{"state_type":"pith_open_graph_state","state_version":"1.0","pith_number":"pith:2011:T564U5IUM43GXAHAYFWN2XBHTS","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":"af78ac3cd12fbbc2f8ea887197d436eac94d7fdb385882123dd82c51dcd06979","cross_cats_sorted":["math.CA","math.MG"],"license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","primary_cat":"math.AP","submitted_at":"2011-09-10T21:11:35Z","title_canon_sha256":"cb7fc5dc4ff4176c7fbcaebe1e93a41ff1a9c9d88a18ca07b62c97a2a4a2914c"},"schema_version":"1.0","source":{"id":"1109.2260","kind":"arxiv","version":3}},"source_aliases":[{"alias_kind":"arxiv","alias_value":"1109.2260","created_at":"2026-05-18T04:00:26Z"},{"alias_kind":"arxiv_version","alias_value":"1109.2260v3","created_at":"2026-05-18T04:00:26Z"},{"alias_kind":"doi","alias_value":"10.48550/arxiv.1109.2260","created_at":"2026-05-18T04:00:26Z"},{"alias_kind":"pith_short_12","alias_value":"T564U5IUM43G","created_at":"2026-05-18T12:26:41Z"},{"alias_kind":"pith_short_16","alias_value":"T564U5IUM43GXAHA","created_at":"2026-05-18T12:26:41Z"},{"alias_kind":"pith_short_8","alias_value":"T564U5IU","created_at":"2026-05-18T12:26:41Z"}],"graph_snapshots":[{"event_id":"sha256:da570ff262ad75617d49cc89ff434f32d774ed7c9d1ccff9e904a5b6de6954a3","target":"graph","created_at":"2026-05-18T04:00:26Z","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":"In this paper, we prove that for $s\\in(1,2)$ there exists no totally lower irregular finite positive Borel measure $\\mu$ in $\\R^2$ with\\break $\\mathcal H^s(\\supp\\mu)<+\\infty$ such that $\\|R\\mu\\|\\ci{L^\\infty(m_2)}<+\\infty$, where $R\\mu=\\mu\\ast\\frac{x}{|x|^{s+1}}$ and $m_2$ is the Lebesgue measure in $\\R^2$. Combined with known results of Prat and Vihtil\\\"a, this shows that for any non-integer $s\\in(0,2)$ and any finite positive Borel measure in $\\R^2$ with $\\mathcal H^s(\\supp\\mu)<+\\infty$, we have $\\|R\\mu\\|\\ci{L^\\infty(m_2)}=\\infty$.","authors_text":"Alexander Volberg, Fedor Nazarov, Vladimir Eiderman","cross_cats":["math.CA","math.MG"],"headline":"","license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","primary_cat":"math.AP","submitted_at":"2011-09-10T21:11:35Z","title":"The $s$-Riesz transform of an $s$-dimensional measure in $\\R^2$ is unbounded for $1