figure 1
  • figure 2
  • figure 3
  • figure 4
  • figure 5
Is this relevant?
Highly Cited
2005
Highly Cited
2005
Eliminating harmonics in a multilevel converter in which the separate dc sources vary is considered. That is, given a desired… (More)
  • figure 1
  • figure 2
  • figure 3
  • figure 5
  • figure 6
Is this relevant?
2002
2002
Sparse elimination theory concerns the study of Chow forms and discriminants associated with toric varieties, that is… (More)
Is this relevant?
2001
2001
New formulas are given for Chow forms, discriminants and resultants arising from (not necessarily normal) toric varieties of… (More)
Is this relevant?
Review
1999
Review
1999
The last decade has witnessed the rebirth of resultant methods as a powerful computational tool for variable elimination and… (More)
Is this relevant?
Highly Cited
1998
Highly Cited
1998
We present a new method for solving symbolically zero–dimensional polynomial equation systems in the affine and toric case. The… (More)
Is this relevant?