{"bundle_type":"pith_open_graph_bundle","bundle_version":"1.0","pith_number":"pith:2006:LWG3QCEZ3XE2542AMJ4XP7TAPO","short_pith_number":"pith:LWG3QCEZ","canonical_record":{"source":{"id":"math/0611744","kind":"arxiv","version":3},"metadata":{"license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","primary_cat":"math.LO","submitted_at":"2006-11-24T07:50:08Z","cross_cats_sorted":[],"title_canon_sha256":"ca92017309de6db9f38ab0f4873d306aff68b5210f5a1e7f3c4ae8d4e5b09794","abstract_canon_sha256":"4fce5f41ae91be97169740dcef6f827b5c83b18443347fb751e7b91854ddcc07"},"schema_version":"1.0"},"canonical_sha256":"5d8db80899ddc9aef340627977fe607b82dddff8a2f32b18f918e317e8e73684","source":{"kind":"arxiv","id":"math/0611744","version":3},"source_aliases":[{"alias_kind":"arxiv","alias_value":"math/0611744","created_at":"2026-05-18T00:49:19Z"},{"alias_kind":"arxiv_version","alias_value":"math/0611744v3","created_at":"2026-05-18T00:49:19Z"},{"alias_kind":"doi","alias_value":"10.48550/arxiv.math/0611744","created_at":"2026-05-18T00:49:19Z"},{"alias_kind":"pith_short_12","alias_value":"LWG3QCEZ3XE2","created_at":"2026-05-18T12:25:54Z"},{"alias_kind":"pith_short_16","alias_value":"LWG3QCEZ3XE2542A","created_at":"2026-05-18T12:25:54Z"},{"alias_kind":"pith_short_8","alias_value":"LWG3QCEZ","created_at":"2026-05-18T12:25:54Z"}],"events":[{"event_type":"record_created","subject_pith_number":"pith:2006:LWG3QCEZ3XE2542AMJ4XP7TAPO","target":"record","payload":{"canonical_record":{"source":{"id":"math/0611744","kind":"arxiv","version":3},"metadata":{"license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","primary_cat":"math.LO","submitted_at":"2006-11-24T07:50:08Z","cross_cats_sorted":[],"title_canon_sha256":"ca92017309de6db9f38ab0f4873d306aff68b5210f5a1e7f3c4ae8d4e5b09794","abstract_canon_sha256":"4fce5f41ae91be97169740dcef6f827b5c83b18443347fb751e7b91854ddcc07"},"schema_version":"1.0"},"canonical_sha256":"5d8db80899ddc9aef340627977fe607b82dddff8a2f32b18f918e317e8e73684","receipt":{"kind":"pith_receipt","key_id":"pith-v1-2026-05","algorithm":"ed25519","signed_at":"2026-05-18T00:49:19.718588Z","signature_b64":"4IHE35j/OOC943cDzR7fNS6s3OMjtgZPKnv+QHyoGLm1nucdKqBdUQmQKK5havEz1k/6mabHh4R3puFNdTCfAg==","signed_message":"canonical_sha256_bytes","builder_version":"pith-number-builder-2026-05-17-v1","receipt_version":"0.3","canonical_sha256":"5d8db80899ddc9aef340627977fe607b82dddff8a2f32b18f918e317e8e73684","last_reissued_at":"2026-05-18T00:49:19.718087Z","signature_status":"signed_v1","first_computed_at":"2026-05-18T00:49:19.718087Z","public_key_fingerprint":"8d4b5ee74e4693bcd1df2446408b0d54"},"source_kind":"arxiv","source_id":"math/0611744","source_version":3,"attestation_state":"computed"},"signer":{"signer_id":"pith.science","signer_type":"pith_registry","key_id":"pith-v1-2026-05","public_key_fingerprint":"8d4b5ee74e4693bcd1df2446408b0d54"},"created_at":"2026-05-18T00:49:19Z","supersedes":[],"prev_event":null,"signature":{"signature_status":"signed_v1","algorithm":"ed25519","key_id":"pith-v1-2026-05","public_key_fingerprint":"8d4b5ee74e4693bcd1df2446408b0d54","signature_b64":"qkLCGZAY9htqivB6CdAQZ4nIDVAeuolQEiV1h/yOa1P1LljA+Yddg2NbEt5QLg9OBMiJLI0OtE3La9+Pt51LBA==","signed_message":"open_graph_event_sha256_bytes","signed_at":"2026-05-31T18:19:51.092737Z"},"content_sha256":"0ba8d2a99eb1b238652dc35f8d20fd5b544067f08d985917b2ec19af6c63af28","schema_version":"1.0","event_id":"sha256:0ba8d2a99eb1b238652dc35f8d20fd5b544067f08d985917b2ec19af6c63af28"},{"event_type":"graph_snapshot","subject_pith_number":"pith:2006:LWG3QCEZ3XE2542AMJ4XP7TAPO","target":"graph","payload":{"graph_snapshot":{"paper":{"title":"How to drive our families mad","license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","headline":"","cross_cats":[],"primary_cat":"math.LO","authors_text":"Lajos Soukup, Osvaldo Guzman, Saka\\'e Fuchino, Stefan Geschke","submitted_at":"2006-11-24T07:50:08Z","abstract_excerpt":"Given a family $F$ of pairwise almost disjoint sets on a countable set $S$, we study maximal almost disjoint (mad) families $F^+$ extending $F$.\n We define $a^+(F)$ to be the minimal possible cardinality of $F^+\\setminus F$ for such $F^+$, and $a^+(\\kappa)=\\sup\\{a^+(F): |F| \\leq \\kappa \\}$. We show that all infinite cardinal less than or equal to the continuum continuum can be represented as $a^+(F)$ for some almost disjoint $F$ and that the inequalities $\\aleph_1=a