One-fibered ideals in 2-dimensional rational singularities that can be desingularized by blowing up the unique maximal ideal

In this paper we introduce the concept of Boolean near-rings. Using any Boolean ring with identity, we construct a class of Boolean near-rings, called special, and determine left ideals, ideals, factor near-rings which are Boolean rings, isomorphism classes, and ideals which are near-ring direct summands for these special Boolean near-rings.Blackett [6] discusses the near-ring of affine transformations on a vector space where the near-ring has a unique maximal ideal. Gonshor [10] defines abstract affine near-rings and completely determines the lattice of ideals for these near-rings. The near-ring of differentiable transformations is seen to be simple in [7], For near-rings with geometric interpretations, see [1] or [2].

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Unit Groups of Classes of Five Radical Zero Commutative Completely Primary Finite Rings

Journal of Advances in Mathematics and Computer Science ◽

10.9734/jamcs/2021/v36i830396 ◽

2021 ◽

pp. 137-154

Author(s):

Hezron Saka Were ◽

Maurice Oduor Owino ◽

Moses Ndiritu Gichuki

Keyword(s):

Maximal Ideal ◽

Finite Ring ◽

Finite Rings ◽

Zero Divisors ◽

Unique Maximal Ideal

In this paper, R is considered a completely primary finite ring and Z(R) is its subset of all zero divisors (including zero), forming a unique maximal ideal. We give a construction of R whose subset of zero divisors Z(R) satisfies the conditions (Z(R))5 = (0); (Z(R))4 ̸= (0) and determine the structures of the unit groups of R for all its characteristics.

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Properties of Quotient Rings

Canadian Journal of Mathematics ◽

10.4153/cjm-1972-117-1 ◽

1972 ◽

Vol 24 (6) ◽

pp. 1122-1128 ◽

Cited By ~ 5

Author(s):

S. Page

Keyword(s):

Commutative Ring ◽

Maximal Ideal ◽

Ring Of Quotients ◽

Quotient Rings ◽

Special Case ◽

Classical Ring ◽

Unique Maximal Ideal

In [1; 2 ; 7] Gabriel, Goldman, and Silver have introduced the notion of a localization of a ring which generalizes the usual notion of a localization of a commutative ring at a prime. These rings may not be local in the sense of having a unique maximal ideal. If we are to obtain information about a ring R from one of its localizations, Qτ (R) say, it seems reasonable that Qτ(R) be a tractable ring. This, of course, is what Goldie, Jans, and Vinsonhaler [4; 3; 8] did in the special case for Q(R) the classical ring of quotients.

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Dual Numbers and Topological Hjelmslev Planes

Canadian Mathematical Bulletin ◽

10.4153/cmb-1983-048-6 ◽

1983 ◽

Vol 26 (3) ◽

pp. 297-302 ◽

Cited By ~ 4

Author(s):

J. W. Lorimer

Keyword(s):

Local Ring ◽

Maximal Ideal ◽

Dual Numbers ◽

Hjelmslev Plane ◽

Product Topology ◽

Topological Dimension ◽

Locally Compact ◽

Projective Hjelmslev Plane ◽

Zero Divisors ◽

Unique Maximal Ideal

AbstractIn 1929 J. Hjelmslev introduced a geometry over the dual numbers ℝ+tℝ with t2 = Q. The dual numbers form a Hjelmslev ring, that is a local ring whose (unique) maximal ideal is equal to the set of 2 sided zero divisors and whose ideals are totally ordered by inclusion. This paper first shows that if we endow the dual numbers with the product topology of ℝ2, then we obtain the only locally compact connected hausdorfT topological Hjelmslev ring of topological dimension two. From this fact we establish that Hjelmslev's original geometry, suitably topologized, is the only locally compact connected hausdorfr topological desarguesian projective Hjelmslev plane to topological dimension four.

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Cohomological annihilators

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100059417 ◽

1982 ◽

Vol 91 (3) ◽

pp. 345-350 ◽

Cited By ~ 18

Author(s):

Peter Schenzel

Keyword(s):

Maximal Ideal ◽

Commutative Algebra ◽

Local Cohomology ◽

Local Rings ◽

Intersection Theorem ◽

Prime Characteristic ◽

Local Cohomology Modules ◽

System Of Parameters ◽

Cohomology Modules ◽

Unique Maximal Ideal

The local cohomology theory introduced by Grothendieck(1) is a useful tool for attacking problems in commutative algebra and algebraic geometry. Let A denote a local ring with its unique maximal ideal m. For an ideal I ⊂ A and a finitely generated A-module M we consider the local cohomology modules HiI (M), i є ℤ, of M with respect to I, see Grothendieck(1) for the definition. In particular, the vanishing resp. non-vanishing of the local cohomology modules is of a special interest. For more subtle considerations it is necessary to study the cohomological annihilators, i.e. aiI(M): = AnnΔHiI(M), iєℤ. In the case of the maximal ideal I = m these ideals were used by Roberts (6) to prove the ‘New Intersection Theorem’ for local rings of prime characteristic. Furthermore, we used this notion (7) in order to show the amiability of local rings possessing a dualizing complex. Note that the amiability of a system of parameters is the key step for Hochster's construction of big Cohen-Macaulay modules for local rings of prime characteristic, see Hochster(3) and (4).

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On 2-absorbing ideals of commutative semirings

Journal of Algebra and Its Applications ◽

10.1142/s0219498820500346 ◽

2019 ◽

Vol 19 (02) ◽

pp. 2050034

Author(s):

H. Behzadipour ◽

P. Nasehpour

Keyword(s):

Prime Ideal ◽

Maximal Ideal ◽

Proper Ideal ◽

Prime Ideals ◽

Ideal Formula ◽

Minimal Prime ◽

Unique Maximal Ideal

In this paper, we investigate 2-absorbing ideals of commutative semirings and prove that if [Formula: see text] is a nonzero proper ideal of a subtractive valuation semiring [Formula: see text] then [Formula: see text] is a 2-absorbing ideal of [Formula: see text] if and only if [Formula: see text] or [Formula: see text] where [Formula: see text] is a prime ideal of [Formula: see text]. We also show that each 2-absorbing ideal of a subtractive semiring [Formula: see text] is prime if and only if the prime ideals of [Formula: see text] are comparable and if [Formula: see text] is a minimal prime over a 2-absorbing ideal [Formula: see text], then [Formula: see text], where [Formula: see text] is the unique maximal ideal of [Formula: see text].

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Homological Projective Duality for Linear Systems with Base Locus

International Mathematics Research Notices ◽

10.1093/imrn/rny222 ◽

2018 ◽

Vol 2020 (21) ◽

pp. 7829-7856 ◽

Cited By ~ 1

Author(s):

Francesca Carocci ◽

Zak Turčinović

Keyword(s):

Linear Systems ◽

Dual Pair ◽

Resolution Of Singularities ◽

Smooth Variety ◽

Rational Singularities ◽

Base Locus ◽

Projective Duality ◽

Blowing Up ◽

Linear Sections ◽

Base Loci

Abstract We show how blowing up varieties in base loci of linear systems gives a procedure for creating new homological projective duals from old. Starting with a homological projective (HP) dual pair $X,Y$ and smooth orthogonal linear sections $X_L,Y_L$, we prove that the blowup of $X$ in $X_L$ is naturally HP dual to $Y_L$. The result also holds true when $Y$ is a noncommutative variety or just a category. We extend the result to the case where the base locus $X_L$ is a multiple of a smooth variety and the universal hyperplane has rational singularities; here the HP dual is a weakly crepant categorical resolution of singularities of $Y_L$. Finally we give examples where, starting with a noncommutative $Y$, the above process nevertheless gives geometric HP duals.

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