On an approach for evaluating certain trigonometric character sums using the discrete time heat kernel

“…where we should notice that the sum starts from t = 1. We follow the similar path as the derivation of f c ν (z) in [38]. We find that the series sum f c ν (z) satisfies…”

“…The discrete time heat kernels for the D-dimensional canonical scalar model was discussed in [19]. The discrete time heat kernels for the graph Laplacian are recently dealt with in [38].…”

“…and that the differential equation (2.5) is recovered by the continuum limit, since 1 ϵ ∆ → ∂ ∂s , if ϵ → 0. The solution of (3.3) can be expressed by using the discrete modified Bessel function I c ν (t) [38,44,45],…”

“…Now, let us return to our present DD model. For the heat kernel from the forward difference equation, the simplest modification method described above turns out not to be effective, because I c 0 (0) = 1, I c n (t) = 0 for t < n [38] and a = 1 − ϵf 2 (2 + p 2 /f 2 ) → −∞ when p 2 /f 2 → ∞, it is not immediately clear if the elimination of finite terms for small numbers t makes the propagator behaves better at high energy (p 2 /f 2 → ∞). Another idea for the heat kernel from the forward difference equation, we consider eliminating the infinite terms of the even powers of a in the sum over t. Indeed, the behavior of G(p 2 ) at large p 2 becomes better, but the sign change of a at large p 2 results in a 'cut' in the complex plane of p 2 that are difficult to interpret.…”

“…Therefore, it is significant to study the mathematical properties of the discrete time heat kernel, albeit for a simple model. Fortunately, discrete time heat kernel for a certain class of graph Laplacians has recently been discussed in [38], so we can manage to apply it to our calculations.…”

Discrete time heat kernel and UV modified propagators with dimensional deconstruction

“…where we should notice that the sum starts from t = 1. We follow the similar path as the derivation of f c ν (z) in [38]. We find that the series sum f c ν (z) satisfies…”

“…The discrete time heat kernels for the D-dimensional canonical scalar model was discussed in [19]. The discrete time heat kernels for the graph Laplacian are recently dealt with in [38].…”

“…and that the differential equation (2.5) is recovered by the continuum limit, since 1 ϵ ∆ → ∂ ∂s , if ϵ → 0. The solution of (3.3) can be expressed by using the discrete modified Bessel function I c ν (t) [38,44,45],…”

“…Now, let us return to our present DD model. For the heat kernel from the forward difference equation, the simplest modification method described above turns out not to be effective, because I c 0 (0) = 1, I c n (t) = 0 for t < n [38] and a = 1 − ϵf 2 (2 + p 2 /f 2 ) → −∞ when p 2 /f 2 → ∞, it is not immediately clear if the elimination of finite terms for small numbers t makes the propagator behaves better at high energy (p 2 /f 2 → ∞). Another idea for the heat kernel from the forward difference equation, we consider eliminating the infinite terms of the even powers of a in the sum over t. Indeed, the behavior of G(p 2 ) at large p 2 becomes better, but the sign change of a at large p 2 results in a 'cut' in the complex plane of p 2 that are difficult to interpret.…”

“…Therefore, it is significant to study the mathematical properties of the discrete time heat kernel, albeit for a simple model. Fortunately, discrete time heat kernel for a certain class of graph Laplacians has recently been discussed in [38], so we can manage to apply it to our calculations.…”

Discrete time heat kernel and UV modified propagators with dimensional deconstruction

The Parametrix Construction of the Heat Kernel on a Graph

Further developments of basic trigonometric power sums