Uniform Treatment of Jensen's Inequality by Montgomery Identity
We generalize Jensen's integral inequality for real Stieltjes measure by using Montgomery identity under the effect of n-convex functions; also, we give different versions of Jensen's discrete inequality along with its converses for real weights. As an application, we give generalized variants of Hermite-Hadamard inequality. Montgomery identity has a great importance as many inequalities can be obtained from Montgomery identity in q-calculus and fractional integrals. Also, we give applications in information theory for our obtained results, especially for Zipf and Hybrid Zipf-Mandelbrot entropies.