The Super Dirac δ Function and Its Applications
We introduce and study the super Dirac delta function, which takes the form of a convex sum of delta functions with unique coefficients that produce a delta function that is arbitrary far from all the delta functions of the convex sum. We provide applications of the proposed distribution in von Neumann quantum measurements. Finally, we show that the results can be extended into arbitrary distribution functions.
Aharonov, Y., Shushi, T. The super Dirac δ function and its applications. Quantum Stud.: Math. Found. (2022). https://doi.org/10.1007/s40509-022-00274-0
This article was originally published in Quantum Studies: Mathematics and Foundations in 2022. https: