has been cited by the following article(s):
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[1]
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Continuum Limit of the Green Function in Scaled Affine φ 4 4 Quantum Euclidean Covariant Relativistic Field Theory
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Quantum Reports,
2024 |
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[2]
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Continuum Limit of the Green Function in Scaled Affine φ 4 4 Quantum Euclidean Covariant Relativistic Field Theory. Quantum Rep. 2024, 6, 134–141
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2024 |
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[3]
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On some multiscale phenomena in quantum physics, classical field theory and spacetime geometry
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2023 |
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[4]
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Scaled affine quantization of φ 3 1 2 is nontrivial
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Modern Physics Letters A,
2023 |
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[5]
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The Magnificent Realm of Affine Quantization: valid results for particles, fields, and gravity
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Axioms,
2023 |
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[6]
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Scaled affine quantization of ultralocal a comparative path integral Monte Carlo study with scaled canonical quantization
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Physical Review D,
2022 |
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[7]
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How to Secure Valid Quantizations
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Entropy,
2022 |
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[8]
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A Theoretical Comparative Study of Vapor-Compression Refrigeration Cycle using Al2O3 Nanoparticle with Low-GWP Refrigerants
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Entropy,
2022 |
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[9]
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Scaled Affine Quantization of Ultralocal a comparative Path Integral Monte Carlo study with Canonical Quantization
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arXiv preprint arXiv:2109.13447,
2021 |
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[10]
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Affine quantization of succeeds while canonical quantization fails
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2021 |
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[11]
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Let Loop Quantum Gravity and Affine Quantum Gravity Examine Each Other
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2021 |
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[12]
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Using Coherent States to Make Physically Correct Classical-to-Quantum Procedures that Help Resolve Nonrenomalizable Fields Including Einstein's Gravity
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2021 |
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[13]
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Monte Carlo evaluation of the continuum limit of the two-point function of the Euclidean free real scalar field subject to affine quantization
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2021 |
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[14]
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Kinetic factors in affine quantization and their role in field theory Monte Carlo
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arXiv preprint arXiv:2012.09991,
2020 |
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[15]
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Monte Carlo evaluation of the continuum limit of
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2020 |
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[16]
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AN E-BOOKLET
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[1]
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Continuum Limit of the Green Function in Scaled Affine φ44 Quantum Euclidean Covariant Relativistic Field Theory
Quantum Reports,
2024
DOI:10.3390/quantum6020010
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[2]
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Scaled affine quantization of φ312 is nontrivial
Modern Physics Letters A,
2023
DOI:10.1142/S0217732323501675
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[3]
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How to Secure Valid Quantizations
Entropy,
2022
DOI:10.3390/e24101374
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[4]
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Scaled affine quantization of ultralocal
φ24
a comparative path integral Monte Carlo study with scaled canonical quantization
Physical Review D,
2022
DOI:10.1103/PhysRevD.106.114508
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[5]
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Affine quantization of
(φ4)4
succeeds while canonical quantization fails
Physical Review D,
2021
DOI:10.1103/PhysRevD.103.076013
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[6]
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Monte Carlo evaluation of the continuum limit of
(ϕ12)3
Journal of Statistical Mechanics: Theory and Experiment,
2021
DOI:10.1088/1742-5468/ac0f69
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[7]
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Monte Carlo Evaluation of the Continuum Limit of the Two-Point Function of the Euclidean Free Real Scalar Field Subject to Affine Quantization
Journal of Statistical Physics,
2021
DOI:10.1007/s10955-021-02818-x
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