Results 71 to 80 of about 1,511 (150)
An innovative inertial extra-proximal gradient algorithm for solving convex optimization problems with application to image and signal processing. [PDF]
Heliyon, 2023 Olilima J +5 more
europepmc +1 more source
UEG Week 2025 Moderated Posters [PDF]
United European Gastroenterol JUnited European Gastroenterology Journal, Volume 13, Issue S8, Page S189-S802, October 2025.
europepmc +2 more sources
Extension of Fejér's inequality to the class of sub-biharmonic functions
Open MathematicsFejér’s integral inequality is a weighted version of the Hermite-Hadamard inequality that holds for the class of convex functions. To derive his inequality, Fejér [Über die Fourierreihen, II, Math. Naturwiss, Anz. Ungar. Akad. Wiss.
Jleli Mohamed
doaj +1 more source
New extensions related to Fejér-type inequalities for GA-convex functions
Demonstratio MathematicaIn this study, some mappings related to the Fejér-type inequalities for GAGA-convex functions are defined over the interval [0,1]{[}0,1]. Some Fejér-type inequalities for GAGA-convex functions are proved using these mappings. Properties of these mappings
Latif Muhammad Amer
doaj +1 more source
UEG Week 2025 Poster Presentations
United European Gastroenterology Journal, Volume 13, Issue S8, Page S803-S1476, October 2025.
wiley +1 more source
Some new Fejér type inequalities for (h, g; α - m)-convex functions
Open MathematicsThe study of (h,g;α−m)\left(h,g;\hspace{1.42271pt}\alpha -m)-convex functions extends the classical concept of convexity to more generalized forms, which provide flexible tools for analysis.
Farid Ghulam +3 more
doaj +1 more source
Strongly MφMψ -Convex Functions, The Hermite–Hadamard–Fejér Inequality and Related Results
Annales Mathematicae SilesianaeWe present Hermite–Hadamard–Fejér type inequalities for strongly MφMψ -convex functions. Some refinements of them and bounds for the integral mean of the product of two functions are also obtained.
Bombardelli Mea, Varošanec Sanja
doaj +1 more source
Fejér-Type Fractional Integral Inequalities Involving Mittag-Leffler Function
Fractal and FractionalSeveral integral inequalities of the Fejér type are derived, incorporating the generalized Mittag-Leffler function alongside the associated fractional integral operator. Consequently, generalizations of known results are achieved.
Maja Andrić
doaj +1 more source
Random walks on the circle and Diophantine approximation. [PDF]
J Lond Math Soc, 2023 Berkes I, Borda B.
europepmc +1 more source