# On Integral Operators with Operator-Valued Kernels

 dc.contributor.author Shahmurov, Rishad dc.date.accessioned 2021-07-13T14:43:28Z dc.date.available 2021-07-13T14:43:28Z dc.date.issued 2010 dc.identifier.citation Shahmurov, R. (2010): On Integral Operators with Operator-Valued Kernels. Journal of Inequalities and Applications. Volume 2010. en_US dc.identifier.uri http://ir.ua.edu/handle/123456789/7979 dc.description.abstract Here, we study the continuity of integral operators with operator-valued kernels. Particularly we get LqS; X → LpT; Y estimates under some natural conditions on the kernel k : T × S → BX, Y, where X and Y are Banach spaces, and T, T , μ and S, S, ν are positive measure spaces: Then, we apply these results to extend the well-known Fourier Multiplier theorems on Besov spaces. en_US dc.description.uri https://doi.org/10.1155/2010/850125 dc.format.mimetype application/pdf dc.language English en_US dc.rights.uri https://creativecommons.org/licenses/by/2.0 dc.subject integral operators en_US dc.subject operator-valued kernels en_US dc.title On Integral Operators with Operator-Valued Kernels en_US dc.type text
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