Desigualdades del tipo Hermite-Hadamard y Fejér para funciones fuertemente armónicas convexas

Mireya Bracamonte

Mireya Bracamonte Departamento de Matem\'{a}tica, Universidad Centroccidental Lisandro Alvarado, Barquisimeto, Venezuela

Palabras clave: Strongly harmonically convex function, Hermite-Hadamrd, Fej\'er type inequalities Funciones fuertemente armónicas convexas, Desigualdad del tipo Hermite-Hadamrd, Desigualdad del tipo de Fejér.

Resumen

Introducimos la noción de funciones fuertemente armónicas convexas y presentamos algunso ejemplos y propiedades de ésta clase. También, establecemos algunas desigualdades del tipo Hermite-Hadamard and y Fejér para la clase introducida.

Visitas al artículo

301

Descargas

La descarga de datos todavía no está disponible.

Referencias

M. Bessenyei and Zs. PÂ´ales, Characterization of convexity via Hadamardâs inequality, Math. Inequal. Appl. 9 (2006), 53â62.

F. Chen and S. Wu, FejÂ´er and Hermite-Hadamard type inequalities for harmonically convex functions,Hindawi Publishing Corporation Journal of Applied Mathematics (2014).

S. Dragomir, Inequalities of Hermite-Hadamard type for h-convex functions on linear spaces, Mathematica Moravica (2015), 107â121.

S. Dragomir and R. Agarwal, Two inequalities for diferentiable mappings and applications to special means of real numbers and to trapezoidal formula, Appl. Math. Lett., 11, No. 5 (1998), 91â95.

S. Dragomir and C. Pearce, Selected topics on Hermite-Hadamard inequalities and applications, 2000.

L. FejÃ©r, UÂ¨ ber die fourierreihen, II, Math. Naturwiss. Anz Ungar. Akad.Wiss. (1906), 369â390.

A. Ghazanfari and S. Dragomir, Hermite-Hadamard inequality for functions whose derivatives absolute values are preinvex, 2012.

J. Hadamard, Ã©tude sur les propri[U+FFFD]s des fonctions entiÃ©res en particulier dune fonction considÃ©rÃ©e par Riemann, J. Math. Pures Appl., 58 (1893), 171â215.

G.H. Hardy, J.E. Littlewood, and G. Polya, Inequalities, Cambridge Univ. Press., 1934.

J. Hiriart-Urruty and C. LemarÂ´echal, Fundamentals of convex analysis, Springer-Verlag, Berlin-Heidelberg, 2001.

I. Iscan, Hermite-Hadamard type inequalities for harmonically convex functions, Hacettepe Journal of Mathematics and Statistics Volume 43(6)(2014), 935 â 942.

M.V. JovanoviËc, A note on strongly convex and strongly quasiconvex functions, Notes 60 (1996), 778â779.

M. Kuczma, An introduction to the theory of functional equations and inequalities, Cauchyâs equation and Jensenâs inequality, Second Edition, BirkhÂ¨auser, Basel Boston Berlin, 2009.

bibitem{14} N. Merentes and K. Nikodem, Remarks on strongly convex functions, Aequationes mathematicae,Volume 80, Issue 1 (2010), 193â199.

C. Niculescu, The Hermite-Hadamard inequality for log-convex functions, Nonlinear analysis (2012), 662â669.

C. Niculescu and L. Persson, Convex functions and their applications, A Contemporary Approach,CMS Books in Mathematics, vol. 23, Springer, New York, 2006.

A. Ostrowski, Uber die absolutabweichung einer

differentiebaren funktion vonihrem integralmittelwert, Comment. Math. Helv. 10 (1938), 226â227.

J. Pecaric, F. Proschan, and Y.L Tong, Convex functions, partial orderings and statistical applications,

Academic Press, Inc. Boston, 1992.

B. Polyak, Existence theorems and convergence of minimizing sequences in extremum problems with

restrictions, Dokl. Akad. Nauk. SSSR 166 (1966), 287â290.

A. Roberts and D. Varberg, Convex functions, Academic Press, New York-London, 1973.

R.T. Rockafellar, Monotone operator and the proximal point algorithm, SIAM J. Control Optim 14 (1976), 888â898.

C. Zalinescu, Convex analysis in general vector spaces, World Scientific, New Jersey, 2002.