Fuzzy Measure Theory
General Chebyshev type inequalities for Sugeno integrals
Fuzzy Sets and Systems
Fuzzy Chebyshev type inequality
International Journal of Approximate Reasoning
General Chebyshev type inequalities for Sugeno integrals
Fuzzy Sets and Systems
New general extensions of Chebyshev type inequalities for Sugeno integrals
International Journal of Approximate Reasoning
General Minkowski type inequalities for Sugeno integrals
Fuzzy Sets and Systems
Chebyshev inequality for Sugeno integrals
Fuzzy Sets and Systems
Fritz Carlson's inequality for fuzzy integrals
Computers & Mathematics with Applications
An inequality related to Minkowski type for Sugeno integrals
Information Sciences: an International Journal
Hölder type inequality for Sugeno integral
Fuzzy Sets and Systems
General Barnes-Godunova-Levin type inequalities for Sugeno integral
Information Sciences: an International Journal
On some advanced type inequalities for Sugeno integral and T-(S-)evaluators
Information Sciences: an International Journal
| Hi-index | 0.09 |
Roman-Flores et al. [H. Roman-Flores, A. Flores-Franulic, Y. Chalco-Cano, The fuzzy integral for monotone functions, Applied Mathematics and Computation 185 (2007) 492-498] gave some optimal upper bounds for the Sugeno integral of continuous and strictly monotone functions and provided Yong-type inequalities for the Sugeno integral. These results are generalized to monotone functions in this paper. Two algorithms are given for calculating the Sugeno integral of monotone functions based on Lebesgue measure. Several illustrative examples are presented.