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9 results on '"Grover, Harpreet K."'

1. Some Characterizations of VNL Rings

Author

Grover, Harpreet K. and Khurana, Dinesh

Subjects
Mathematics - Rings and Algebras, 16E50
Abstract

A ring R is said to be VNL if for any a in R, either a or 1-a is (von Neumann) regular. The class of VNL rings lies properly between the exchange rings and (von Neumann) regular rings. We characterize abelian VNL rings. We also characterize and classify arbitrary VNL rings without infinite set of orthogonal idempotents; and also the VNL rings having primitive idempotent e such that eRe is not a division ring. We prove that a semiperfect ring R is VNL if and only if for any right uni-modular row (a, b) in R^2, one of the a or b is regular in R. Formal triangular matrix rings that are VNL, are also characterized. As a corollary it is shown that an upper triangular matrix ring T_n(R) is VNL if and only if n=2 or 3 and R is a division ring., Comment: 22 pages

Published
2008

2. Strict Convexity and Betweenness.

Author

Grover, Harpreet K., Narang, T. D., and Garg, Shelly

Subjects
*VECTOR spaces, *METRIC spaces, *LARGE space structures (Astronautics)
Abstract

In this paper, we discuss the two concepts of betweeness in a metric linear space that arise from the vector space structure and from the metric space structure. We also explore the relation between the mid-points obtained from the algebraic structure and the metric structure in such spaces. We show that a real metric linear space is normable if and only if every algebraic mid-point is a metric mid-point if and only if algebraic betweeness implies metric betweeness. We also show that a real metric linear space is pseudo strictly convex if and only if the metric betweeness implies the algebraic betweeness. As a corollary, it turns out that a real metric linear space is normable with a strictly convex norm if and only if the notions of algebraic mid-points and metric mid-points coincide if and only if the notions of algebraic betweeness and metric betweeness coincide. [ABSTRACT FROM AUTHOR]

Published
2024

5. Matrices that are integral over the base ring.

Author

Grover, Harpreet K., Khurana, Anjana, and Khurana, Dinesh

Subjects
*MATRICES (Mathematics), *COMMUTATIVE rings, *FINITE rings, *INTEGRALS, *POLYNOMIALS
Abstract

We study matrices over arbitrary rings that are integral over the base ring. For any ring R , let f , g , h ∈ R [ x 1 , x 2 , ... , x n ] with h = f g. We prove that for any pairwise commuting elements a 1 , a 2 , ... , a n ∈ R if g (a 1 , a 2 , ... , a n) = 0 , then h (a 1 , a 2 , ... , a n) = 0. As a corollary, it follows that for f ∈ n (S) [ x 1 , x 2 , ... , x n ] , S commutative ring, if A 1 , A 2 , ... , A n ∈ n (S) are pairwise commuting matrices such that f (A 1 , A 2 , ... , A n) = 0 , then g (A 1 , A 2 , ... , A n) = 0 where g = det (f) I. This result, which is a generalization of the Cayley–Hamilton Theorem, was proved by Phillips in 1919. For a positive integer n > 1 , we prove that if every matrix in n (R) satisfies a monic polynomial of degree n over R , then R is commutative. On the other hand, every diagonal matrix in n (R) , n > 1 , satisfies a monic polynomial of degree n over R precisely when R is a left duo ring. We prove that if every diagonal matrix in n (R) , n > 1 , is R -integral, then R is Dedekind finite. [ABSTRACT FROM AUTHOR]

Published
2022
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6. SUMS OF UNITS IN RINGS

Author

GROVER, HARPREET K., primary, WANG, ZHOU, additional, KHURANA, DINESH, additional, CHEN, JIANLONG, additional, and LAM, T. Y., additional

Published
2013
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9. SUMS OF UNITS IN RINGS.

Author

GROVER, HARPREET K., WANG, ZHOU, KHURANA, DINESH, CHEN, JIANLONG, and LAM, T. Y.

Subjects
*UNIT groups (Ring theory), *RING theory, *ADDITION (Mathematics), *NUMBER systems, *MATHEMATICAL analysis, *ABSTRACT algebra, *VON Neumann regular rings
Abstract

In this paper, we study rings that are additively generated by units. We prove that if the identity in a ring with stable range one is a sum of two units, then every (von Neumann) regular element is a sum of two units. It follows that every element in a unit-regular ring is a sum of two units if the identity is a sum of two units. Also, if the identity of a strongly π-regular ring is a sum of two units, then every element is a sum of three units. [ABSTRACT FROM AUTHOR]

Published
2014
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