J. F. Watters scite author profile

J. F. Watters

5Publications

62Citation Statements Received

14Citation Statements Given

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106

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University of Leicester

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Reflexive Bimodules

Fuller¹,

Nicholson²,

Watters³

1989

Can. j. math.

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If VK is a finite dimensional vector space over a field K and L is a lattice of subspaces of V, then, following Halmos [11], alg L is defined to be (the K-algebra of) all K-endomorphisms of V which leave every subspace in L invariant. If R ⊆ end(VK) is any subalgebra we define lat R to be (the sublattice of) all subspaces of VK which are invariant under every transformation in R. Then R ⊆ alg [lat R] and R is called a reflexive algebra when this is equality. Every finite dimensional algebra is isomorphic to a reflexive one ([4]) and these reflexive algebras have been studied by Azoff [1], Barker and Conklin [3] and Habibi and Gustafson [9] among others.

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Normal radicals and normal classes of rings

Nicholson

Watters

1979

Journal of Algebra

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Polynomial extensions of Jacobson rings

Watters

1975

Journal of Algebra

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On the Adjoint Group of a Radical Ring

Watters

1968

Journal of the London Mathematical Society

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Simultaneous quasi-diagonalization of normal matrices

Watters

1974

Linear Algebra and its Applications

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J. F. Watters

Reflexive Bimodules

Normal radicals and normal classes of rings

Polynomial extensions of Jacobson rings

On the Adjoint Group of a Radical Ring

Simultaneous quasi-diagonalization of normal matrices

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