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Differential Operator Rings for Which Homogeneous Functions are Linear

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Let ε be the collection of those rings S such that, for every S-module V and every homogeneous function ƒ. V → V, ƒ(sv) = sƒ(v), s ∈ S, v ∈ V, ƒ is linear on V. In this paper we characterize those Stanley-Reisner rings, R, such that D(R) is in ε.

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  1. Department of Mathematics, Texas A&M University, College Station, TX, 77843-3368, USA

    C. J. Maxson

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  1. C. J. Maxson
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Correspondence to C. J. Maxson.

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Maxson, C.J. Differential Operator Rings for Which Homogeneous Functions are Linear. Results. Math. 45, 106–114 (2004). https://doi.org/10.1007/BF03323001

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