Computing the Betti numbers of semi-algebraic sets defined by partly quadratic systems of polynomials
Let R be a real closed field, , with degY(Q)2, degX(Q)d, , , and with degX(P)d, , . Let SRℓ+k be a semi-algebraic set defined by a Boolean formula without negations, with atoms P=0, P0, P0, . We describe an algorithm for computing the Betti numbers of S generalizing a similar algorithm described in...
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sg-ntu-dr.10356-1012792023-02-28T19:37:08Z Computing the Betti numbers of semi-algebraic sets defined by partly quadratic systems of polynomials Basu, Saugata Pasechnik, Dmitrii V. Roy, Marie-Françoise School of Physical and Mathematical Sciences DRNTU::Science::Mathematics::Geometry Let R be a real closed field, , with degY(Q)2, degX(Q)d, , , and with degX(P)d, , . Let SRℓ+k be a semi-algebraic set defined by a Boolean formula without negations, with atoms P=0, P0, P0, . We describe an algorithm for computing the Betti numbers of S generalizing a similar algorithm described in [S. Basu, Computing the top few Betti numbers of semi-algebraic sets defined by quadratic inequalities in polynomial time, Found. Comput. Math. 8 (1) (2008) 45–80]. The complexity of the algorithm is bounded by ((ℓ+1)(s+1)(m+1)(d+1))2O(m+k). The complexity of the algorithm interpolates between the doubly exponential time bounds for the known algorithms in the general case, and the polynomial complexity in case of semi-algebraic sets defined by few quadratic inequalities [S. Basu, Computing the top few Betti numbers of semi-algebraic sets defined by quadratic inequalities in polynomial time, Found. Comput. Math. 8 (1) (2008) 45–80]. Moreover, for fixed m and k this algorithm has polynomial time complexity in the remaining parameters. Accepted version 2009-05-08T00:55:09Z 2019-12-06T20:35:58Z 2009-05-08T00:55:09Z 2019-12-06T20:35:58Z 2009 2009 Journal Article Basu, S., Pasechnik, D. V., & Roy, M.-F. (2009). Computing the Betti numbers of semi-algebraic sets defined by partly quadratic systems of polynomials. Journal of algebra, 21(8), 2206-2229. 0021-8693 https://hdl.handle.net/10356/101279 http://hdl.handle.net/10220/4599 http://sfxna09.hosted.exlibrisgroup.com:3410/ntu/sfxlcl3?sid=metalib:ELSEVIER_SCOPUS&id=doi:&genre=&isbn=&issn=&date=2009&volume=321&issue=8&spage=2206&epage=2229&aulast=Basu&aufirst=%20S&auinit=&title=Journal%20of%20Algebra&atitle=Computing%20the%20Betti%20numbers%20of%20semi%2Dalgebraic%20sets%20defined%20by%20partly%20quadratic%20systems%20of%20polynomials 10.1016/j.jalgebra.2008.09.043 en Journal of algebra Journal of Algebra @ copyright 2009 Elsevier. The journal's website is located at http://www.elsevier.com/wps/find/journaldescription.cws_home/622850/description. 24 p. application/pdf |
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DRNTU::Science::Mathematics::Geometry Basu, Saugata Pasechnik, Dmitrii V. Roy, Marie-Françoise Computing the Betti numbers of semi-algebraic sets defined by partly quadratic systems of polynomials |
| description |
Let R be a real closed field, , with degY(Q)2, degX(Q)d, , , and with degX(P)d, , . Let SRℓ+k be a semi-algebraic set defined by a Boolean formula without negations, with atoms P=0, P0, P0, . We describe an algorithm for computing the Betti numbers of S generalizing a similar algorithm described in [S. Basu, Computing the top few Betti numbers of semi-algebraic sets defined by quadratic inequalities in polynomial time, Found. Comput. Math. 8 (1) (2008) 45–80]. The complexity of the algorithm is bounded by ((ℓ+1)(s+1)(m+1)(d+1))2O(m+k). The complexity of the algorithm interpolates between the doubly exponential time bounds for the known algorithms in the general case, and the polynomial complexity in case of semi-algebraic sets defined by few quadratic inequalities [S. Basu, Computing the top few Betti numbers of semi-algebraic sets defined by quadratic inequalities in polynomial time, Found. Comput. Math. 8 (1) (2008) 45–80]. Moreover, for fixed m and k this algorithm has polynomial time complexity in the remaining parameters. |
| author2 |
School of Physical and Mathematical Sciences |
| author_facet |
School of Physical and Mathematical Sciences Basu, Saugata Pasechnik, Dmitrii V. Roy, Marie-Françoise |
| format |
Article |
| author |
Basu, Saugata Pasechnik, Dmitrii V. Roy, Marie-Françoise |
| author_sort |
Basu, Saugata |
| title |
Computing the Betti numbers of semi-algebraic sets defined by partly quadratic systems of polynomials |
| title_short |
Computing the Betti numbers of semi-algebraic sets defined by partly quadratic systems of polynomials |
| title_full |
Computing the Betti numbers of semi-algebraic sets defined by partly quadratic systems of polynomials |
| title_fullStr |
Computing the Betti numbers of semi-algebraic sets defined by partly quadratic systems of polynomials |
| title_full_unstemmed |
Computing the Betti numbers of semi-algebraic sets defined by partly quadratic systems of polynomials |
| title_sort |
computing the betti numbers of semi-algebraic sets defined by partly quadratic systems of polynomials |
| publishDate |
2009 |
| url |
https://hdl.handle.net/10356/101279 http://hdl.handle.net/10220/4599 http://sfxna09.hosted.exlibrisgroup.com:3410/ntu/sfxlcl3?sid=metalib:ELSEVIER_SCOPUS&id=doi:&genre=&isbn=&issn=&date=2009&volume=321&issue=8&spage=2206&epage=2229&aulast=Basu&aufirst=%20S&auinit=&title=Journal%20of%20Algebra&atitle=Computing%20the%20Betti%20numbers%20of%20semi%2Dalgebraic%20sets%20defined%20by%20partly%20quadratic%20systems%20of%20polynomials |
| _version_ |
1759853481028485120 |