Symanzik polynomials

E570857

Symanzik polynomials are graph-based polynomials that arise in the parametric representation of Feynman integrals in quantum field theory, encoding the topology and kinematic dependence of Feynman diagrams.

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Symanzik polynomials canonical 1

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Predicate Object
instanceOf graph polynomial
mathematical object
tool in quantum field theory
alsoKnownAs graph polynomials of Feynman diagrams
appearsIn parametric integral representation of Green functions
representation of Feynman amplitudes as parameter integrals
appliesTo massive quantum field theories
massless quantum field theories
multi-loop Feynman diagrams
scalar Feynman integrals
context Euclidean quantum field theory NERFINISHED
Minkowskian quantum field theory NERFINISHED
definedOver Schwinger parameters
dependsOn edge set of the graph
external momenta
internal masses
underlying Feynman graph
vertex set of the graph
encodes kinematic dependence of Feynman diagrams
topology of Feynman diagrams
field combinatorics
graph theory
mathematical physics
quantum field theory
generalizationOf Kirchhoff tree polynomial NERFINISHED
hasPart first Symanzik polynomial
second Symanzik polynomial
hasProperty homogeneous in Feynman parameters
multivariate polynomial
namedAfter Kurt Symanzik NERFINISHED
relatedTo Feynman parameters NERFINISHED
Kirchhoff polynomial NERFINISHED
Schwinger parameterization NERFINISHED
graph Laplacian
parametric Feynman integrals
spanning 2-forests of a graph
spanning trees of a graph
usedFor algebraic geometry of Feynman graphs
analysis of Landau singularities
analytic continuation of Feynman integrals
study of infrared divergences
study of ultraviolet divergences
usedIn evaluation of Feynman diagrams
high-energy physics calculations
loop integral reduction methods
parametric representation of Feynman integrals
perturbative quantum field theory
renormalization theory

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Kurt Symanzik knownFor Symanzik polynomials