Cerinšek, M. & Batagelj, V.
(2015):
Network analysis of Zentralblatt MATH data.
In: Scientometrics,
Ausgabe/Number: 1,
Vol. 102,
Verlag/Publisher: Springer Netherlands.
Erscheinungsjahr/Year: 2015.
Seiten/Pages: 977-1001.
[Volltext] [Kurzfassung] [BibTeX]
[Endnote]
We analyze the data about works (papers, books) from the time period 1990–2010 that are collected in Zentralblatt MATH database. The data were converted into four 2-mode networks (works
@article{cerinek2015network,
author = {Cerinšek, Monika and Batagelj, Vladimir},
title = {Network analysis of Zentralblatt MATH data},
journal = {Scientometrics},
publisher = {Springer Netherlands},
year = {2015},
volume = {102},
number = {1},
pages = {977-1001},
url = {http://dx.doi.org/10.1007/s11192-014-1419-z},
doi = {10.1007/s11192-014-1419-z},
issn = {0138-9130},
keywords = {analysis, bibliometrics, citation, coauthor, math, scientometrics, zentralblatt},
abstract = {We analyze the data about works (papers, books) from the time period 1990–2010 that are collected in Zentralblatt MATH database. The data were converted into four 2-mode networks (works }
}
%0 = article
%A = Cerinšek, Monika and Batagelj, Vladimir
%D = 2015
%I = Springer Netherlands
%T = Network analysis of Zentralblatt MATH data
%U = http://dx.doi.org/10.1007/s11192-014-1419-z
Golub, G. H. & Loan, C. F. V. (Hrsg.)
(1996):
Matrix Computations.
3rd. Aufl./Vol..
Erscheinungsjahr/Year: 1996.
Verlag/Publisher: The Johns Hopkins University Press,
[BibTeX]
[Endnote]
@book{Golub1996,
author = {Golub, Gene H. and Loan, Charles F. Van},
title = {Matrix Computations},
publisher = {The Johns Hopkins University Press},
year = {1996},
edition = {3rd},
keywords = {analysis, computations, math, matrix}
}
%0 = book
%A = Golub, Gene H. and Loan, Charles F. Van
%D = 1996
%I = The Johns Hopkins University Press
%T = Matrix Computations
Erné, M.
(1993):
Distributive laws for concept lattices.
In: Algebra Universalis,
Vol. 30,
Verlag/Publisher: Birkhäuser Basel.
Erscheinungsjahr/Year: 1993.
Seiten/Pages: 538-580.
[Volltext] [Kurzfassung] [BibTeX]
[Endnote]
We study several kinds of distributivity for concept lattices of contexts. In particular, we find necessary and sufficient conditions for a concept lattice to be(1)distributive,(2)a frame (locale, complete Heyting algebra),(3)isomorphic to a topology,(4)completely distributive,(5)superalgebraic (i.e., algebraic and completely distributive).
@article{erne1993distributive,
author = {Erné, Marcel},
title = {Distributive laws for concept lattices},
journal = {Algebra Universalis},
publisher = {Birkhäuser Basel},
year = {1993},
volume = {30},
pages = {538-580},
url = {http://dx.doi.org/10.1007/BF01195382},
doi = {10.1007/BF01195382},
issn = {0002-5240},
keywords = {complete, concept, distributive, distributivity, fba, fca, lattice, math, theory},
abstract = {We study several kinds of distributivity for concept lattices of contexts. In particular, we find necessary and sufficient conditions for a concept lattice to be(1)distributive,(2)a frame (locale, complete Heyting algebra),(3)isomorphic to a topology,(4)completely distributive,(5)superalgebraic (i.e., algebraic and completely distributive).}
}
%0 = article
%A = Erné, Marcel
%D = 1993
%I = Birkhäuser Basel
%T = Distributive laws for concept lattices
%U = http://dx.doi.org/10.1007/BF01195382