Differential Operators on an Affine Curve

Smith, S. Paul; Stafford, J. T.

doi:10.1112/plms/s3-56.2.229

Cited by 85 publications

(104 citation statements)

References 21 publications

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“…The problem now is to understand the properties of D(S) when X is singular. There are several interesting results, for example, in [2], [9] and [14,Section 7]. Now let R = k[x 1 , .…”

Section: Introductionmentioning

confidence: 99%

Differential operators on Stanley-Reisner rings

Tripp

1997

Trans. Amer. Math. Soc.

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Abstract. Let k be an algebraically closed field of characteristic zero, and let R = k[x 1 , . . . , xn] be a polynomial ring. Suppose that I is an ideal in R that may be generated by monomials.We investigate the ring of differential operators D(R/I) on the ring R/I, and I R (I), the idealiser of I in R. We show that D(R/I) and I R (I) are always right Noetherian rings. If I is a square-free monomial ideal then we also identify all the two-sided ideals of I R (I).To each simplicial complex ∆ on V = {v 1 , . . . , vn} there is a corresponding square-free monomial ideal I ∆ , and the Stanley-Reisner ring associated to ∆ is defined to be k[∆] = R/I ∆ . We find necessary and sufficient conditions on ∆ for D(k[∆]) to be left Noetherian.

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“…The problem now is to understand the properties of D(S) when X is singular. There are several interesting results, for example, in [2], [9] and [14,Section 7]. Now let R = k[x 1 , .…”

Section: Introductionmentioning

confidence: 99%

Differential operators on Stanley-Reisner rings

Tripp

1997

Trans. Amer. Math. Soc.

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“…It is easy to see that its composition with the classical Fourier transformation (30) gives the same as (29), which proves the commutativity of the above square.…”

Section: Principal Symbols and Inverse Limitsmentioning

confidence: 64%

“…The left hand side of this diagram is already described in Corollary 5 and Theorem 3. The composition on the left hand side is (29) k…”

Section: Principal Symbols and Inverse Limitsmentioning

confidence: 99%

One-dimensional infinitesimal-birational duality through differential operators

Maszczyk

2006

Fund. Math.

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Abstract. The structure of filtered algebras of Grothendieck's differential operators on a smooth fat point in a curve and graded Poisson algebras of their principal symbols is explicitly determined. A related infinitesimal-birational duality realized by a Springer type resolution of singularities and the Fourier transformation is presented. This algebrogeometrical duality is quantized in appropriate sense and its quantum origin is explained.It seems that our ship is arriving at a coast, but the land is still hidden in the fog.

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“…The primary purpose of this paper is to study the ring 3f[A) of differential operators on A when dim(^4), the Krull dimension of A, is at most one. If A is also reduced or is a domain 3f(A) has been studied extensively in [10] and [15] and we prove analogues of the main results of these papers. For example THEOREM A.…”

Section: Rings Of Differential Operators On One Dimensional Algebras mentioning

confidence: 72%