Representations are derived for the basic scalar one-loop vertex Feynman integrals as meromorphic functions of the space-time dimension $d$ in terms of (generalized) hypergeometric functions $_2F_1$ and $F_1$. Values at asymptotic or exceptional kinematic points as well as expansions around the singular points at $d=4+2n$, $n$ non-negative integers, may be derived from the representations easily. The Feynman integrals studied here may be used as building blocks for the calculation of one-loop and higher-loop scalar and tensor amplitudes. From the recursion relation presented, higher n-point functions may be obtained in a straightforward manner
We study Feynman integrals in the representation with Schwinger parameters and derive recursive inte...
It is by now well established that, by means of the integration by part identities, all the integral...
We provide an analytic formula for the (rescaled) one-loop scalar hexagon integral {tilde {Phi}}{sub...
Representations are derived for the basic scalar one-loop vertex Feynman integrals as meromorphic fu...
The long-standing problem of representing the general massive one-loop Feynman integral as a meromor...
A systematic study of the scalar one-loop two-, three-, and four-point Feynman integrals is performe...
A systematic study of the scalar one-loop two-, three-, and four-point Feynman integrals is performe...
Fleischer J, Jegerlehner F, Tarasov OV. A new hypergeometric representation of one-loop scalar integ...
An algorithm for the reduction of one-loop n -point tensor integrals to basic integrals is proposed....
In this paper, we present analytic results for scalar one-loop two-, three-, four-point Feynman inte...
An algorithm for the reduction of one-loop n-point tensor integrals to basic integrals is proposed. ...
AbstractPresent and future high-precision tests of the Standard Model and beyond for the fundamental...
We study massive one-loop integrals by analytically continuing the Feynman integral to negative dime...
We describe methods for evaluating one-loop integrals in $4-2\e$ dimensions. We give a recursion rel...
The well-known D-dimensional Feynman integrals were shown, by Halliday and Ricotta, to be capable of...
We study Feynman integrals in the representation with Schwinger parameters and derive recursive inte...
It is by now well established that, by means of the integration by part identities, all the integral...
We provide an analytic formula for the (rescaled) one-loop scalar hexagon integral {tilde {Phi}}{sub...
Representations are derived for the basic scalar one-loop vertex Feynman integrals as meromorphic fu...
The long-standing problem of representing the general massive one-loop Feynman integral as a meromor...
A systematic study of the scalar one-loop two-, three-, and four-point Feynman integrals is performe...
A systematic study of the scalar one-loop two-, three-, and four-point Feynman integrals is performe...
Fleischer J, Jegerlehner F, Tarasov OV. A new hypergeometric representation of one-loop scalar integ...
An algorithm for the reduction of one-loop n -point tensor integrals to basic integrals is proposed....
In this paper, we present analytic results for scalar one-loop two-, three-, four-point Feynman inte...
An algorithm for the reduction of one-loop n-point tensor integrals to basic integrals is proposed. ...
AbstractPresent and future high-precision tests of the Standard Model and beyond for the fundamental...
We study massive one-loop integrals by analytically continuing the Feynman integral to negative dime...
We describe methods for evaluating one-loop integrals in $4-2\e$ dimensions. We give a recursion rel...
The well-known D-dimensional Feynman integrals were shown, by Halliday and Ricotta, to be capable of...
We study Feynman integrals in the representation with Schwinger parameters and derive recursive inte...
It is by now well established that, by means of the integration by part identities, all the integral...
We provide an analytic formula for the (rescaled) one-loop scalar hexagon integral {tilde {Phi}}{sub...