Charged balanced black rings in five dimensions

We present balanced black ring solutions of pure Einstein–Maxwell theory in five dimensions. The solutions are asymptotically flat, and their tension and gravitational self-attraction are balanced by the repulsion due to rotation and electrical charge. Hence the solutions are free of conical singularities and possess a regular horizon which exhibits the ring topology S¹×S²$S^1\times S^2$. We discuss the global charges and the horizon properties of the solutions and show that they satisfy a Smarr relation. We construct these black rings numerically, restricting to the case of black rings with a rotation in the direction of the S¹$S^1$ and large black rings. We compare these to the blackfold results.     

广泛的诣零内射环

The definition of AP-injectivity wnil-injectivity and almost nil n-injectivity motivates us to generalize the injectivity to almost The aim of this paper is to investigate characterizations and properties of almost wnil-injective rings and almost nil n-injective rings. Various results are developed, and many conclusions extend known results.     

Minimal underlying division rings of sets of points of a projective space

Let V be a vector space over a division ring K. Let P be a spanning set of points in Σ:=PG(V). Denote by K(P) the family of sub-division rings F of K having the property that there exists a basis B_F of V such that all points of P are represented as F-linear combinations of B_F. We prove that when K is commutative, then K(P) admits a least element. When K is not commutative, then, in general, K(P) does not admit a minimal element. However we prove that under certain very mild conditions on P, any two minimal elements of K(P) are conjugate in K, and if K is a quaternion division algebra then K(P) admits a minimal element.     

Generators of Rings of Differential Operators on a Class of k—algebras

51.IlltroductionSmithL4JproPoseaso1vingprocedure,whichcIcternllnesl1olyno[nialresolutlonofI3:lrt1itldifferentialequationcorrespondingbysomecoordinateringsofirreduciblel7l;lnecurves.-I'l1lsprogrameventual1ydependsontl1edeterminationofgeneratorsofringsofdif…     

U-factorization of ideals

We study the factorization of ideals of a commutative ring, in the context of the U-factorization framework introduced by Fletcher. This leads to several “U-factorability” properties weaker than unique U-factorization. We characterize these notions, determine the implications between them, and give several examples to illustrate the differences. For example, we show that a ring is a general ZPI-ring if and only if its monoid of ideals has unique factorization in the sense of Fletcher. We also examine how these “U-factorability” properties behave with respect to several ring-theoretic constructions.     

模的弱消去问题和Exchange环的弱稳定条件

本文研究模的弱消去问题和exchange环的弱稳定条件,给出了wsrl条件的新刻划,证明了对具有有限exchange性质的模,外弱消去等价于内弱消去并等价于自同态环满足wsrl条件.     

满足SR2*(R,I)条件的环的相对K2

设I是环R的理想,称(R,I)满足SR_2~*主(R,I)条件,如果它满足SR_2(R,I)条件,并且对任意的a,b∈I,存在一个I-单位半正则元t∈R,使得1 a(b-t)∈U(R,I),称环R带许多单位半正则元,如果它满足SR_2~*(R,R)条件,本文证明,如果(R,I)满足SR_2~*(R,I)条件,则S(R,I)=L(I)(?)(I)L(I)H(R,I),且相对K′_2群K′_2(R,I)(K_2(R,I))包含在H(R,I)((?)(R⊕I,O⊕I))中；进而,若I包含于R的中心,则K′_2(R,I)和K_(R,I)由相对Dennis-Stein符号生成,特别的,如果R是带许多单位半正则元的环,那么K_2(R)包含在H(R)中；进而,若R是交换的,则K_(2(R)由Dennis-Stein符号生成,在SR_2(R,I)条件下,本文证明了K_2(n,R,I)具有满稳定性,其中n≥3。