A Sheaf of Boehmians

@article{Beardsley2011ASO,
  title={A Sheaf of Boehmians},
  author={Jonathan Beardsley and Piotr Mikusinski},
  journal={Annales Polonici Mathematici},
  year={2011},
  volume={107},
  pages={293-307}
}
We show that Boehmians defined over open sets of R N consti- tute a sheaf. In particular, it is shown that such Boehmians satisfy the gluing property of sheaves over topological spaces. 
A class of Boehmians for a recent generalization of Hankel–Clifford transformation of arbitrary order
We investigate some generalization of a class of Hankel–Clifford transformations of arbitrary order on a class of Boehmians. We show that the generalized transform is one-to-one and onto mapping
On the Generalized Krätzel Transform and Its Extension to Bohemian Spaces
We investigate the Kratzel transform on certain class of generalized functions. We propose operations that lead to the construction of desired spaces of generalized functions. The Kratzel transform
REAL COVERING OF THE GENERALIZED HANKEL-CLIFFORD TRANSFORM OF FOX KERNEL TYPE OF A CLASS OF BOEHMIANS
We investigate some generalization of a class of Hankel-Cli- fford transformations having Fox H-function as part of its kernel on a class of Boehmians. The generalized transform is a one-to-one and

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