PCF-Theorem Let f be a function defined on a real interval I, decreasing for u ≤ s 0 and increasing for u ≥ s 0, where s 0 ∈ I.
PCF-Corollary Let g be a function defined on a positive interval I, decreasing for t ≤ r 0 and increasing for t ≥ r 0, where r 0 ∈ I.
Lemma 2.1 Let f be a function defined on a real interval I, decreasing for u ≤ s 0 and increasing for u ≥ s 0, where s 0 ∈ I, and let p 1, p 2, …, p n be positive real numbers such that p 1 + p 2 + ⋯ + p n = 1.
WPCF-Theorem Let f be a function defined on a real interval I, decreasing for u ≤ s 0 and increasing for u ≥ s 0, where s 0 ∈ I, and let p 1, p 2, …, p n be positive real numbers such that p = min { p 1, p 2, …, p n }, p 1 + p 2 + ⋯ + p n = 1.
This paper deals with a new extension of Jensen's discrete inequality to a partially convex function f, which is defined on a real interval I, convex on a subinterval [ a, b ] ⊂ I, decreasing for u ≤ c and increasing for u ≥ c, where c ∈ [ a, b ].
WPCF-Corollary Let g be a function defined on a positive interval I, decreasing for t ≤ r 0 and increasing for t ≥ r 0, where r 0 ∈ I, and let p 1, p 2, …, p n be positive real numbers such that p = min { p 1, p 2, …, p n }, p 1 + p 2 + ⋯ + p n = 1.
Accordingly, the diffusion coefficient for TβRI decreases for tracks inside adhesions compared to those outside, demonstrating that this spatial organization specifically limits TβRI mobility.
From (7), note that, there are two options to reduce the value for : (i) decreasing the segments number, or using larger frame size during transmission; (ii) increasing data reception rate. .
Expression of 85 transcripts, including APOL2, GCC1, PTGES, were increased for Groups I II and decreased for Group III.
By Lemma 3(a), we can get x 4 n − i, y 4 n − i n = 0 ∞ is decreasing for i ∈ − 2, − 1, 0, 1 Open image in new window.
