Convergence theorems for random elements in convex combination spaces
From MaRDI portal
Publication:6588905
DOI10.1016/j.fss.2022.06.019zbMATH Open1543.60002MaRDI QIDQ6588905
Pedro Terán, Miriam Alonso de la Fuente
Publication date: 19 August 2024
Published in: Fuzzy Sets and Systems (Search for Journal in Brave)
fuzzy random variablerandom setdominated convergence theoremVitali convergence theoremconvex combination operation
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Complete convergence for arrays of rowwise independent random variables and fuzzy random variables in convex combination spaces
- Limit theorems and applications of set-valued and fuzzy set-valued random variables
- Harmonizing two approaches to fuzzy random variables
- Strong law of large numbers for t-normed arithmetics
- On Borel measurability and large deviations for fuzzy random variables
- The law of large numbers in a metric space with a convex combination operation
- Integrals of random fuzzy sets
- Approach for a metric space with a convex combination operation and applications
- Convergences of sequences of set-valued and fuzzy-set-valued functions
- Convergence theorems for fuzzy random variables and fuzzy martingales
- On embedding problems of fuzzy number space. V
- The Weierstrass-Stone theorem for convex-cone-valued functions
- Comparative properties of three metrics in the space of compact convex sets
- On positive random objects
- Some complete metrics on spaces of fuzzy subsets
- Groupoid metrization theory. With applications to analysis on quasi-metric spaces and functional analysis
- A new derivative concept for set-valued and fuzzy-valued functions. Differential and integral calculus in quasilinear metric spaces
- Jensen's inequality for random elements in metric spaces and some applications
- Some strong laws of large number for double array of random upper semicontinuous functions in convex combination spaces
- Summary: On the strong laws of large numbers for double arrays of random variables in convex combination spaces
- Algebraic, metric and probabilistic properties of convex combinations based on the t-normed extension principle: the strong law of large numbers
- On a uniform law of large numbers for random sets and subdifferentials of random functions
- Variational Analysis in Sobolev and BV Spaces
- Probability and Stochastics
- CONVERGENCE THEOREMS FOR SET-VALUED DENJOY-PETTIS INTEGRABLE MAPPINGS
- Doob's decomposition of set-valued submartingales via ordered near vector spaces
- Convergence of Conditional Expectations and Strong Laws of Large Numbers for Multivalued Random Variables
- Limit theorems for fuzzy random variables
- The almost sure Skorokhod representation for subsequences in nonmetric spaces
- Approximation of continuous convex-cone-valued functions by monotone operators
- Some remarks on the space of differences of sublinear functions
- Compactness and Tightness in a Space of Measures with the Topology of Weak Convergence.
- Theory of Random Sets
- A new fuzzy-valued integral and its convergence theorems
- Functional Analysis with Applications
- A vector lattice version of r˚ adström's embedding theorem
- On the Construction of Almost Uniformly Convergent Random Variables with Given Weakly Convergent Image Laws
- Speed of convergence of the n-fold convolution of a probability measure on a compact group
- An Embedding Theorem for Spaces of Convex Sets
- Encyclopedia of Distances
- Fuzzy random variables
- Some results on convergence and distributions of fuzzy random variables
This page was built for publication: Convergence theorems for random elements in convex combination spaces
