Interpolating Hydrologic Data Using Laplace Formulation

Xu, Tian‐Le; Merwade, Venkatesh; Wang, Zhiquan

doi:10.3390/rs15153844

Cited by 2 publications

(1 citation statement)

References 63 publications

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“…Commonly used interpolation methods for SST include Kriging, inverse distance weighting, spline interpolation, and Lagrange interpolation, which generally fulfill most requirements. Yet, under extremely sparse sample conditions, their accuracy significantly diminishes [4][5][6]. For modern neural networks, larger datasets often enhance model performance and generalization capabilities.…”

Section: Introductionmentioning

confidence: 99%

Interpolation of China’s Nearshore Sea Surface Temperature Based on Information Diffusion with Small Sample Sizes

Wang,

Shi,

et al. 2024

J. Phys.: Conf. Ser.

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Addressing the issue of data sparsity and gaps caused by missing values, this study employs an information diffusion approach to effectively spread information from sparse sample points to monitoring locations. By thoroughly extracting insights from a limited dataset, it achieves more precise interpolation outcomes. To validate the superiority of the information diffusion interpolation technique under conditions of sparse samples, we utilize sea surface temperature (SST) data from the offshore waters of China as a case study. We compare three interpolation methods: Kriging, Gaussian information diffusion, and asymmetric information diffusion. The calculations and comparisons of interpolation results are conducted across varying sample sizes. The findings indicate that in situations with relatively sparse samples, asymmetric information diffusion yields the most favorable results, with Kriging and Gaussian diffusion exhibiting comparable performance. In cases of extremely sparse samples, asymmetric information diffusion yields the lowest interpolation error, followed by Gaussian diffusion, while Kriging performs the least effectively. Thus, when confronted with sample sparsity, the application of the information diffusion interpolation method can yield notably improved results.

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Section: Introductionmentioning

confidence: 99%

Interpolation of China’s Nearshore Sea Surface Temperature Based on Information Diffusion with Small Sample Sizes

Wang,

Shi,

et al. 2024

J. Phys.: Conf. Ser.

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An analytical calculation method of SiC MOSFET junction temperature based on thermal network theory and Laplace transform

Wang,

Qiu,

Zhang

2024

IET Power Electronics

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In order for full utilization of the switching devices and safe continued operation of the power converter at the same time, the junction temperature of the switching devices needs to be accurately monitored without shutting down the motor drive. This paper derives an analytical junction temperature calculation method by using Laplace transformation and thermal network theory. Based on an actual motor drive, a simulation model is established using platform for power electronic systems (PLECS). Through comparison, the derived method is proven to be able to calculate junction temperature accurately.

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Interpolating Hydrologic Data Using Laplace Formulation

Cited by 2 publications

References 63 publications

Interpolation of China’s Nearshore Sea Surface Temperature Based on Information Diffusion with Small Sample Sizes

Interpolation of China’s Nearshore Sea Surface Temperature Based on Information Diffusion with Small Sample Sizes

An analytical calculation method of SiC MOSFET junction temperature based on thermal network theory and Laplace transform

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