Inverse Laplace and Mellin integral transforms modified for use in quantum communications

TL;DR

This paper reviews and proposes modifications to inverse Laplace and Mellin transforms for application in quantum communication security protocols, leveraging complex contour integrals from quantum field theory.

Contribution

It introduces modified inverse integral transforms tailored for complex contour solutions in quantum field theory, enabling potential security applications in quantum computing.

Findings

Proposes modified inverse Laplace and Mellin transforms for complex contour integrals.

Highlights potential use in quantum computer security protocols.

Provides a theoretical framework for extended domain integral transforms.

Abstract

Integral transformations are useful mathematical tool to work out signals and wave-packets in electronic devices. They may be used in software protocols. Necessary knowledge may come from quantum field theory, in particular from quantum chromodynamics, in which the optic theorem and the renormalization group equation can be solved by a unique contour integral written in two different "dual" ways related between themselves by a complex map in the complex plane of Mellin variable. The inverse integral transformation should be modified to be applied for these contour integral solutions. These modified inverse transformations may be used in security protocols for quantum computers. Here we do a brief review of the basic integral transforms and propose their modification for the extended domains.