Results 61 to 70 of about 9,075 (140)
Reconstructing Binary Signals from Local Histograms. [PDF]
Entropy (Basel), 2022 Sporring J, Darkner S.
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Dynamical Simulations of Carotenoid Photoexcited States Using Density Matrix Renormalization Group Techniques. [PDF]
J Phys Chem A, 2023 Manawadu D, Valentine DJ, Barford W.
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Entropy Pair Functional Theory: Direct Entropy Evaluation Spanning Phase Transitions. [PDF]
Entropy (Basel), 2021 Nicholson DM +4 more
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Raising and lowering maps for tridiagonal pairs
Let $V$ denote a nonzero finite-dimensional vector space. A tridiagonal pair on $V$ is an ordered pair $A, A^*$ of maps in ${\rm End}(V)$ such that (i) each of $A, A^*$ is diagonalizable; (ii) there exists an ordering $\lbrace V_i \rbrace_{i=0}^d$ of the eigenspaces of $A$ such that $A^* V_i \subseteq V_{i-1} + V_i + V_{i+1}$ $(0 \leq i \leq d)$, where
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Change of basis for the tridiagonal pairs of type II
19 ...
Crampe, Nicolas +2 more
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Tridiagonal pairs of Krawtchouk type
Tridiagonal pairs of Krawtchouk typeLet F denote an algebraically closed field with characteristic 0 and let V denote a vector space over F with finite positive dimension. Let A, A* denote a tridiagonal pair on V with diameter d. We say that A, A* has Krawtchouk type whenever the sequence {d - 2 i}i = 0d is a standard ordering of the eigenvalues of A and a standard ordering of the ...
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Some $q$-exponential formulas involving the double lowering operator $��$ for a tridiagonal pair
, 2019 25 pages.
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Hearing the shape of a drum for light: isospectrality in photonics. [PDF]
Nanophotonics, 2022 Park S, Lee I, Kim J, Park N, Yu S.
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Absolute Binding Free Energy Calculations for Buried Water Molecules. [PDF]
J Chem Theory Comput, 2022 Ge Y, Baumann HM, Mobley DL.
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MEMS Electrostatically Driven Coupled Beam Filter Banks. [PDF]
Micromachines (Basel), 2023 Syms R, Bouchaala A.
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