On a special case of Friedrich's inequality

In this paper we study a conjecture of J. B. Carrell on the rationality of a compact Kahler manifold admitting a holomorphic vector field with isolated zeroes. The conjecture, formulated in terms of ‫ރ‬ q -actions, says that if ‫ރ‬ q is acting on a nonsingular projective variety X with exactly one f

We present a new form of the Trudinger-type inequality, which shows an explicit dependence. Moreover, we give an alternative proof of the Brezis-GallouetWainger inequality. 1995 Academic Press, Inc.

We prove that if K is a finite extension of Q, P is the set of prime numbers in Z that remain prime in the ring R of integers of K, f, g # K[X] with deg g>deg f and f, g are relatively prime, then f +pg is reducible in K[X] for at most a finite number of primes p # P. We then extend this property to

## Abstract The best constant in a generalized complex Clarkson inequality is __C__~__p,q__~ (ℂ) = max {2^1–1/__p__^ , 2^1/__q__^ , 2^1/__q__ –1/__p__ +1/2^} which differs moderately from the best constant in the real case __C__~__p,q__~ (ℝ) = max {2^1–1/__p__^ , 2^1/__q__^ ,__B__~__p,q__~ }, where