In this paper we investigate the generalization of the Lehrer integral taking more general real operations than classical plus and product. For this purpose we ...
Abstract. The notion of Lehrer-concave integral is generalized taking instead of the usual arithmetical operations of addition and multiplication of reals more ...
Abstract. The notion of Lehrer-concave integral is generalized taking in- stead of the usual arithmetical operations of addition and multiplication of reals ...
Integration of simple functions is a corner stone of general integration theory and it covers integration over finite spaces discussed in this paper.
A pseudoconvex function is a function that behaves like a convex function with respect to finding its local minima, but need not actually be convex.
Missing: Integrals. | Show results with:Integrals.
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Based on the relationship between the Choquet integral and the concave integral recently introduced by Lehrer, we propose a new concept of a pseudo-concave ...
May 11, 2024 · A complex space X is called pseudo-concave if there is a relatively-compact open set U in X, intersecting each non-degenerate component of X and satisfying the ...
May 6, 2017 · What operations preserve pseudo concavity? For instance, is the sum of two pseudo concave function pseudo concave (like for concavity)?
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This study discusses the relationship between the concave integrals and the pan-integrals on finite spaces. The minimal atom of a monotone measure is introduced ...
Pseudo-concavity and its relationship to quasi-concavity: if f is C2 then f is pseudo-concave iff f is quasi-concave and if ▽f(·)=0at x implies f(·).