Thus condition (ii) of Theorem I is satisfied. This proves THEOBEM II. For any dilatation of a non-singular M6 of Vd, the con- d
ON A THEOREM OF HAYMAN CONCERNING THE DERIVATIVE OF A FUNCTION OF BOUNDED CHARACTERISTIC Let U be the open unit disc in the comp
![Algorithm 352: characteristic values and associated solutions of Mathieu's differential equation [S22] | Communications of the ACM Algorithm 352: characteristic values and associated solutions of Mathieu's differential equation [S22] | Communications of the ACM](https://dl.acm.org/cms/asset/f7b169bd-25bc-4ae6-96ef-152b2dd91a68/363156.363176.fp.png)
Algorithm 352: characteristic values and associated solutions of Mathieu's differential equation [S22] | Communications of the ACM
![Dini Lipschitz functions for the Dunkl transform in the Space $$\mathrm {L}^{2}(\mathbb {R}^{d},w_{k}(x)dx)$$ L 2 ( R d , w k ( x ) d x ) – topic of research paper Dini Lipschitz functions for the Dunkl transform in the Space $$\mathrm {L}^{2}(\mathbb {R}^{d},w_{k}(x)dx)$$ L 2 ( R d , w k ( x ) d x ) – topic of research paper](https://cyberleninka.org/viewer_images/452226/f/1.png)