{"state_type":"pith_open_graph_state","state_version":"1.0","pith_number":"pith:2012:ZWZEDWSDPTNOH3DXIPKZJUPJZJ","merge_version":"pith-open-graph-merge-v1","event_count":2,"valid_event_count":2,"invalid_event_count":0,"equivocation_count":0,"current":{"canonical_record":{"metadata":{"abstract_canon_sha256":"164ca80731751900ca91067d1f9878fd5a248b35e7146672d64f774ab1d4f349","cross_cats_sorted":[],"license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","primary_cat":"math.FA","submitted_at":"2012-04-10T14:50:28Z","title_canon_sha256":"998376dedede91b12f10b5648be03775965446d71e7681f78f7d535e2b7cf764"},"schema_version":"1.0","source":{"id":"1204.2170","kind":"arxiv","version":2}},"source_aliases":[{"alias_kind":"arxiv","alias_value":"1204.2170","created_at":"2026-05-18T01:31:20Z"},{"alias_kind":"arxiv_version","alias_value":"1204.2170v2","created_at":"2026-05-18T01:31:20Z"},{"alias_kind":"doi","alias_value":"10.48550/arxiv.1204.2170","created_at":"2026-05-18T01:31:20Z"},{"alias_kind":"pith_short_12","alias_value":"ZWZEDWSDPTNO","created_at":"2026-05-18T12:27:30Z"},{"alias_kind":"pith_short_16","alias_value":"ZWZEDWSDPTNOH3DX","created_at":"2026-05-18T12:27:30Z"},{"alias_kind":"pith_short_8","alias_value":"ZWZEDWSD","created_at":"2026-05-18T12:27:30Z"}],"graph_snapshots":[{"event_id":"sha256:4f64c7ea6450a078f9bfcb4da0e220798dc22140427b8dbd945b4ba7ff7faf15","target":"graph","created_at":"2026-05-18T01:31:20Z","signer":{"key_id":"pith-v1-2026-05","public_key_fingerprint":"8d4b5ee74e4693bcd1df2446408b0d54","signer_id":"pith.science","signer_type":"pith_registry"},"payload":{"graph_snapshot":{"author_claims":{"count":0,"snapshot_sha256":"258153158e38e3291e3d48162225fcdb2d5a3ed65a07baac614ab91432fd4f57","strong_count":0},"builder_version":"pith-number-builder-2026-05-17-v1","claims":{"count":0,"items":[],"snapshot_sha256":"258153158e38e3291e3d48162225fcdb2d5a3ed65a07baac614ab91432fd4f57"},"formal_canon":{"evidence_count":0,"snapshot_sha256":"258153158e38e3291e3d48162225fcdb2d5a3ed65a07baac614ab91432fd4f57"},"paper":{"abstract_excerpt":"Let $(\\Omega,\\Sigma,\\mu)$ be a measure space and $1< p < +\\infty$. In this paper we show that, under quite general conditions, the set $L_{p}(\\Omega) - \\bigcup\\limits_{1 \\leq q < p}L_{q}(\\Omega)$ is maximal spaceable, that is, it contains (except for the null vector) a closed subspace $F$ of $L_{p}(\\Omega)$ such that $\\dim(F) = \\dim(L_{p}(\\Omega))$. We also show that if those conditions are not fulfilled, then even the larger set $L_p(\\Omega) - L_q(\\Omega)$, $1 \\leq q < p$, may fail to be maximal spaceable. The aim of the results presented here is, among others, to generalize all the previous ","authors_text":"D. Cariello, D. Pellegrino, G. Botelho, J.B. Seoane-Sep\\'ulveda, V.V. F\\'avaro","cross_cats":[],"headline":"","license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","primary_cat":"math.FA","submitted_at":"2012-04-10T14:50:28Z","title":"Subspaces of maximal dimension contained in $L_p(\\Omega) - \\bigcup\\limits_{q