In mathematics, the Markov brothers' inequality is an inequality proved in the 1890s by brothers Andrey Markov and Vladimir Markov, two Russian mathematicians. This inequality bounds the maximum of the derivatives of a polynomial on an interval in terms of the maximum of the polynomial.[1] For k = 1 it was proved by Andrey Markov,[2] and for k = 2,3,... by his brother Vladimir Markov.[3]
Markov's inequality is used to obtain lower bounds in computational complexity theory via the so-called "Polynomial Method".
Referencesedit
^Achiezer, N.I. (1992). Theory of approximation. New York: Dover Publications, Inc.
^Markov, A.A. (1890). "On a question by D. I. Mendeleev". Zap. Imp. Akad. Nauk. St. Petersburg. 62: 1–24.
^Markov, V.A. (1892). "О функциях, наименее уклоняющихся от нуля в данном промежутке (On Functions of Least Deviation from Zero in a Given Interval)". {{cite journal}}: Cite journal requires |journal= (help) Appeared in German with a foreword by Sergei Bernstein as Markov, V.A. (1916). "Über Polynome, die in einem gegebenen Intervalle möglichst wenig von Null abweichen". Math. Ann. 77 (2): 213–258. doi:10.1007/bf01456902. S2CID 122406663.
April 11, 2024
markov, brothers, inequality, mathematics, inequality, proved, 1890s, brothers, andrey, markov, vladimir, markov, russian, mathematicians, this, inequality, bounds, maximum, derivatives, polynomial, interval, terms, maximum, polynomial, proved, andrey, markov,. In mathematics the Markov brothers inequality is an inequality proved in the 1890s by brothers Andrey Markov and Vladimir Markov two Russian mathematicians This inequality bounds the maximum of the derivatives of a polynomial on an interval in terms of the maximum of the polynomial 1 For k 1 it was proved by Andrey Markov 2 and for k 2 3 by his brother Vladimir Markov 3 Contents 1 The statement 2 Related inequalities 3 Applications 4 ReferencesThe statement editLet P be a polynomial of degree n Then for all nonnegative integers k displaystyle k nbsp max 1 x 1 P k x n2 n2 12 n2 22 n2 k 1 2 1 3 5 2k 1 max 1 x 1 P x displaystyle max 1 leq x leq 1 P k x leq frac n 2 n 2 1 2 n 2 2 2 cdots n 2 k 1 2 1 cdot 3 cdot 5 cdots 2k 1 max 1 leq x leq 1 P x nbsp Equality is attained for Chebyshev polynomials of the first kind Related inequalities editBernstein s inequality mathematical analysis Remez inequalityApplications editMarkov s inequality is used to obtain lower bounds in computational complexity theory via the so called Polynomial Method References edit Achiezer N I 1992 Theory of approximation New York Dover Publications Inc Markov A A 1890 On a question by D I Mendeleev Zap Imp Akad Nauk St Petersburg 62 1 24 Markov V A 1892 O funkciyah naimenee uklonyayushihsya ot nulya v dannom promezhutke On Functions of Least Deviation from Zero in a Given Interval a href Template Cite journal html title Template Cite journal cite journal a Cite journal requires journal help Appeared in German with a foreword by Sergei Bernstein as Markov V A 1916 Uber Polynome die in einem gegebenen Intervalle moglichst wenig von Null abweichen Math Ann 77 2 213 258 doi 10 1007 bf01456902 S2CID 122406663 Retrieved from https en wikipedia org w index php title Markov brothers 27 inequality amp oldid 1101283969, wikipedia, wiki, book, books, library,
