Kappa Plane Wave Modes and Continuous Squeezing in Quantum Field Theory

Abstract

We introduce a new family of field modes in flat spacetime -- termed -plane wave modes -- constructed from -dependent linear combinations of Minkowski plane waves. These modes define a one-parameter family of vacua, |0, that smoothly interpolate between different quantizations, reducing to the Minkowski vacuum in the limit 0. We show that |0 is uniquely characterized as a continuous-mode squeezed vacuum, with frequency-dependent squeezing parameter r() satisfying r() = e-π /. We also derive two Bogoliubov transformations between -plane wave and -Rindler operators, which exhibit a universal form and smoothly interpolate between all known mode decompositions, including those of Minkowski, Rindler, and Unruh quantizations as limiting cases.