New progress on the multiplier conjecture

In this note we show that Ruscheweyh's multiplier conjecture is true in several special cases. The results obtained here are closely related to the partial sums of certain analytic functions defined by means of univalent functions. We also answer a question of Ponnusamy concerning the nth partial su

Applying the method that we presented in , in this article we prove: "Let G be an elementary abelian p-group. Let n = dnl. If d(# p) is a prime not dividing nl, and the order w of d mod p satisfies w > 7 , then the Second Multiplier Theorem holds without the assumption nl > A, except that only one c

## In this article we prove that in the case 1 and v is not divisible by 15, then the Second Multiplier Theorem holds without the assumption n, > A. This improves a result due to McFarland.

In this article we present a character approach to the Multiplier Conjecture. Using this method we obtain a new result for the case n = 3n 1 which improves a result due to McFarland. We also give an application of our theorem.