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Principal quasi-ideals of cohomological dimension 1.
2019The principal quasi-ideal generated by an element \(w\) of the semigroup \(S\) is the set \(\langle w\rangle_q=S^1w\cap wS^1\). The cohomological dimension of the semigroup \(S\) is the smallest integer \(n\) such that for any \(S\)-module \(A\) and \(k>n\) the \(k\)-th cohomology group \(H^k(S,A)\) is trivial.
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A Novel Four-Terminal Ferroelectric Tunnel FET for Quasi-Ideal Switch
IEEE transactions on nanotechnology, 2015Mirgender Kumar, S. Jit
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Flow cells as quasi-ideal systems for biofouling simulation of industrial piping systems
Biofouling (Print), 2013J. Teodósio +6 more
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Quasi-Ideals of Lie Algebras I
Proceedings of the London Mathematical Society, 1976openaire +2 more sources
Determination of the “Quasi-Ideal Reverberation Chamber Minimal Frequency” according to loading
IEEE International Symposium on Electromagnetic Compatibility, 2013A. Adardour, G. Andrieu, A. Reineix
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QUASI IDEALS IN TERNARY PARTIAL SEMIRINGS
Advances in Mathematics: Scientific Journal, 2020openaire +1 more source
IEEE transactions on microwave theory and techniques, 2011
S. Gruszczynski, K. Wincza
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S. Gruszczynski, K. Wincza
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Minimal quasi-ideals of some matrix rings
Let R be a ring. An additive subgroup Q of a ring R is said to be a quasi-ideal of R if RQ intersection QR Q. For a R, let (a)q denote the quasi-ideal of R generated by a. A quasi-ideal Q of R is said to be minimal if Q is not equal to {0} and Q does not properly contain any nonzero quasi-ideal of R. Therefore if Q is a minimal quasi-ideal of R, then Qopenaire +1 more source
Design of 2.92-mm Coaxial Adiabatic Lines for Quasi-Ideal Twin Microcalorimeter
IEEE Transactions on Instrumentation and Measurement, 2012E. Vremera, L. Brunetti
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