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The second laplace-beltrami operator on rotational hypersurfaces in the euclidean 4-space
(2018)
We consider rotational hypersurface in the four dimensional Euclidean space. We calculate the mean curvature and the Gaussian curvature, and some relations of the rotational hypersurface. Moreover, we define the second ...
On I_{σ}-convergence of folner sequence on amenable semigroups
(New Trends in Mathematical Sciences, 2018-04)
In this paper, the concepts of-uniform density of subsetsAof the setof positive integers and corresponding-convergence of functions defined on discrete countable amenable semigroups were introduced. Furthermore, for any ...
A generalized statistical convergence via ideals in 2-normed spaces
(Longdom Publishing SL, 2018-06)
I-cesaro summability of a sequence of order α of random variables in probability
(Fundamental Journal of Mathematics and Applications, 2018-12)
In this paper, we define four types of convergence of a sequence of random variables,
namely, I-statistical convergence of order a, I-lacunary statistical convergence of order
a, strongly I-lacunary convergence of order ...
Uniform I-lacunary statistical convergence on time scales
(New Trends in Mathematical Sciences, 2018-12)
On asymptotically equivalence of order α for sequence of sets using σ
(Journal of Inequalities and Special Functions, 2018-09)
Implicit equations of the henneberg-type minimal surface in the four dimensional euclidean space
(2018)
Considering the Weierstrass data as $(\psi ,f,g)=( 2,1-z^{-m},z^{n})$, we introduce a two parameter family of Henneberg type minimal surface that we call $\mathfrak{H}_{m,n}$ for positive integers $(m,n)$ by using the ...
I₂-convergence and I₂-cauchy double sequences in topological groups
(Zonguldak Bülent Ecevit Üniversitesi, 2018-05)
Let 2N×N be a family of all subsets of N×N. Following the definition of ideal convergence in a metric space by Kostyrko et al. in 2000, ideal convergence for double sequences in a metric space was introduced by Das et al. ...