Graph polynomials associated with Dyson-Schwinger equations
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Publication:6153405
DOI10.5937/matmor2302091sOpenAlexW4390392023MaRDI QIDQ6153405
Publication date: 14 February 2024
Published in: Mathematica Moravica (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.5937/matmor2302091s
Graph polynomials (05C31) Nonperturbative methods of renormalization applied to problems in quantum field theory (81T16) Feynman integrals and graphs; applications of algebraic topology and algebraic geometry (81Q30) Infinite graphs (05C63)
Cites Work
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- Filtrations in Dyson-Schwinger equations: Next-to\(^{\{j \}}\)-leading log expansions systematically
- Topological graph polynomial and quantum field theory. II: Mehler kernel theories
- Anatomy of a gauge theory
- On motives associated to graph polynomials
- An \(L^{p}\) theory of sparse graph convergence. II: LD convergence, quotients and right convergence
- Quantum field theory. A modern perspective
- The analytic evolution of Dyson-Schwinger equations via homomorphism densities
- Non-perturbative graph languages, halting problem and complexity
- The dynamics of non-perturbative phases via Banach bundles
- The complexities of nonperturbative computations
- Topological graph polynomials and quantum field theory. I: Theory kernel theories
- Renormalization of gauge fields: a Hopf algebra approach
- Lectures on non-perturbative effects in large N gauge theories, matrix models and strings
- MOTIVIC DYSON–SCHWINGER EQUATIONS
- Instantons and Large N
- Feynman motives and deletion-contraction relations
- Motivic renormalization and singularities
- Graph Polynomials and Their Applications I: The Tutte Polynomial
- Graph Polynomials and Their Applications II: Interrelations and Interpretations
- Periods and Feynman integrals
- Metrics for sparse graphs
- Graphons and renormalization of large Feynman diagrams
- Sparse exchangeable graphs and their limits via graphon processes
- Nonperturbative Topological Phenomena in QCD and Related Theories
- An 𝐿^{𝑝} theory of sparse graph convergence I: Limits, sparse random graph models, and power law distributions
- Graphons, cut norm and distance, couplings and rearrangements
- Non-perturbative β-functions via Feynman graphons
- ALGEBRO-GEOMETRIC FEYNMAN RULES
- Towards cohomology of renormalization: bigrading the combinatorial Hopf algebra of rooted trees
- From local perturbation theory to Hopf and Lie algebras of Feynman graphs
- Halting problem in Feynman graphon processes derived from the renormalization Hopf algebra
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