On $ (m,h_1,h_2)$-G-Convex Dominated Stochastic Processes
Kragujevac Journal of Mathematics, Tome 46 (2022) no. 2, p. 215
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In this paper is introduced the concept of $(m,h_{1},h_{2})$-convexity for stochastic processes dominated by other stochastic processes with the same property, some mean square integral Hermite-Hadamard type inequalities for this kind of generalized convexity are established and from the founded results, other mean square integral inequalities for the classical convex, $ s$-convex in the first and second sense, $P$-convex and $ MT$-convex stochastic processes are deduced.
Classification :
52A01 26D15, 60E15
Keywords: $ (m;h_1;h_2)$-convexity, dominated convexity, mean square integral inequalities, stochastic processes
Keywords: $ (m;h_1;h_2)$-convexity, dominated convexity, mean square integral inequalities, stochastic processes
@article{KJM_2022_46_2_a2,
author = {Jorge Eliecer Hern\'andez Hern\'andez},
title = {On $ (m,h_1,h_2)${-G-Convex} {Dominated} {Stochastic} {Processes}},
journal = {Kragujevac Journal of Mathematics},
pages = {215 },
year = {2022},
volume = {46},
number = {2},
language = {en},
url = {http://geodesic.mathdoc.fr/item/KJM_2022_46_2_a2/}
}
Jorge Eliecer Hernández Hernández. On $ (m,h_1,h_2)$-G-Convex Dominated Stochastic Processes. Kragujevac Journal of Mathematics, Tome 46 (2022) no. 2, p. 215 . http://geodesic.mathdoc.fr/item/KJM_2022_46_2_a2/