Integral approximants
Computer Physics Communications, ISSN: 0010-4655
1997
- 169Usage
Metric Options: CountsSelecting the 1-year or 3-year option will change the metrics count to percentiles, illustrating how an article or review compares to other articles or reviews within the selected time period in the same journal. Selecting the 1-year option compares the metrics against other articles/reviews that were also published in the same calendar year. Selecting the 3-year option compares the metrics against other articles/reviews that were also published in the same calendar year plus the two years prior.
Example: if you select the 1-year option for an article published in 2019 and a metric category shows 90%, that means that the article or review is performing better than 90% of the other articles/reviews published in that journal in 2019. If you select the 3-year option for the same article published in 2019 and the metric category shows 90%, that means that the article or review is performing better than 90% of the other articles/reviews published in that journal in 2019, 2018 and 2017.
Citation Benchmarking is provided by Scopus and SciVal and is different from the metrics context provided by PlumX Metrics.
Example: if you select the 1-year option for an article published in 2019 and a metric category shows 90%, that means that the article or review is performing better than 90% of the other articles/reviews published in that journal in 2019. If you select the 3-year option for the same article published in 2019 and the metric category shows 90%, that means that the article or review is performing better than 90% of the other articles/reviews published in that journal in 2019, 2018 and 2017.
Citation Benchmarking is provided by Scopus and SciVal and is different from the metrics context provided by PlumX Metrics.
Metrics Details
- Usage169
- Views160
- Downloads9
Dataset Description
Abstract The approximation problem for multivalued functions on the complex plane is discussed. A sub-class of Hermite-Padé approximants is defined and the supporting theory is developed, inspired by the Riemann monodromy theorem. It is plausibly shown that the method can resolve confluent singularities. The application of the method tested on realistic series gives promises for the method. Title of program: IA Catalogue Id: ADEH_v1_0 Nature of problem We present a novel method of approximating multivalued functions on multiple Riemann sheets, defined by a finite number of coeficients in a power series expansion. The application of the method on realistic series gives promises for the method. The Fortran program is described in some details. Versions of this program held in the CPC repository in Mendeley Data ADEH_v1_0; IA; 10.1016/S0010-4655(96)00111-7 This program has been imported from the CPC Program Library held at Queen's University Belfast (1969-2019)
Bibliographic Details
Provide Feedback
Have ideas for a new metric? Would you like to see something else here?Let us know