A small tool to view real-world ActivityPub objects as JSON! Enter a URL
or username from Mastodon or a similar service below, and we'll send a
request with
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Accept
header
to the server to view the underlying object.
{
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{
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"conversation": "ostatus:conversation",
"sensitive": "as:sensitive",
"toot": "http://joinmastodon.org/ns#",
"votersCount": "toot:votersCount"
}
],
"id": "https://mathstodon.xyz/users/anton_hilado/statuses/109348762772124167",
"type": "Note",
"summary": null,
"inReplyTo": "https://mathstodon.xyz/users/anton_hilado/statuses/109348750162971733",
"published": "2022-11-15T16:28:25Z",
"url": "https://mathstodon.xyz/@anton_hilado/109348762772124167",
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"content": "<p>If I understand correctly, the "stacky approach" means the prismatic cohomology can be obtained as a complex on a "Cartier-Witt stack", which sends a ring R to the groupoid of generalized Cartier divisors on W(R) satisfying some conditions. As I understand more about this maybe I'll write about it on here (with the usual caveat of being a learner and thus probably getting some things wrong).</p>",
"contentMap": {
"en": "<p>If I understand correctly, the "stacky approach" means the prismatic cohomology can be obtained as a complex on a "Cartier-Witt stack", which sends a ring R to the groupoid of generalized Cartier divisors on W(R) satisfying some conditions. As I understand more about this maybe I'll write about it on here (with the usual caveat of being a learner and thus probably getting some things wrong).</p>"
},
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