Add to ORKGFunctional determinants of differential operators play a prominent role in many fields of theoretical and mathematical physics, ranging from condensed matter physics, to atomic, molecular and particle physics. They are, however, difficult to compute reliably in non-trivial cases. In one dimensional problems (i.e. functional determinants of ordinary differential operators), a classic result of Gel’fand and Yaglom greatly simplifies the computation of functional determinants. Here I report some recent progress in extending this approach to higher dimensions (i.e., functional determinants of partial differential operators), with applications in quantum field theory.
We generalize the method of computing functional determinants with a single excluded zero eigenvalue...
Relation between the vacuum eigenvalues of CFT Q-operators and spectral determinants of one-dimensio...
AbstractContinuing a line of investigation initiated in [F. Gesztesy, Y. Latushkin, K.A. Makarov, Ev...
Functional determinants of differential operators play a prominent role in many fields of theoretica...
We derive simple new expressions, in various dimensions, for the functional determinant of a radiall...
The Gelfand–Yaglom formula relates functional determinants of the one-dimensional second order diffe...
Results in the spectral theory of differential operators, and recent results on conformally covarian...
Abstract We study the zeta-function regularization of functional determinants of Laplace and Dirac-t...
The formalism which has been developed to give general expressions for the determinants of different...
We present a simple and accessible method which uses contour integration methods to derive formulae ...
We study discrete (duality) symmetries of functional determinants. An exact transformation of the ef...
We study the zeta-function regularization of functional determinants of Laplace and Dirac-type opera...
We define the combinatorial Dirichlet-to-Neumann operator and establish a gluing formula for determi...
This research introduces three operators, the bisection surface determinant, the rational surface de...
In connection with renormalization problems in quantum field theory, Pfaffians and Hafnians are cons...
We generalize the method of computing functional determinants with a single excluded zero eigenvalue...
Relation between the vacuum eigenvalues of CFT Q-operators and spectral determinants of one-dimensio...
AbstractContinuing a line of investigation initiated in [F. Gesztesy, Y. Latushkin, K.A. Makarov, Ev...
Functional determinants of differential operators play a prominent role in many fields of theoretica...
We derive simple new expressions, in various dimensions, for the functional determinant of a radiall...
The Gelfand–Yaglom formula relates functional determinants of the one-dimensional second order diffe...
Results in the spectral theory of differential operators, and recent results on conformally covarian...
Abstract We study the zeta-function regularization of functional determinants of Laplace and Dirac-t...
The formalism which has been developed to give general expressions for the determinants of different...
We present a simple and accessible method which uses contour integration methods to derive formulae ...
We study discrete (duality) symmetries of functional determinants. An exact transformation of the ef...
We study the zeta-function regularization of functional determinants of Laplace and Dirac-type opera...
We define the combinatorial Dirichlet-to-Neumann operator and establish a gluing formula for determi...
This research introduces three operators, the bisection surface determinant, the rational surface de...
In connection with renormalization problems in quantum field theory, Pfaffians and Hafnians are cons...
We generalize the method of computing functional determinants with a single excluded zero eigenvalue...
Relation between the vacuum eigenvalues of CFT Q-operators and spectral determinants of one-dimensio...
AbstractContinuing a line of investigation initiated in [F. Gesztesy, Y. Latushkin, K.A. Makarov, Ev...