On \(SU(2)\times{\mathcal S}_{n\geq 12}\) dual-group tensorial sets and carrier spaces in the multiple invariant physics of multiquantum NMR. II: \(\{{\mathcal S}_{12}\supset\cdots\supset [2]{\mathcal S}_{2}\}\) pathways from Yamanouchi monomial reduction
DOI10.1023/A:1019187306973zbMath1039.81527OpenAlexW2913326770MaRDI QIDQ5928776
Publication date: 3 April 2001
Published in: Journal of Mathematical Chemistry (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1023/a:1019187306973
Symmetric functions and generalizations (05E05) Representations of finite symmetric groups (20C30) Finite-dimensional groups and algebras motivated by physics and their representations (81R05)
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- \(n\)-body democratic recoupling and role of Schur \(Fn\). products on \(S_n\), a NMR dual-group view pertinent to coherence-transfer
- A duality consistent phase convention for complex conjugation in SUn
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- Symmetrical Coupling of Three Angular Momenta
- Construction of Orthonormal Angular-Momentum Operators
- The symmetric group: Characters, products and plethysms
- On SU\((2)\times{\mathcal S}_{n\geq 12}\) dual-group tensorial sets and carrier spaces in the multiple invariant physics of multiquantum NMR. I: \(k>n/2\) rank maximal \(\left\{\sum_v T^k(v)\rightarrow \sum_{\widetilde\lambda'} \Lambda_{\cdot,\widetilde\lambda'} [\widetilde\lambda'\right\}\) Liouvillian \(\widetilde{\mathbf U}\times {\mathcal P}\) mappings]
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