Rearrangements of differentiable functions

We investigate differentiability of functions defined on regions of the real quaternion field and obtain a noncommutative version of the Cauchy-Riemann conditions. Then we study the noncommutative analog of the Cauchy integral as well as criteria for functions of a quternion variable to be analytic.

In many applications of fuzzy logic it is of special interest to have a transfer function with good properties regarding differentiability. To that end it is desirable to have continuously differentiable membership functions with only few parameters. In this paper we propose a class of symmetrical a

We show that Lipschitz-continuously differentiable functions f : ([-I; I])k + R which are computable in time I'( T(n)), where T is regular, can be computed online in time C'( T(n) + .&(n) log(n)) on a Type-2-machine, where .I:n~n log(n) log log(n) is the Schiinhage-Strassenbound for integer multipli