I'm a former potter with a maths background, and currently work with data at a rural education NGO in South Africa.
Public Key
npub1l3c2empn67kj2ny0ecff94l9azev2g6y7d3plrdkv08k7dcgq39q75nw2k Profile Code
nprofile1qqs0cu9vasea0tf9fj8uuy5j6lj73vk9ydz0xcsl3kmx8nm0xuyqgjsprpmhxue69uhhyetvv9ujumt0d4hhxarj9ecxjmntvn4a2p
Show more details
Published at
2026-07-13T08:55:10Z Event JSON
{
"id": "82acfc155b54b9461ebdd87837072c4b8bfe8a4bf5dca339ad4a8d808bf93d8b" ,
"pubkey": "fc70acec33d7ad254c8fce1292d7e5e8b2c52344f3621f8db663cf6f3708044a" ,
"created_at": 1783932910 ,
"kind": 0 ,
"tags": [
[
"proxy",
"https://mathstodon.xyz/users/pieter",
"activitypub"
],
[
"L",
"pink.momostr"
],
[
"l",
"pink.momostr.activitypub:https://mathstodon.xyz/users/pieter",
"pink.momostr"
],
[
"-"
]
],
"content": "{\"name\":\"Pieter Mostert\",\"about\":\"I'm a former potter with a maths background, and currently work with data at a rural education NGO in South Africa.\",\"website\":\"https://mathstodon.xyz/@pieter\",\"picture\":\"https://media.mathstodon.xyz/accounts/avatars/110/439/136/765/365/634/original/d25d24ef6a7e2d70.png\",\"nip05\":\"[email protected] \"}" ,
"sig": "f1af6849a4e331daecc62a8f40feb307f8b6e34154c0c8ca71b5eae83147d8b71ac35dc5efdc97e11f49a5efd64612fd5cebe18989a9a40a4fec287460cb8d65"
}
Last Notes npub1l3c2empn67kj2ny0ecff94l9azev2g6y7d3plrdkv08k7dcgq39q75nw2k Pieter Mostert Peter Selinger has come up with a great way of generating hat tilings by overlaying a triangular grid on a periodic pattern, and placing a tile at each point that is not white, with the orientation and handedness of the tile determined by the colour of the point. A more thorough explanation is given in this preprint https://arxiv.org/pdf/2604.20964, where he and Sébastien Labbé show that this is a Markov partition. As mentioned in the paper, I came up with a similar construction a few years ago, but it required separate steps for tiles of a given orientation modulo 120. In this series of posts, I'll attempt to explain the connection between the two constructions, and demonstrate the analogous constructions for the hats-in-turtles and turtles-in-hats versions of the Spectre tiling. The aim is to give a sense of the main ideas, rather than a rigorous proof that this works. Before I get into the details, here is a Markov partition for turtle tilings, where control / anchor points are located on the underside of the turtle's shell. (1/n) #TilingTuesday #aperiodicTilings https://media.mathstodon.xyz/media_attachments/files/116/484/462/451/651/082/original/562044cde0f70b68.png npub1l3c2empn67kj2ny0ecff94l9azev2g6y7d3plrdkv08k7dcgq39q75nw2k Pieter Mostert The magazine article headline claims that's enough gold and uranium to "fill Earth's oceans", when the very first line describes the amount as having approximately the same mass as Earth's oceans. I know article writers aren't always the people writing headlines, but you'd think someone at Space.com would have noticed the error and fixed it by now. npub1l3c2empn67kj2ny0ecff94l9azev2g6y7d3plrdkv08k7dcgq39q75nw2k Pieter Mostert I once had a heated argument with my grade 6 teacher about the value of \[3\times \frac{1}{3}\]. I claimed it was 1, while she claimed it was 0.9999999 (not recurring, just the number of digits shown by the calculator), since "the calculator is always right". If I recall correctly, the controversy arose after one of my classmates had noticed that the calculator showed 0.3333333 when they calculated \[1/3\], and then observed that \[3\times 0.3333333 = 0.9999999\]. npub1l3c2empn67kj2ny0ecff94l9azev2g6y7d3plrdkv08k7dcgq39q75nw2k Pieter Mostert View towards Lubanzi beach, with Hole in the Wall in the distance #SilentSunday https://media.mathstodon.xyz/media_attachments/files/113/261/427/683/998/229/original/2a24a08fee2321ef.jpg npub1l3c2empn67kj2ny0ecff94l9azev2g6y7d3plrdkv08k7dcgq39q75nw2k Pieter Mostert I took a walk down to Mbolompo point this afternoon, and on the way back came across these beautiful iridescent films produced by iron / manganese oxidising bacteria. #SilentSunday https://media.mathstodon.xyz/media_attachments/files/113/222/835/249/104/181/original/e1ef8ce8e491ff18.jpg https://media.mathstodon.xyz/media_attachments/files/113/222/847/185/310/932/original/1299ed2402507f57.jpg https://media.mathstodon.xyz/media_attachments/files/113/222/851/971/984/599/original/3d4ad51935d886b4.png https://media.mathstodon.xyz/media_attachments/files/113/222/853/064/067/202/original/7a1093740f1c1e59.png