Self-similarity versus self-affinity: the Sierpinski gasket revisited

The eccentric distance sum is concerned with complex networks. To obtain the asymptotic formula of eccentric distance sum on growing Sierpiński networks, we study some nonlinear integral in terms of self-similar measure on the Sierpiński gasket and use the self-similarity of distance and measure to obtain the exact value of this integral.

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COMB GRAPHS AND SPECTRAL DECIMATION

Glasgow Mathematical Journal ◽

10.1017/s0017089508004540 ◽

2009 ◽

Vol 51 (1) ◽

pp. 71-81 ◽

Cited By ~ 2

Author(s):

JONATHAN JORDAN

Keyword(s):

Adjacency Matrix ◽

Spectral Properties ◽

Sierpinski Gasket ◽

Self Similarity ◽

Sierpiński Gasket ◽

Spectral Similarity ◽

Similarity Relationship ◽

Adjacency Matrices ◽

Similarity Operators ◽

Math Phys

AbstractWe investigate the spectral properties of matrices associated with comb graphs. We show that the adjacency matrices and adjacency matrix Laplacians of the sequences of graphs show a spectral similarity relationship in the sense of work by L. Malozemov and A. Teplyaev (Self-similarity, operators and dynamics,Math. Phys. Anal. Geometry6(2003), 201–218), and hence these sequences of graphs show a spectral decimation property similar to that of the Laplacians of the Sierpiński gasket graph and other fractal graphs.

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From 1 → 3 dendritic designs to fractal supramacromolecular constructs: understanding the pathway to the Sierpiński gasket

Chemical Society Reviews ◽

10.1039/c4cs00234b ◽

2015 ◽

Vol 44 (12) ◽

pp. 3954-3967 ◽

Cited By ~ 104

Author(s):

George R. Newkome ◽

Charles N. Moorefield

Keyword(s):

Self Assembly ◽

Sierpinski Gasket ◽

Building Blocks ◽

The Self ◽

Self Similarity ◽

Sierpiński Gasket

The potential to incorporate dendritic characteristics, such as self-similarity into new fractal-based materials is exemplified in the self-assembly of novel, polyterpyridine-based, building blocks.

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SPECTRA OF SELF-SIMILAR LAPLACIANS ON THE SIERPINSKI GASKET WITH TWISTS

Fractals ◽

10.1142/s0218348x08003818 ◽

2008 ◽

Vol 16 (01) ◽

pp. 43-68 ◽

Cited By ~ 4

Author(s):

ANNA BLASIAK ◽

ROBERT S. STRICHARTZ ◽

BARIS EVREN UGURCAN

Keyword(s):

Sierpinski Gasket ◽

Outer Approximation ◽

Invariant Set ◽

Self Similarity ◽

Sierpiński Gasket ◽

Constant Multiple ◽

Self Similar ◽

Definition Of ◽

Two Parameter ◽

Present Experimental Evidence

We study the spectra of a two-parameter family of self-similar Laplacians on the Sierpinski gasket (SG) with twists. By this we mean that instead of the usual IFS that yields SG as its invariant set, we compose each mapping with a reflection to obtain a new IFS that still has SG as its invariant set, but changes the definition of self-similarity. Using recent results of Cucuringu and Strichartz, we are able to approximate the spectra of these Laplacians by two different methods. To each Laplacian we associate a self-similar embedding of SG into the plane, and we present experimental evidence that the method of outer approximation, recently introduced by Berry, Goff and Strichartz, when applied to this embedding, yields the spectrum of the Laplacian (up to a constant multiple).

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