\(q\)-deformations of statistical mechanical systems and motives over finite fields
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Publication:1703750
DOI10.1134/S2070046617030049zbMath1386.82006arXiv1704.06367MaRDI QIDQ1703750
Publication date: 7 March 2018
Published in: \(p\)-Adic Numbers, Ultrametric Analysis, and Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1704.06367
Axiomatic quantum field theory; operator algebras (81T05) Quantum equilibrium statistical mechanics (general) (82B10) Noncommutative geometry (à la Connes) (58B34) Witt vectors and related rings (13F35)
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Cites Work
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- Chow motives versus noncommutative motives
- Cohomological Hall algebra, exponential Hodge structures and motivic Donaldson-Thomas invariants
- On the arithmetic of the BC-system
- Zeta functions, Grothendieck groups, and the Witt ring
- Bost-Connes systems, categorification, quantum statistical mechanics, and Weil numbers
- Cyclotomic completions of polynomial rings
- Nested Witt vectors and their \(q\)-deformation
- Classification of the ring of Witt vectors and the necklace ring associated with the formal group law \(X+Y - qXY\)
- Multiple \(q\)-zeta functions and multiple \(q\)-polylogarithms
- \(q\)-analog of the Möbius function and the cyclotomic identity associated to a profinite group.
- \(q\)-deformed necklace rings and \(q\)-Möbius function
- Cyclotomy and endomotives
- Fun with \(\mathbb F_1\)
- Endomorphisms of finitely generated projective modules over a commutative ring
- Hecke algebras, type III factors and phase transitions with spontaneous symmetry breaking in number theory
- Noncommutative geometry and motives: the thermodynamics of endomotives
- \(q\)-Bernoulli numbers and polynomials
- Cyclotomy and analytic geometry over F_1
- A probabilistic approach to some of Euler’s number theoretic identities
- A VARIATION OF EULER′S APPROACH TO VALUES OF THE RIEMANN ZETA FUNCTION
- Bernoulli Trials and Number Theory
- 𝔽ζ-geometry, Tate motives, and the Habiro ring
- q-Analogues of the Riemann zeta, the Dirichlet L-functions, and a crystal zeta function
- Values of zeta functions at s=1/2
- On \(q\)-analogues of Riemann's zeta function
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