An approach for the calculation of one-loop effective actions, vacuum energies, and spectral counting functions
From MaRDI portal
Publication:2452537
DOI10.1007/JHEP06(2010)070zbMath1288.83026arXiv1007.3214OpenAlexW3101807109MaRDI QIDQ2452537
Publication date: 4 June 2014
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1007.3214
Black holes (83C57) Perturbative methods of renormalization applied to problems in quantum field theory (81T15) Thermal quantum field theory (81T28)
Related Items (13)
Gravitational constant model and correction ⋮ Virial coefficients expressed by heat kernel coefficients ⋮ Solving eigenproblem by duality transform ⋮ Probability thermodynamics and probability quantum field ⋮ An indirect approach for quantum-mechanical eigenproblems: duality transforms ⋮ Exact solution of inverse-square-root potential \(V(r)=-\frac{\alpha}{\sqrt r}\) ⋮ Calculating eigenvalues of many-body systems from partition functions ⋮ Duality family of scalar field ⋮ Covariant perturbation expansion of off-diagonal heat kernel ⋮ Bose–Einstein condensation temperature of finite systems ⋮ A statistical mechanical approach to restricted integer partition functions ⋮ Scalar field in Reissner-Nordström spacetime: bound state and scattering state (with appendix on eliminating oscillation in partial sum approximation of periodic function) ⋮ Scattering state and bound state of scalar field in Schwarzschild spacetime: exact solution
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Scalar heat kernel with boundary in the worldline formalism
- The number of eigenstates: counting function and heat kernel
- Dark energy and stabilization of extra dimensions
- Mass dependence of vacuum energy
- Volume stabilization in a warped flux compactification model
- Local \(\zeta\)-function techniques vs. point-splitting procedure: A few rigorous results
- Heat kernel expansion: user's manual
- Chiral anomaly for local boundary conditions
- On the eigenfunctions of the Dirac operator on spheres and real hyperbolic spaces
- Heat kernel and number theory on NC-torus
- Integral equations for heat kernel in compound media
- Multiple zeta functions with arbitrary exponents
- Expressions for the zeta-function regularized Casimir energy
- Effective action of vacuum: the semiclassical approach
- Casimir energy for a massive fermionic quantum field with a spherical boundary
- Spectral functions and zeta functions in hyperbolic spaces
- A Panoramic View of Riemannian Geometry
- The a 3/2 heat kernel coefficient for oblique boundary conditions
- Non-smoothness of the boundary and the relevant heat kernel coefficients
- Heat Kernel and Quantum Gravity
- Heat kernel coefficients of the Laplace operator on the D-dimensional ball
- Conformal field theory, (2 + 1)-dimensional gravity and the BTZ black hole
- Can One Hear the Shape of a Drum?
This page was built for publication: An approach for the calculation of one-loop effective actions, vacuum energies, and spectral counting functions
