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Afrika Matematika, 2014
The authors consider properties of \(B\)-algebras, especially finite \(B\)-algebras and show some results about them. For example, they prove that there is no proper \(B\)-algebra \(X\) such that \(|X|
Ameri, R. +4 more
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The authors consider properties of \(B\)-algebras, especially finite \(B\)-algebras and show some results about them. For example, they prove that there is no proper \(B\)-algebra \(X\) such that \(|X|
Ameri, R. +4 more
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Isometries Between B ∗ -Algebras
Proceedings of the American Mathematical Society, 1969In recent years, the theory of numerical range, developed in [3], has provided techniques which have considerably simplified the proofs of certain results in the theory of B*-algebras. The following question, posed by G. Lumer at the North British Functional Analysis Seminar held at Edinburgh in April 1968, is, therefore, natural: Can one prove the ...
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Fuzzy Sets and Systems, 2023
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The Unitality of Quantum B-algebras
International Journal of Theoretical Physics, 2018zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Han, Shengwei, Xu, Xiaoting, Qin, Feng
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B*-algebra eigenfunction expansions
Proceedings of the Royal Society of Edinburgh: Section A Mathematics, 1980SynopsisIn this paper the Sturm-Liouville regular boundary value problem and expansion theorem is extended to functions with values in some B*-algebras.
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Soft Computing, 2019
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2014
A ring over the Boolean algebra B1 (which we call B1-algebra), has both combinatorial and algebraic features. A finite module over B1 has naturally a lattice structure. A finite B1-algebra is therefore a lattice with an algebraic structure. We can make use of this property to classify some finite B1-algebras.
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A ring over the Boolean algebra B1 (which we call B1-algebra), has both combinatorial and algebraic features. A finite module over B1 has naturally a lattice structure. A finite B1-algebra is therefore a lattice with an algebraic structure. We can make use of this property to classify some finite B1-algebras.
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Transactions of the American Mathematical Society, 1969
Alexander, F. E., Tomiuk, B. J.
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Alexander, F. E., Tomiuk, B. J.
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Variational algorithms for linear algebra
Science Bulletin, 2021Xiaosi Xu, Jinzhao Sun, Suguru Endo
exaly