E-LIB Suche - Ergebnisse für: Boyd, John P

1

Using parity to accelerate Hermite function computations: Z..:

Boyd, John P.
Mathematics and Computers in Simulation. 207 (2023) - p. 521-532 , 2023

Link: https://doi.org/10.1016/..

2

The heterogeneous helicoseir:

Amore, Paolo ; Boyd, John P. ; Márquez, Abigail
Physica D: Nonlinear Phenomena. 446 (2023) - p. 133669 , 2023

Link: https://doi.org/10.1016/..

3

Exact solutions to a nonlinear partial differential equatio..:

Zhang, Xiaolong ; Boyd, John P.
Journal of Computational and Applied Mathematics. 406 (2022) - p. 113866 , 2022

Link: https://doi.org/10.1016/..

4

Asymptotic coefficients and errors for Chebyshev polynomial..:

Zhang, Xiaolong ; Boyd, John P.
Science China Mathematics. 66 (2022) 1 - p. 191-220 , 2022

Link: https://doi.org/10.1007/..

5

Optimal Truncations for Multivariate Fourier and Chebyshev ..:

Zhang, Xiaolong ; Boyd, John P.
Journal of Scientific Computing. 82 (2020) 2 - p. , 2020

Link: https://doi.org/10.1007/..

6

When integration sparsification fails: Banded Galerkin disc..:

Huang, Zhu ; Boyd, John P.
Mathematics and Computers in Simulation. 160 (2019) - p. 82-102 , 2019

Link: https://doi.org/10.1016/..

7

Isospectral heterogeneous domains: A numerical study:

Amore, Paolo ; Boyd, John P. ; Tene Sandoval, Natalia
Journal of Computational Physics: X. 1 (2019) - p. 100018 , 2019

Link: https://doi.org/10.1016/..

8

Miracles, misconceptions and scotomas in the theory of soli..:

Boyd, John P.
Geophysical & Astrophysical Fluid Dynamics. 113 (2019) 5-6 - p. 623-666 , 2019

Link: https://doi.org/10.1080/..

9

Revisiting the Thomas–Fermi equation: Accelerating rational..:

Zhang, Xiaolong ; Boyd, John P.
Applied Numerical Mathematics. 135 (2019) - p. 186-205 , 2019

Link: https://doi.org/10.1016/..

10

Revisiting the Charney Baroclinic Instability Problem and P..:

Boyd, John P.
Mathematics of Climate and Weather Forecasting. 4 (2018) 1 - p. 79-103 , 2018

Link: https://doi.org/10.1515/..

11

A New Constructive and Elementary Proof of a Bernstein–Wals..:

Boyd, John P.
Vietnam Journal of Mathematics. 47 (2018) 2 - p. 269-286 , 2018

Link: https://doi.org/10.1007/..

12

Spectral algorithms for multiple scale localized eigenfunct..:

Boyd, John P. ; Amore, Paolo ; Fernández, Francisco M.
Computer Physics Communications. 224 (2018) - p. 209-221 , 2018

Link: https://doi.org/10.1016/..

13

Five ways to solve the Yoshida jet problem of wind-driven e..:

Boyd, John P.
Dynamics of Atmospheres and Oceans. 83 (2018) - p. 1-16 , 2018

Link: https://doi.org/10.1016/..

14

BOUND STATES IN WEAKLY DEFORMED WAVEGUIDES: NUMERICAL VERSU..:

AMORE, PAOLO ; BOYD, JOHN P. ; FERNÁNDEZ, FRANCISCO M...
The ANZIAM Journal. 59 (2017) 2 - p. 200-214 , 2017

Link: https://doi.org/10.1017/..

15

The Crane equation uuxx=−2: The general explicit solution a..:

Boyd, John P.
Applied Mathematics and Computation. 301 (2017) - p. 214-223 , 2017

Link: https://doi.org/10.1016/..