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pith:2026:YWZAYPAOONSBRWFKDXHG4RQVWS
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Leading UV divergences of quantum corrections to K\"ahler superpotential in general $\mathcal{N}=1$ chiral model

A. I. Mukhaeva, D.M. Tolkachev, R.M. Iakhibbaev

Differential equations describe the sum of leading UV divergences of the Kähler superpotential in general N=1 chiral models.

arxiv:2604.18198 v2 · 2026-04-20 · hep-th

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Claims

C1strongest claim

Using the Bogoliubov-Parasiuk theorem we derive differential equations for the sum of leading UV divergences of the Kähler potential in the general N=1 supersymmetric chiral theory.

C2weakest assumption

The Bogoliubov-Parasiuk theorem applies directly and without modification to the general N=1 chiral supersymmetric model, including non-renormalizable interactions, in a manner that yields well-defined differential equations for the divergences.

C3one line summary

Differential equations are derived for the sum of leading UV divergences of the Kähler potential in general N=1 supersymmetric chiral theory.

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First computed 2026-06-24T01:15:02.832678Z
Builder pith-number-builder-2026-05-17-v1
Signature Pith Ed25519 (pith-v1-2026-05) · public key
Schema pith-number/v1.0

Canonical hash

c5b20c3c0e736418d8aa1dce6e4615b4b0764e0e9e0e2fbbd1131d5276b453e9

Aliases

arxiv: 2604.18198 · arxiv_version: 2604.18198v2 · doi: 10.48550/arxiv.2604.18198 · pith_short_12: YWZAYPAOONSB · pith_short_16: YWZAYPAOONSBRWFK · pith_short_8: YWZAYPAO
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curl -sH 'Accept: application/ld+json' https://pith.science/pith/YWZAYPAOONSBRWFKDXHG4RQVWS \
  | 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: c5b20c3c0e736418d8aa1dce6e4615b4b0764e0e9e0e2fbbd1131d5276b453e9
Canonical record JSON
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    "license": "http://arxiv.org/licenses/nonexclusive-distrib/1.0/",
    "primary_cat": "hep-th",
    "submitted_at": "2026-04-20T12:50:12Z",
    "title_canon_sha256": "a8495708f0f39db7565bb261a1dc687f0c04b20ec8b2bb52231787f1940ecc06"
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