CUTS-GPR performs numerically exact Gaussian process regression with near-linear scaling in training points N and low-order polynomial scaling in dimensions D by exploiting additive kernels on incomplete grids.
A novel self-seeding scheme for hard X- ray FELs
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Generalized quantum Zernike Hamiltonians admit a polynomial Higgs-type algebra yielding a deformed oscillator whose structure function factors, allowing algebraic energy spectra for N=1 to 5 with conjectures for all N.
The paper reviews the use of the imaginary-time correlation function to extract temperature, normalization, and Rayleigh weight from XRTS spectra without model dependence.
citing papers explorer
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Don't Get Your Kroneckers in a Twist: Gaussian Processes on High-Dimensional Incomplete Grids
CUTS-GPR performs numerically exact Gaussian process regression with near-linear scaling in training points N and low-order polynomial scaling in dimensions D by exploiting additive kernels on incomplete grids.
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Generalized quantum Zernike Hamiltonians: Polynomial Higgs-type algebras and algebraic derivation of the spectrum
Generalized quantum Zernike Hamiltonians admit a polynomial Higgs-type algebra yielding a deformed oscillator whose structure function factors, allowing algebraic energy spectra for N=1 to 5 with conjectures for all N.
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Model-free interpretation of X-ray Thomson scattering measurements
The paper reviews the use of the imaginary-time correlation function to extract temperature, normalization, and Rayleigh weight from XRTS spectra without model dependence.