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
the right
Accept
header
to the server to view the underlying object.
{
"@context": [
"https://www.w3.org/ns/activitystreams",
{
"ostatus": "http://ostatus.org#",
"atomUri": "ostatus:atomUri",
"inReplyToAtomUri": "ostatus:inReplyToAtomUri",
"conversation": "ostatus:conversation",
"sensitive": "as:sensitive",
"toot": "http://joinmastodon.org/ns#",
"votersCount": "toot:votersCount"
}
],
"id": "https://mathstodon.xyz/users/varkor/statuses/109672016886168947",
"type": "Note",
"summary": null,
"inReplyTo": "https://types.pl/users/maxsnew/statuses/109671527453948670",
"published": "2023-01-11T18:36:11Z",
"url": "https://mathstodon.xyz/@varkor/109672016886168947",
"attributedTo": "https://mathstodon.xyz/users/varkor",
"to": [
"https://www.w3.org/ns/activitystreams#Public"
],
"cc": [
"https://mathstodon.xyz/users/varkor/followers",
"https://types.pl/users/maxsnew"
],
"sensitive": false,
"atomUri": "https://mathstodon.xyz/users/varkor/statuses/109672016886168947",
"inReplyToAtomUri": "https://types.pl/users/maxsnew/statuses/109671527453948670",
"conversation": "tag:types.pl,2023-01-11:objectId=7878276:objectType=Conversation",
"content": "<p><span class=\"h-card\" translate=\"no\"><a href=\"https://types.pl/@maxsnew\" class=\"u-url mention\">@<span>maxsnew</span></a></span> They are called "pseudo-operads in Cat" in Day–Street's "Lax monoids, pseudo-operads, and convolution" (<a href=\"http://maths.mq.edu.au/~street/Multicats.pdf\" target=\"_blank\" rel=\"nofollow noopener noreferrer\" translate=\"no\"><span class=\"invisible\">http://</span><span class=\"ellipsis\">maths.mq.edu.au/~street/Multic</span><span class=\"invisible\">ats.pdf</span></a>).</p>",
"contentMap": {
"en": "<p><span class=\"h-card\" translate=\"no\"><a href=\"https://types.pl/@maxsnew\" class=\"u-url mention\">@<span>maxsnew</span></a></span> They are called "pseudo-operads in Cat" in Day–Street's "Lax monoids, pseudo-operads, and convolution" (<a href=\"http://maths.mq.edu.au/~street/Multicats.pdf\" target=\"_blank\" rel=\"nofollow noopener noreferrer\" translate=\"no\"><span class=\"invisible\">http://</span><span class=\"ellipsis\">maths.mq.edu.au/~street/Multic</span><span class=\"invisible\">ats.pdf</span></a>).</p>"
},
"updated": "2023-01-11T18:36:53Z",
"attachment": [],
"tag": [
{
"type": "Mention",
"href": "https://types.pl/users/maxsnew",
"name": "@maxsnew@types.pl"
}
],
"replies": {
"id": "https://mathstodon.xyz/users/varkor/statuses/109672016886168947/replies",
"type": "Collection",
"first": {
"type": "CollectionPage",
"next": "https://mathstodon.xyz/users/varkor/statuses/109672016886168947/replies?only_other_accounts=true&page=true",
"partOf": "https://mathstodon.xyz/users/varkor/statuses/109672016886168947/replies",
"items": []
}
},
"likes": {
"id": "https://mathstodon.xyz/users/varkor/statuses/109672016886168947/likes",
"type": "Collection",
"totalItems": 5
},
"shares": {
"id": "https://mathstodon.xyz/users/varkor/statuses/109672016886168947/shares",
"type": "Collection",
"totalItems": 2
}
}