Sentence examples for strongly m from inspiring English sources

The interaction of time*subsidy was also significant F 1,56) = 25.52, p = .00: non-subsidized habitat diversity increased more strongly (M = 4.02 to M = 5.05, p = .00) over time than subsidized habitat diversity (M = 2.45 to M = 2.70, p = .00).00

The electrochemical studies were performed in strongly acidic media (0.1 2.7 M H2SO4) as well as in the pH range of 1 12.

Although government revenues are rising strongly, Ms Rousseff has spoken of funding better health care by bringing back a tax on financial transactions, which was not renewed after a rare tax-revolt in Congress in 2007.

Some common fixed point results for Banach operator pairs in strongly M-starshaped metric spaces are obtained.

The aim of this paper is to establish certain common fixed point theorem for a Banach operator pair in the setup of strongly M-starshaped metric spaces.

Remark 2.10 A subset S of a strongly M-starshaped metric space X is said to have the property ( N ) w.r.t.

Using Theorems 3.2 and 3.4 [31] and the technique in [7], we can prove more common fixed point and approximation results for Banach pairs satisfying generalized nonexpansive conditions in a strongly M-starshaped metric space X.

Corollary 2.8 Let X be a strongly M-starshaped metric space, let f, T : X → X be two mappings, S be a subset of X such that T ( ∂ S ∩ S ) ⊂ S and x ˆ ∈ F ( T ) ∩ F ( f ).

Theorem 2.9 Let X be a strongly M-starshaped metric space, let f, T : X → X be two mappings, S be a subset of X such that T ( ∂ S ∩ S ) ⊂ S and x ˆ ∈ F ( T ) ∩ F ( f ).

Corollary 2.3 Let S be a nonempty subset of a strongly M-starshaped metric space X and let T, f be self-maps of S. Suppose that F ( f ) is q-starshaped, clT ( F ( f ) ) ⊆ F ( f ), cl ( T ( S ) ) is compact, T is continuous on S and T is f-nonexpansive on S, then S ∩ F ( T ) ∩ F ( f ) ≠ ∅.

Corollary 2.4 Let S be a nonempty subset of a strongly M-starshaped metric space X and let T, f be self-maps of S. Suppose that F ( f ) is closed and q-starshaped, ( T, f ) is a Banach operator pair, cl ( T ( S ) ) is compact, T is continuous on S and T satisfies (2.2) or T is f-nonexpansive on S, then S ∩ F ( T ) ∩ F ( f ) ≠ ∅.