this post was submitted on 20 Jan 2026
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Gems of Internet Art

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Gems of Internet Art

High quality, not necessarily high effort.

Share your favorite artsy content from the internet. Anything good enough to download to your device is a good rule of thumb.

Weird, surreal and abstract art, as well as works related to internet culture are preferred, but not a must.

I recommend checking out the stuff that has already been posted to get a feel for this community first.

Enjoy.

⚠️ Disclaimers

Strobing / flashing lights warning: Not recommended for people with photosensitive epilepsy.

For Artists: If you don't want your work to be posted here, please send me a message. I will, of course, remove all of your art and make note to not post it in the future, either. Best case scenario would be promotion of your work and entertainment for everyone else. I do not have any financial incentive in this.

Rules

TLDR: Give credit, if possible. Tag NSFW - no porn, no gore. Strive to be the opposite of Twitter.

✏️ 1) If you know the artist, credit them.

🔞 2) Tag NSFW. No extreme, or even real gore & no porn. Non-sexual nudity is fine.

🫂 3) Be respectful of others. It sounds so obvious, but remember you are conversing with another human being and imagine you were talking to them in person.

🗳️ 4) No politics, no hostile debates (light-hearted jokes and respectful discussions are fine).

ℹ️ If you are wondering: I don't give a shit about swearing, except racial slurs and mean spirited insults to others.

Thanks.

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Excerpt of a monohedral 11-gon tiling of a non-compact surface embedded in 𝑅³ (media.mathstodon.xyz)
submitted 1 month ago by ns1@feddit.uk to c/gems@fedia.io
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Credit: Rasmus Direct link: https://mathstodon.xyz/@rasjor/115924337017307626

Excerpt of a monohedral 11-gon tiling of a non-compact surface embedded in 𝑅³. (3 11-gons at every vertex)

The surface splits 𝑅³ in two, so that the space within the dodecagonal tunnels is on one side and the space in the hexagonal tunnels on the other.

The labeled dual edges of the tiling form a partial Cayley surface complex of the group:

G = ⟨ f₁, f₂, f₃, t₁, t₂, t₃, t₄ ∣ f₂², t₃², f₁², t₂², f₃², t₄³, t₁³, (t₁t₄)², f₁t₃t₄⁻¹, f₃t₁⁻¹t₂⁻¹, (f₁f₃)², f₂t₂t₃⁻¹⟩

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