DocumentCode
646640
Title
Novel algebras for advanced analytics in Julia
Author
Shah, Vivek B. ; Edelman, A. ; Karpinski, Stefan ; Bezanson, Jeff ; Kepner, Jeremy
fYear
2013
fDate
10-12 Sept. 2013
Firstpage
1
Lastpage
4
Abstract
A linear algebraic approach to graph algorithms that exploits the sparse adjacency matrix representation of graphs can provide a variety of benefits. These benefits include syntactic simplicity, easier implementation, and higher performance. One way to employ linear algebra techniques for graph algorithms is to use a broader definition of matrix and vector multiplication. We demonstrate through the use of the Julia language system how easy it is to explore semirings using linear algebraic methodologies.
Keywords
high level languages; linear algebra; mathematics computing; Julia; Julia language system; advanced analytics; graph algorithms; high level languages; linear algebra techniques; linear algebraic approach; linear algebraic methodologies; matrix multiplication; novel algebras; sparse adjacency matrix representation; vector multiplication; Electronic mail; Matrices; Sparse matrices; Standards; Syntactics;
fLanguage
English
Publisher
ieee
Conference_Titel
High Performance Extreme Computing Conference (HPEC), 2013 IEEE
Conference_Location
Waltham, MA
Print_ISBN
978-1-4799-1364-0
Type
conf
DOI
10.1109/HPEC.2013.6670347
Filename
6670347
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