Semirings, automata, languages
Semirings, automata, languages
Fuzzy Sets and Systems
Decomposable measures and nonlinear equations
Fuzzy Sets and Systems - Special issue on fuzzy measures and integrals
Idempotent integral as limit of g-integrals
Fuzzy Sets and Systems - Special issue on fuzzy measures and integrals
Restored fuzzy measures in expert decision-making
Information Sciences: an International Journal
A Jensen type inequality for fuzzy integrals
Information Sciences: an International Journal
Fuzzy Chebyshev type inequality
International Journal of Approximate Reasoning
General Chebyshev type inequalities for Sugeno integrals
Fuzzy Sets and Systems
Aggregation Functions (Encyclopedia of Mathematics and its Applications)
Aggregation Functions (Encyclopedia of Mathematics and its Applications)
New general extensions of Chebyshev type inequalities for Sugeno integrals
International Journal of Approximate Reasoning
Generalization of the Jensen inequality for pseudo-integral
Information Sciences: an International Journal
General Minkowski type inequalities for Sugeno integrals
Fuzzy Sets and Systems
The evaluation of service quality using generalized Choquet integral
Information Sciences: an International Journal
A universal integral as common frame for choquet and Sugeno integral
IEEE Transactions on Fuzzy Systems
An inequality related to Minkowski type for Sugeno integrals
Information Sciences: an International Journal
General Chebyshev type inequalities for universal integral
Information Sciences: an International Journal
The theory of pseudo-linear operators
Knowledge-Based Systems
Hi-index | 0.20 |
In the framework of the pseudo-analysis the classical L^p space is generalized and there are proved important properties of introduced space. Three types of convergence of sequences of measurable functions are considered in this space. The inequalities for integrals based on pseudo-integral have been recently proposed as the Holder, Minkowski and Markov inequalities, which are applied in observing relationship among introduced convergences.