Progress in Mathematics
Review of chains and cochains
Publication
, Chapter
Getz, J; Goresky, M
January 1, 2012
Recall (e.g.,[Hud ]) that a closed convex linear cell is the convex hull of finitely many points in Euclidean space. A convex linear cell complex K is a finite collection of closed convex linear cells in some ℝN such that if σ ∈ K then every face of σ is in K, and if σ, τ ∈ K then the intersection σ ∩ τ is in K.
Duke Scholars
DOI
Publication Date
January 1, 2012
Volume
298
Start / End Page
21 / 28
Citation
APA
Chicago
ICMJE
MLA
NLM
Getz, J., & Goresky, M. (2012). Review of chains and cochains. In Progress in Mathematics (Vol. 298, pp. 21–28). https://doi.org/10.1007/978-3-0348-0351-9_2
Getz, J., and M. Goresky. “Review of chains and cochains.” In Progress in Mathematics, 298:21–28, 2012. https://doi.org/10.1007/978-3-0348-0351-9_2.
Getz J, Goresky M. Review of chains and cochains. In: Progress in Mathematics. 2012. p. 21–8.
Getz, J., and M. Goresky. “Review of chains and cochains.” Progress in Mathematics, vol. 298, 2012, pp. 21–28. Scopus, doi:10.1007/978-3-0348-0351-9_2.
Getz J, Goresky M. Review of chains and cochains. Progress in Mathematics. 2012. p. 21–28.
DOI
Publication Date
January 1, 2012
Volume
298
Start / End Page
21 / 28