Results 51 to 60 of about 43,926 (156)
O-operators on associative algebras and associative Yang–Baxter equations [PDF]
, 2012 An O-operator on an associative algebra is a generalization of a Rota–Baxter operator that plays an important role in the Hopf algebra approach of Connes and Kreimer to the renormalization of quantum field theory.
Bai, Chengming, Guo, Li, Ni, Xiang
core
The impacts of biological invasions
Biological Reviews, Volume 101, Issue 3, Page 1255-1310, June 2026.ABSTRACT The Anthropocene is characterised by a continuous human‐mediated reshuffling of the distributions of species globally. Both intentional and unintentional introductions have resulted in numerous species being translocated beyond their native ranges, often leading to their establishment and subsequent spread – a process referred to as biological
Phillip J. Haubrock +42 more
wiley +1 more source
Solving the Yang-Baxter, tetrahedron and higher simplex equations using Clifford algebras
Nuclear Physics BBethe Ansatz was discovered in 1932. Half a century later its algebraic structure was unearthed: Yang-Baxter equation was discovered, as well as its multidimensional generalizations [tetrahedron equation and d-simplex equations].
Pramod Padmanabhan, Vladimir Korepin
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String backgrounds of the Yang-Baxter deformed AdS 4 × ℂℙ3 superstring
Journal of High Energy Physics, 2021 We build string backgrounds for Yang-Baxter deformations of the AdS4 × ℂℙ3 superstring generated by r-matrices satisfying the classical Yang-Baxter equation.
Laura Rado +2 more
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Eruption Source Parameters in Volcanic Plume Modeling: Advances, Challenges, and Future Directions
Reviews of Geophysics, Volume 64, Issue 2, June 2026.Abstract Accurately predicting the atmospheric dispersion of volcanic ash and gases is crucial for both scientific understanding and hazard mitigation. Estimating Eruption Source Parameters (ESP), such as mass eruption rate, plume height, duration, and particle size distribution and properties, remains challenging due to the complex nature of volcanic ...
A. Costa +4 more
wiley +1 more source
Unitary and entangling solutions to the parametric Yang–Baxter equation in all dimensions
Physics OpenWe present a new class of solutions to the parameter-dependent Yang–Baxter equation across all dimensions, which includes a significant subclass of unitary and entangling solutions.
Arash Pourkia
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Geophysical Research Letters, Volume 53, Issue 9, 16 May 2026.Abstract Interannual variability of the Beaufort Sea (BFS) ice notably affects the oceanic circulation, pelagic and sympagic ecosystems, and navigation activities. However, key physical pathways regulating interseasonal connections between the El Niño‐Southern Oscillation (ENSO) and BFS ice concentration anomalies in early‐summer (May–July) remain ...
Shutao Cao +4 more
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The Strongly Symmetric Elements and Solutions of Yang-Baxter Equation
, 2003 It is shown that all strongly symmetric elements are solutions of constant classical Yang-Baxter equation in Lie algebra, or of quantum Yang-Baxter equation in algebra.
Majid +5 more
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Yang–Baxter deformations of W2,4×T1,1 and the associated T-dual models
Nuclear Physics B, 2017 Recently, for principal chiral models and symmetric coset sigma models, Hoare and Tseytlin proposed an interesting conjecture that the Yang–Baxter deformations with the homogeneous classical Yang–Baxter equation are equivalent to non-abelian T-dualities ...
Jun-ichi Sakamoto, Kentaroh Yoshida
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Midazolam Dosing During CRRT: A Combined Ex Vivo and Physiologically‐Based Pharmacokinetic Approach
CPT: Pharmacometrics &Systems Pharmacology, Volume 15, Issue 5, May 2026.ABSTRACT Children supported with continuous renal replacement therapy have high mortality rates ranging from 30% to 70%. The cause of this high mortality is multifactorial and includes ineffective drug dosing and altered drug pharmacokinetics. Changes in drug exposure can result from (1) underlying disease; and (2) direct drug interaction and/or ...
Autumn M. McKnite +12 more
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