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We solve the two-point function of the lowest dimensional scalar operator in the critical $\phi^4$ theory on $4-\epsilon$ dimensional real projective space in three different methods. The first is to… Click to show full abstract
We solve the two-point function of the lowest dimensional scalar operator in the critical $\phi^4$ theory on $4-\epsilon$ dimensional real projective space in three different methods. The first is to use the conventional perturbation theory, and the second is to impose the crosscap bootstrap equation, and the third is to solve the Schwinger-Dyson equation under the assumption of conformal invariance. We find that the three methods lead to mutually consistent results but each has its own advantage.
Keywords:
theory;
projective space;
real projective;
dimensional real;
equation;
schwinger dyson
Journal Title: International Journal of Modern Physics A
Year Published: 2018
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Journal Title: International Journal of Modern Physics A
Year Published: 2018
Link to full text (if available)
Share on Social Media: Sign Up to like & get
recommendations!