Bézout’s inequality for real polynomials

Płoski, Arkadiusz; Sękalski, Maciej

dc.contributor.author	Płoski, Arkadiusz
dc.contributor.author	Sękalski, Maciej
dc.contributor.editor	Krasiński, Tadeusz
dc.contributor.editor	Spodzieja, Stanisław
dc.date.accessioned	2017-12-28T09:24:37Z
dc.date.available	2017-12-28T09:24:37Z
dc.date.issued	2017
dc.identifier.citation	Płoski A., Sękalski M., Bézout’s inequality for real polynomials, [in:] Krasiński T., Spodzieja S. (eds), Analytic and Algebraic Geometry 2, Łódź University Press, Łódź 2017, p. 175-177, doi: 10.18778/8088-922-4.19	pl_PL
dc.identifier.isbn	978-83-8088-922-4
dc.identifier.uri	http://hdl.handle.net/11089/23780
dc.description.abstract	Let F(X, Y ), G(X, Y ) be polynomials of degrees m, n > 0 respectively. We prove, that the set {(x, y) Є R² : F(x, y) = G(x, y) = 0} has at most mn connected components.	pl_PL
dc.language.iso	en	pl_PL
dc.publisher	Łódź University Press	pl_PL
dc.relation.ispartof	Krasiński T., Spodzieja S. (eds), Analytic and Algebraic Geometry 2, Łódź University Press, Łódź 2017;
dc.rights	Uznanie autorstwa-Użycie niekomercyjne-Bez utworów zależnych 3.0 Polska	*
dc.rights.uri	http://creativecommons.org/licenses/by-nc-nd/3.0/pl/	*
dc.title	Bézout’s inequality for real polynomials	pl_PL
dc.type	Book chapter	pl_PL
dc.rights.holder	© Copyright by Authors, Łódź 2017; © Copyright for this edition by Uniwersytet Łódzki, Łódź 2017	pl_PL
dc.page.number	175-177	pl_PL
dc.contributor.authorAffiliation	Department of Mathematics and Physics, Kielce University of Technology, AL. 1000 L PP 7, 25-314 Kielce, Poland	pl_PL
dc.identifier.eisbn	978-83-8088-923-1
dc.references	W. Fulton, Intersection Theory, Springer, Berlin 1984.	pl_PL
dc.references	F. Leja, Rachunek różniczkowy i całkowy, Tenth edition, PWN, Warszawa 1969 (in Polish).	pl_PL
dc.references	A. Mostowski and M. Stark, Elementy algebry wyższej, Ninth edition, PWN, Warszawa 1974 (in Polish).	pl_PL
dc.contributor.authorEmail	matap@tu.kielce.pl	pl_PL
dc.contributor.authorEmail	matms@tu.kielce.pl	pl_PL
dc.identifier.doi	10.18778/8088-922-4.19