The multiplier conjecture for the case n = 4n1

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.

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

## Abstract The title reaction, which is spin‐forbidden for N~2~(X^1^∑) + NO(X^2^Π) production, has been studied from 960 to 1130 K in a high‐temperature photochemistry reactor. No reaction could be observed, indicating __k__ < 1 × 10^−15^ cm^3^ molecule^−1^ s^−1^. It is concluded that there is no

## Abstract It has been long conjectured that the crossing number of __C~m~__ × __C~n~__ is (__m__−2)__n__, for all __m__, __n__ such that __n__ ≥  __m__ ≥  3. In this paper, it is shown that if __n__ ≥  __m__(__m__ + 1) and __m__ ≥  3, then this conjecture holds. That is, the crossing number of __

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