Schwinger function

In quantum field theory, the Wightman distributions can be analytically continued to analytic functions in Euclidean space with the domain restricted to the ordered set of points in Euclidean space with no coinciding points.^[1] These functions are called the Schwinger functions (named after Julian Schwinger) and they are real-analytic, symmetric under the permutation of arguments (antisymmetric for fermionic fields), Euclidean covariant and satisfy a property known as reflection positivity. Properties of Schwinger functions are known as Osterwalder–Schrader axioms (named after Konrad Osterwalder and Robert Schrader).^[2] Schwinger functions are also referred to as Euclidean correlation functions.

^ Streater, R. F.; Wightman, A.S. (2000). PCT, spin and statistics, and all that. Princeton, N.J: Princeton University Press. ISBN 978-0-691-07062-9. OCLC 953694720.
^ Osterwalder, K., and Schrader, R.: "Axioms for Euclidean Green’s functions," Comm. Math. Phys. 31 (1973), 83–112; 42 (1975), 281–305.

[Streater-1] Streater, R. F.; Wightman, A.S. (2000). PCT, spin and statistics, and all that. Princeton, N.J: Princeton University Press. ISBN 978-0-691-07062-9. OCLC 953694720.

[:0-2] Osterwalder, K., and Schrader, R.: "Axioms for Euclidean Green’s functions," Comm. Math. Phys. 31 (1973), 83–112; 42 (1975), 281–305.

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