Astrophysical Data Transmission in Planck Units

``Data Communication and Net Working'' by Forouzan expresses (an informatics equivalent of statistics) that $N$ (data rate or bits/second) divided by$ r$ (number of data elements per signal or log$_{2} \quad L)$ is the baud rate. For $N$ = 10$^{43}$ Planck times per second, and $L$ = 10$^{90}$, the number of photons in the universe, the baud rate is more than 10$^{40}$, so high a signal rate for the carriers of the attractive and repulsive pulses that we, the observers, would think that gravity is continuous, and not probabilistic. Any potential slight correction to the above as it may apply to the case, or its application to smaller baryon number (10$^{79})$ would not change the above implicit message, considering the order of magnitudes involved. This communicative aspect of gravity, and our postulation, slight modification to the inverse square law, in [1] that the probability of an interaction between two particles is inversely proportional to the square of their separations in integer number of Planck lengths, are mutually supplementary and complimentary, portraying two ducks that, not only walk like ducks, but also talk like ducks. Therefore, they are ducks. Refer to: [1] Goradia, Shantilal http://www.arXiv.org/pdf/physics/0210040v4.