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Karatsuba Algorithm Revisited for 2D Convolution Computation Optimization. [PDF]
Entropy (Basel)Wang Q +6 more
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Real-time peach detection method in complex environments based on improved YOLOv8 and multi-attention fusion. [PDF]
Front Plant SciYou S, Li J, Yao L, Yan C, Wu Z.
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Toxic chinese herbal medicine recognition in real-world images via multi-scale and attention-enhanced EfficientNetV2. [PDF]
PLoS OneZhu G, Joo J, Park S, Kim SC.
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A Post-Quantum Authentication and Key Agreement Protocol Based on Lattice-Based KEM for Secure Network Environments. [PDF]
Entropy (Basel)Chen X, Wu W, Liang G, Tan H, Yu Y.
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Communications in Algebra, 2020 In this article, we introduce S-multiplication modules which are a generalization of multiplication modules. Let M be an R-module and S⊆R a multiplicatively closed subset.
D. D. Anderson +3 more
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On finitely generated multiplication modules [PDF]
Czechoslovak Mathematical Journal, 2005 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
R. Nekooei, Nekooei, R.
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Weak Multiplication Modules [PDF]
Czechoslovak Mathematical Journal, 2003 summary:In this paper we characterize weak multiplication ...
A Azizi
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Epigenetic Multiple Modulators
Current Topics in Medicinal Chemistry, 2011The development of ligands that as single chemical entities are able to modulate multiple epigenetic targets simultaneously (designed epigenetic multiple ligands) is still in its infancy. We are witnessing some advances with combinations of the fused or linked pharmacophores of an epi-drug and other anticancer agents.
Alvarez R +3 more
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Journal of Mathematical Sciences, 2004
Let \(A\) be an associative ring with identity. A right \(A\)-module \(M\) is called a multiplication module if for every submodule \(N\) of \(M\) there exists an ideal \(B\) of \(A\) such that \(N=MB\). There are many works containing results on multiplication modules over commutative rings.
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Let \(A\) be an associative ring with identity. A right \(A\)-module \(M\) is called a multiplication module if for every submodule \(N\) of \(M\) there exists an ideal \(B\) of \(A\) such that \(N=MB\). There are many works containing results on multiplication modules over commutative rings.
openaire +2 more sources