Fungsi kontinu (Indonesian Wikipedia)

Analysis of information sources in references of the Wikipedia article "Fungsi kontinu" in Indonesian language version.

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archive.org

Gierz, G.; Hofmann, K. H.; Keimel, K.; Lawson, J. D.; Mislove, M. W.; Scott, D. S. (2003). Continuous Lattices and Domains. Encyclopedia of Mathematics and its Applications. 93. Cambridge University Press. ISBN 0521803381.

books.google.com

Searcóid, Mícheál Ó (2006), Ruang metrik, Springer undergraduate mathematics series, Berlin, New York: Springer-Verlag, ISBN 978-1-84628-369-7, diarsipkan dari versi asli tanggal 2023-07-26, diakses tanggal 2020-09-04 , bagian 9.4

doi.org

Dugac, Pierre (1973), "Eléments d'Analyse de Karl Weierstrass", Arsip untuk Sejarah Ilmu Tepat, 10: 41–176, doi:10.1007/bf00343406
Harper, J.F. (2016), "Mendefinisikan kesinambungan fungsi nyata dari variabel nyata", BSHM Bulletin: Journal of the British Society for the History of Mathematics: 1–16, doi:10.1080/17498430.2015.1116053
Rusnock, P.; Kerr-Lawson, A. (2005), "Bolzano dan keseragaman kontinuitas", Historia Mathematica, 32 (3): 303–311, doi:10.1016/j.hm.2004.11.003
Flagg, R. C. (1997). "Quantales and continuity spaces". Algebra Universalis. 37 (3): 257–276. CiteSeerX 10.1.1.48.851 . doi:10.1007/s000120050018.
Kopperman, R. (1988). "All topologies come from generalized metrics". American Mathematical Monthly. 95 (2): 89–97. doi:10.2307/2323060. JSTOR 2323060.
Flagg, B.; Kopperman, R. (1997). "Continuity spaces: Reconciling domains and metric spaces". Theoretical Computer Science. 177 (1): 111–138. doi:10.1016/S0304-3975(97)00236-3 .

jstor.org

Kopperman, R. (1988). "All topologies come from generalized metrics". American Mathematical Monthly. 95 (2): 89–97. doi:10.2307/2323060. JSTOR 2323060.

kemdikbud.go.id

bahasasastra.kemdikbud.go.id

"Discontinuity". Glosarium - Pusat Bahasa Departemen Pendidikan Nasional Republik Indonesia. Diarsipkan dari versi asli tanggal 2023-06-13. Diakses tanggal 2022-03-12.
"Removeable discontinuity". Glosarium - Pusat Bahasa Departemen Pendidikan Republik Indonesia. Diarsipkan dari versi asli tanggal 2023-06-13. Diakses tanggal 2022-03-14.

mit.edu

math.mit.edu

Speck, Jared (2014). "Continuity and Discontinuity" (PDF). MIT Math. hlm. 3. Diarsipkan dari versi asli (PDF) tanggal 2016-10-06. Diakses tanggal 2016-09-02. Example 5. The function $1/x$ is continuous on $(0,\infty )$ and on $(-\infty ,0),$ i.e., for $x>0$ and for $x<0,$ in other words, at every point in its domain. However, it is not a continuous function since its domain is not an interval. It has a single point of discontinuity, namely $x=0,$ and it has an infinite discontinuity there.

psu.edu

citeseerx.ist.psu.edu

Flagg, R. C. (1997). "Quantales and continuity spaces". Algebra Universalis. 37 (3): 257–276. CiteSeerX 10.1.1.48.851 . doi:10.1007/s000120050018.

web.archive.org

Speck, Jared (2014). "Continuity and Discontinuity" (PDF). MIT Math. hlm. 3. Diarsipkan dari versi asli (PDF) tanggal 2016-10-06. Diakses tanggal 2016-09-02. Example 5. The function $1/x$ is continuous on $(0,\infty )$ and on $(-\infty ,0),$ i.e., for $x>0$ and for $x<0,$ in other words, at every point in its domain. However, it is not a continuous function since its domain is not an interval. It has a single point of discontinuity, namely $x=0,$ and it has an infinite discontinuity there.
"Discontinuity". Glosarium - Pusat Bahasa Departemen Pendidikan Nasional Republik Indonesia. Diarsipkan dari versi asli tanggal 2023-06-13. Diakses tanggal 2022-03-12.
"Removeable discontinuity". Glosarium - Pusat Bahasa Departemen Pendidikan Republik Indonesia. Diarsipkan dari versi asli tanggal 2023-06-13. Diakses tanggal 2022-03-14.
Searcóid, Mícheál Ó (2006), Ruang metrik, Springer undergraduate mathematics series, Berlin, New York: Springer-Verlag, ISBN 978-1-84628-369-7, diarsipkan dari versi asli tanggal 2023-07-26, diakses tanggal 2020-09-04 , bagian 9.4