Pith Number

pith:HJYR7XVU

pith:2026:HJYR7XVU3SSS2QFUFJ4AC4X3Q3

not attested not anchored not stored refs pending

Asymptotic regularization method. A constructive approach

Christian Dur\'an Romero, Luis J. Garay, Mercedes Mart\'in-Benito, Rita B. Neves

The asymptotic regularization method subtracts UV divergences by structurally decomposing the integrand's asymptotic expansion while preserving covariance and gauge symmetry.

arxiv:2604.24292 v2 · 2026-04-27 · hep-th · gr-qc · hep-ph

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\usepackage{pith}
\pithnumber{HJYR7XVU3SSS2QFUFJ4AC4X3Q3}

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Record completeness

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2 Internet Archive

3 Author claim open · sign in to claim

4 Citations open

5 Replications open

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The bundle contains the canonical record plus signed events. A mirror can host it anywhere and recompute the same current state with the deterministic merge algorithm.

Claims

C1strongest claim

In single-scale theories, we show that the renormalized quantities exhibit a non-local logarithmic dependence uniquely determined by the UV asymptotics, offering a derivation of logarithmic terms that is independent of standard renormalization-group flows.

C2weakest assumption

That the structural decomposition of the integrand asymptotic expansion can consistently distinguish contributions driving UV singularities from finite ones while maintaining covariance and gauge symmetry.

C3one line summary

A new regularization scheme for QFT divergences based on asymptotic decomposition of integrands, yielding non-local logarithmic dependence uniquely fixed by UV asymptotics independent of RG flows.

Receipt and verification

First computed	2026-05-27T01:05:54.992205Z
Builder	pith-number-builder-2026-05-17-v1
Signature	Pith Ed25519 (`pith-v1-2026-05`) · public key
Schema	pith-number/v1.0

Canonical hash

3a711fdeb4dca52d40b42a780172fb86fd23a8b6846315d215c7c48492447667

Aliases

arxiv: 2604.24292 · arxiv_version: 2604.24292v2 · doi: 10.48550/arxiv.2604.24292 · pith_short_12: HJYR7XVU3SSS · pith_short_16: HJYR7XVU3SSS2QFU · pith_short_8: HJYR7XVU

Agent API

Resolver JSON Graph JSON Events JSON Schema Signing key

Verify this Pith Number yourself

curl -sH 'Accept: application/ld+json' https://pith.science/pith/HJYR7XVU3SSS2QFUFJ4AC4X3Q3 \
  | jq -c '.canonical_record' \
  | python3 -c "import sys,json,hashlib; b=json.dumps(json.loads(sys.stdin.read()), sort_keys=True, separators=(',',':'), ensure_ascii=False).encode(); print(hashlib.sha256(b).hexdigest())"
# expect: 3a711fdeb4dca52d40b42a780172fb86fd23a8b6846315d215c7c48492447667

Canonical record JSON

{
  "metadata": {
    "abstract_canon_sha256": "4eaba96a483fc6a1ce5558f301f17f96cfb2e42abfe30186e219a81a7947b9d4",
    "cross_cats_sorted": [
      "gr-qc",
      "hep-ph"
    ],
    "license": "http://creativecommons.org/licenses/by/4.0/",
    "primary_cat": "hep-th",
    "submitted_at": "2026-04-27T10:26:03Z",
    "title_canon_sha256": "4435cb305025d11bcd66f70faa63cff7d3300b027393b0ebd99180c16becbe84"
  },
  "schema_version": "1.0",
  "source": {
    "id": "2604.24292",
    "kind": "arxiv",
    "version": 2
  }
}