@article{article_737163, title={Lacunary Statistical Convergence in Measure for Sequences of Fuzzy Valued Functions}, journal={Konuralp Journal of Mathematics}, volume={8}, pages={252–262}, year={2020}, author={Kişi, Ömer and Dündar, Erdinç}, keywords={Pointwise convergence, Uniformly convergence, Lacunary convergence, Fuzzy-valued function}, abstract={<div style="text-align:justify;"> <span style="font-size:14px;">In this study, we examine the concepts of outer and inner lacunary statistical convergence in measure for sequences of fuzzy-valued measurable functions and show that both kinds of convergence are equivalent in a finite measurable set. Also, we investigate the notion of lacunary statistical convergence in measure for sequences of fuzzy-valued measurable functions and establish interesting results. Furthermore, we give the lacunary statistical version of Egorov’s theorem for sequences of fuzzy-valued measurable functions in a finite measurable space. </span> </div>}, number={2}, publisher={Mehmet Zeki SARIKAYA}