CSpace  > 计算数学与科学工程计算研究所
Zhiqiang XU
Source Publicationscienceinchinaseriesamathematics
AbstractIn this paper, an explicit formulation for multivariate truncated power functions of degree one is given firstly. Based on multivariate truncated power functions of degree one, a formulation is presented which counts the number of non-negative integer solutions of s x (s + 1) linear Diophantine equations and it can be considered as a multi-dimensional versions of the formula counting the number of non-negative integer solutions of ax + by = n which is given by Popoviciu in 1953.
Document Type期刊论文
Recommended Citation
GB/T 7714
Zhiqiang XU. multidimensionalversionsofaformulaofpopoviciu[J]. scienceinchinaseriesamathematics,2007,50(2):285.
APA Zhiqiang XU.(2007).multidimensionalversionsofaformulaofpopoviciu.scienceinchinaseriesamathematics,50(2),285.
MLA Zhiqiang XU."multidimensionalversionsofaformulaofpopoviciu".scienceinchinaseriesamathematics 50.2(2007):285.
Files in This Item:
There are no files associated with this item.
Related Services
Recommend this item
Usage statistics
Export to Endnote
Google Scholar
Similar articles in Google Scholar
[Zhiqiang XU]'s Articles
Baidu academic
Similar articles in Baidu academic
[Zhiqiang XU]'s Articles
Bing Scholar
Similar articles in Bing Scholar
[Zhiqiang XU]'s Articles
Terms of Use
No data!
Social Bookmark/Share
All comments (0)
No comment.

Items in the repository are protected by copyright, with all rights reserved, unless otherwise indicated.