【 摘 要 】

Fix a field k of characteristic zero. If a(1), ..., a(n) (n >= 3) are positive integers, the integral domain B-a1,B- (....,) (an) = k [X-1, ..., X-n]/ < X-1(a1) +...+ X-n(an)> is called a Pham-Brieskorn ring. It is conjectured that if a(i) >= 2 for all i and a(i) = 2 for at most one i, then B-a1,B- (...,) (an) is rigid. (A ring B is said to be rigid if the only locally nilpotent derivation D : B -> B is the zero derivation.) The conjecture is known to be true when n = 3, and in certain special cases when n >= 4. This article settles several cases not covered by previous results. For instance, we show that if a >= n >= 4 then B-a,B- ...,B- a is rigid (where 'a' occurs n times), and that if Sigma(n)(i=1) 1/a(i) <= 1/n-2 then B-a1,B- ...,B- an is stably rigid. (C) 2020 Elsevier Inc. All rights reserved.

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10_1016_j_jalgebra_2020_01_005.pdf	448KB	PDF	download