The integration of G-invariant functions and the geometry of the Faddeev- Popov procedure
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Publication:578696
DOI10.1007/BF01238908zbMath0624.58031MaRDI QIDQ578696
Publication date: 1987
Published in: Communications in Mathematical Physics (Search for Journal in Brave)
Related Items (11)
The Polyakov path integral over bordered surfaces. II: The closed string off-shell amplitudes ⋮ A String Motivated Approach to the Relativistic Point Particle ⋮ On the Gribov ambiguity in the Polyakov string ⋮ The observer's ghost: notes on a field space connection ⋮ Perturbative Yang-Mills theory without Faddeev-Popov ghost fields ⋮ A global and stochastic analysis approach to bosonic strings and associated quantum fields ⋮ The Faddeev-Popov procedure and application to bosonic strings: An infinite dimensional point of view ⋮ The Polyakov path integral over bordered surfaces. III: The BRST extended closed string off-shell amplitudes ⋮ The Polyakov path integral over bordered surfaces (the open string amplitudes) ⋮ Local gravity theories in conformal superspace ⋮ The perturbative approach to path integrals: A succinct mathematical treatment
Cites Work
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- Global aspects of fixing the gauge in the Polyakov string and Einstein gravity
- The action of the group of bundle-automorphisms on the space of connections and the geometry of gauge theories
- Evaluation of the one loop string path integral
- The real analytic theory of Teichmüller space
- Some remarks on the Gribov ambiguity
- Instantons and fermions in the field of instanton
- Zeta function regularization of path integrals in curved spacetime
- The Feynman integral for singular Lagrangians
- The geometrical interpretation of the Faddeev–Popov determinant in Polyakov’s theory of random surfaces
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