Skip to search form
Skip to main content
Skip to account menu
Semantic Scholar
Semantic Scholar's Logo
Search 228,399,327 papers from all fields of science
Search
Sign In
Create Free Account
Sierpinski triangle
Known as:
Sierpinski gasket
, Serpinski gasket
, Serpinski triangle
Expand
The Sierpinski triangle (also with the original orthography Sierpiński), also called the Sierpinski gasket or the Sierpinski Sieve, is a fractal and…
Expand
Wikipedia
(opens in a new tab)
Create Alert
Alert
Related topics
Related topics
38 relations
Apollonian gasket
Apollonian network
Barnsley fern
Binary number
Expand
Papers overview
Semantic Scholar uses AI to extract papers important to this topic.
2010
2010
CPW-Fed compact multiband Sierpinski triangle antenna
Y. Choukiker
,
S. K. Behera
IEEE India Conference
2010
Corpus ID: 12841108
A small size and multiband behavior in the shape of Sierpinski triangle fractal is presented in this paper. The model is applied…
Expand
2010
2010
A Novel Small-Size Single Patch Microstrip Antenna Based on Koch and Sierpinski Fractal-Shapes
Zhong-wu Yu
,
Guang-Ming Wang
,
Xiangjun Gao
,
K. Lu
2010
Corpus ID: 15726973
A novel fractal structure using Koch and Sierpinski fractal- shapes is proposed. By inserting the Sierpinski carpets into the…
Expand
2009
2009
Contiguous Search Problem in Sierpiński Graphs
F. Luccio
Theory of Computing Systems
2009
Corpus ID: 1947497
In this paper we consider the problem of capturing an intruder in a particular fractal graph, the Sierpiński graph SGn. The…
Expand
2009
2009
Multiband Sierpinski fractal antenna
M. Waqas
,
Z. Ahmed
,
M. Ihsan
ACM/SIGCOMM Internet Measurement Conference
2009
Corpus ID: 29029408
A fractal monopole antenna based on the Sierpinski gasket is studied in this paper. The monopole antenna based on the Sierpinski…
Expand
2008
2008
VIBRATION SPECTRA OF FINITELY RAMIFIED, SYMMETRIC FRACTALS
N. Bajorin
,
T. Chen
,
+6 authors
A. Teplyaev
2008
Corpus ID: 121919733
We show how to calculate the spectrum of the Laplacian operator on fully symmetric, finitely ramified fractals. We consider well…
Expand
2006
2006
Fractal Monopole Antenna for Dual-ISM-Bands Applications
W. J. Krzysztofik
European Microwave Conference
2006
Corpus ID: 12784323
In this paper a fractal antenna, namely the modified Sierpinski gasket monopole is presented that possesses a small physical size…
Expand
2005
2005
Symbolic dynamics for a Sierpinski curve Julia set
R. Devaney
,
Daniel M. Look
2005
Corpus ID: 37482951
In this paper we investigate the dynamics of certain rational functions on their Julia sets. We pay particular attention to the…
Expand
2001
2001
Piecewise Linear Bases and Besov Spaces on Fractal Sets
A. Jonsson
,
A. Kamont
2001
Corpus ID: 117937143
For a class of closed sets F ⊂ Rn admitting a regular sequence of triangulations or generalized triangulations, the analogues on…
Expand
2000
2000
On the asymptotics of the eigenvalue counting function for random recursive Sierpinski gaskets
B. Hambly
2000
Corpus ID: 56016898
Abstract. We consider natural Laplace operators on random recursive affine nested fractals based on the Sierpinski gasket and…
Expand
1985
1985
Probability densities for the displacement of random walks on percolation clusters
S. Havlin
,
D. Movshovitz
,
B. Trus
,
G. Weiss
1985
Corpus ID: 121149051
The probability density of the displacement or end-to-end distance of a random walk on the incipient infinite percolation cluster…
Expand
By clicking accept or continuing to use the site, you agree to the terms outlined in our
Privacy Policy
(opens in a new tab)
,
Terms of Service
(opens in a new tab)
, and
Dataset License
(opens in a new tab)
ACCEPT & CONTINUE