Saugata Basu
Published 2014-09-04Version 1
We survey both old and new developments in the theory of algorithms in real algebraic geometry -- starting from effective quantifier elimination in the first order theory of reals due to Tarski and Seidenberg, to more recent algorithms for computing topological invariants of semi-algebraic sets. We emphasize throughout the complexity aspects of these algorithms and also discuss the computational hardness of the underlying problems. We also describe some recent results linking the computational hardness of decision problems in the first order theory of the reals, with that of computing certain topological invariants of semi-algebraic sets. Even though we mostly concentrate on exact algorithms, we also discuss some numerical approaches involving semi-definite programming that have gained popularity in recent times.
Comments: 41 pages, 4 figures. Based on survey talk given at the Real Algebraic Geometry Conference, Rennes, June 20-24, 2011. Some references updated and some newer material added
Bounding the Betti numbers and computing the Euler-Poincaré characteristic of semi-algebraic sets defined by partly quadratic systems of polynomials
Some Quantitative Results in Real Algebraic Geometry
On Projections of Semi-algebraic Sets Defined by Few Quadratic Inequalities
![QR code for arXiv:1409.1534 [math.AG]](http://oss.arxitics.com/images/favicon.svg)