Talk:Menger sponge

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This math block:

${\displaystyle M_{n+1}:=\left\{(x,y,z)\in \mathbb {R} :\exists i,j,k\in \{0,1,2\}:((3x-i,3y-j,3z-k)\in M_{n}){\mbox{ and at most one of }}i,j,k{\mbox{ is equal to 1}}\right\}}$

is too wide to fit on mid to small size screens (1024px or smaller). Could someone familiar with the notation find a good way to break it into two or more lines?

I'd suggest breaking it at the colon (before the 3x-i part) though I can't figure out how to get that to work. That's the point where it switches from describing the set it's a part of to giving the formula (basically). 68.47.64.155

[[Image:Gasket14.png|thumb|3D [[Sierpinski carpet]]]] I was editing the page Cantor dust, (adding a image of the 3D version of the set). There I found, the text talks about a 3D version of the Cantor dust and names it "the Menger sponge". But this page shows a 3D Sierpinski carpet. The images to the right shows the difference. Does anybody what's correct? // Solkoll 22:59, 29 Dec 2004 (UTC)

Both are correct, just different generalizations of the Cantor set in three dimensions. Both the Cantor dust and Menger sponge have the Cantor set within them, but also space around the Cantor set that is not directly described by the set. This space around the set is described by extending the set into multidimensions, but there are multiple ways to interpret the pattern of the Cantor set, as it does not directly define its construction in more dimensions. Pengwy 02:33, 22 May 2006 (UTC)[reply]

It might be good to explain why this is a "sponge" and not a cube or something else. ====It has huge surface area comparing to its volume or something - I imagine, if someone made such sponge from micrometer or tinier cubes it would be great absorber :p 95.160.157.52 (talk) 21:53, 18 January 2017 (UTC)[reply]

I mentioned this at Lebesgue covering dimension too, "any object of Lebesgue covering dimension one" doesn't embed in the Menger sponge if "object" means "topological space". I think the right version needs "compact" and "metrizable". I'm going to put a "disputed" note but the article is misleadingA Geek Tragedy 15:06, 11 February 2007 (UTC)[reply]

In case anyone cares, there is a 2006 Taiwanese film called Silk that uses the Menger Sponge as a plot device. The scientist in the film uses the menger Sponge construction to try and come up with an Anti-Gracity device but winds up instead capturing a form of energy we would call a ghost. There's a fair amount of visual representation of the sponge. Neat film but it's a horror film with science fiction overtones. It's IMDB entry is here:

GUISI - Lisapollison 07:22, 27 February 2007 (UTC)[reply]

I do not understand the relevance of the "sum" column, where the total numbers of different size cubes in all steps up to the present one is summed. I'd like someone to explain the reason for it; else, I'm minded to remove it. JoergenB (talk) 15:59, 1 January 2008 (UTC)[reply]

yea i dont get that either 84.216.44.247 (talk) 17:29, 25 November 2008 (UTC)[reply]

User:Michael C Price has twice replaced the statement that the Menger sponge has Lebesgue measure 0 with the statement that its volume has Lebesgue measure 0. Sorry, Michael, but this makes no sense. It's the set itself has Lebesgue measure 0. Perhaps what you're trying to say is something like (1) "its interior has Lebesgue measure 0" (true, but not very interesting since its interior is empty) or (2) "its 3-dimensional Hausdorff measure, as opposed to some lower-dimensional measure, is 0" (true but unnecessary to state here, since it's an immediate consequence of the fact that the sponge has Hausdorff dimension less than 3) or (3) "its Lebesgue measure, as opposed to some not-3-dimensional meausure applied to its boundary, is 0" (true, but "its Lebesgue measure" already *means* that; unless someone's in danger of thinking it means something else, why belabour the point?). None of those things, in any case, is correctly stated as "its volume has Lebesgue measure 0". Clearly you are dissatisfied with the statement that the Menger sponge has Lebesgue measure 0; could you please explain why, so that we can avoid gratuitous repeated reversions? Gareth McCaughan (talk) 20:22, 21 March 2010 (UTC)[reply]

The proposed Museum of Mathematics in New York has an M3 which has been sliced diagonally to reveal 6 pointed stars inside (instead of the squares that the typical person would expect) http://www.nytimes.com/2011/06/28/science/28math-menger.html  Stepho  talk  06:41, 29 June 2011 (UTC)[reply]

Cool! -- cheers, Michael C. Price ^talk 07:54, 29 June 2011 (UTC)[reply]

Is anyone interested in creating a related article for the Mosely snowflake? I found this article [1]] enlightening. 70.247.162.84 (talk) 18:42, 16 September 2012 (UTC)[reply]

The article says every face of the menger sponge is a sierpinski carpet. Every sierpinski carpet has 0 surface area. Cold we get an explanation on the page of why the surface area of the sponge is not 0? I presume there is a general formula that when integrated to infinity is positive because infinity is weird but it would be nice to see the formula, with explanation, in the article. SPACKlick (talk) 22:16, 13 August 2016 (UTC)[reply]

Seconding this question. It's clear enough that the surface of the approximations increases without limit, but does it follow formally that the MS itself has an infinite area? or an area at all? 24.7.14.87 (talk) 06:58, 14 May 2017 (UTC)[reply]

The Sierpinski carpet has zero area, and each face of the Menger sponge is a Sierpinski carpet, but the surface of the Menger sponge does not consist only of its faces. There are also the internal surfaces. At each iteration, the existing surfaces are holed, but the holing creates interior tubes which have greater area than that removed. In the limit, the surface area tends to infinity. Magic9mushroom (talk) 13:27, 20 November 2018 (UTC)[reply]

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If you would want to check out someone that made a level 4 sponge, here is one of them.

https://www.facebook.com/menger4/ — Preceding unsigned comment added by 71.179.19.89 (talk) 20:30, 19 April 2018 (UTC)[reply]

There is a related fractal to the Menger sponge created by removing only the central cube. I have usually seen this called either a Sierpinski sponge or Sierpinski cube. However, this article says that both are alternative terms for the Menger sponge, and indeed there does not seem to be any mention in Wikipedia of that "heavier" fractal. I am not really sure how to proceed here, since there does not appear to be any name for the "heavier" fractal that is not contaminated by confusion with the vastly-more-popular Menger sponge. Magic9mushroom (talk) 13:41, 20 November 2018 (UTC)[reply]

A central piece of set design in the TV show Devs is a Menger sponge. Maybe that's something you'd want to link to on here. 80.0.27.240 (talk) 10:08, 18 July 2020 (UTC)[reply]