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The Wandering Photon: A Probabilistic Model of Wave Propagation

This paper presents a simplified theoretical model for wave propagation in complex environments using the concept of a wandering photon. It explores the probability of absorption, scattering, and power loss in different scenarios and provides analytical solutions. The model is validated through comparisons with existing approaches and experimental data.

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The Wandering Photon: A Probabilistic Model of Wave Propagation

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  1. The wandering photon, a probabilistic model of wave propagation MASSIMO FRANCESCHETTI University of California at Berkeley

  2. From a long view of the history of mankind — seen from, say ten thousand years from now — there can be little doubt that the most significant event of the 19th century will be judged as Maxwell’s discovery of the laws of electrodynamics. The American Civil War will pale into provincial insignificance in comparison with this important scientific event of the same decade. Richard Feynman The true logic of this world is in the calculus of probabilities. James Clerk Maxwell

  3. Maxwell Equations in complex environments • No closed form solution • Use approximated numerical solvers

  4. We need to characterize the channel • Power loss • Bandwidth • Correlations

  5. Simplified theoretical model solved analytically Everything should be as simple as possible, but not simpler. Albert Einstein

  6. Simplified theoretical model solved analytically 2 parameters: hdensity gabsorption

  7. The photon’s stream

  8. The wandering photon Walks straight for a random length Stops with probability g Turns in a random direction with probability (1-g)

  9. One dimension

  10. x One dimension After a random length x with probability g stop with probability (1-g )/2continue in each direction

  11. x One dimension

  12. x One dimension

  13. x One dimension

  14. x One dimension

  15. x One dimension

  16. x One dimension

  17. x pdf of the length of the first step One dimension P(absorbed at x) ? 1/h is the average step length g is the absorption probability

  18. x pdf of the length of the first step One dimension P(absorbed at x) = f (|x|,g,h) 1/h is the average step length g is the absorption probability

  19. The sleepy drunk in higher dimensions

  20. The sleepy drunk in higher dimensions After a random length, with probability g stop with probability (1-g ) pick a random direction

  21. The sleepy drunk in higher dimensions

  22. The sleepy drunk in higher dimensions

  23. The sleepy drunk in higher dimensions

  24. The sleepy drunk in higher dimensions

  25. The sleepy drunk in higher dimensions

  26. The sleepy drunk in higher dimensions

  27. The sleepy drunk in higher dimensions

  28. The sleepy drunk in higher dimensions

  29. The sleepy drunk in higher dimensions

  30. The sleepy drunk in higher dimensions r P(absorbed at r) = f (r,g,h) 2D: exact solution as a series of Bessel polynomials 3D: approximated solution

  31. Derivation (2D) pdf of hitting an obstacle at r in the first step pdf of being absorbed at r Stop first step Stop second step Stop third step

  32. Derivation (2D) FT-1 FT

  33. Derivation (2D) The integrals in the series I1are Bessel Polynomials!

  34. Derivation (2D) Closed form approximation:

  35. Relatingf (r,g,h)to the power received each photon is a sleepy drunk, how many photons reach a given distance?

  36. All photons entering a sphere at distance r, per unit area All photons absorbed past distance r, per unit area o o Relatingf (r,g,h)to the power received Density model Flux model

  37. It is a simplified model At each step a photon may turn in a random direction (i.e. power is scattered uniformly at each obstacle)

  38. Classic approach wave propagation in random media relates comparison Validation Random walks Model with losses analytic solution Experiments

  39. Propagation in random media Transport theory Ishimaru A., 1978. Wave propagation and scattering in random Media. Academic press. Chandrasekhar, S., 1960, Radiative Transfer. Dover. Ulaby, F.T. and Elachi, C. (eds), 1990. Radar Polarimetry for Geoscience Applications. Artech House. small scattering objects

  40. Isotropic source uniform scattering obstacles

  41. r2D(r) r2F(r) Transport theory numerical integration plots in Ishimaru, 1978 Wandering Photon analytical results

  42. r2 density r2 flux Transport theory numerical integration plots in Ishimaru, 1978 Wandering Photon analytical results

  43. Classic approach wave propagation in random media relates comparison Validation Random walks Model with losses analytical solution Experiments

  44. Urban microcells Collected in Rome, Italy, by Antenna height: 6m Power transmitted: 6.3W Frequency: 900MHZ Measured average received power over 50 measurements Along a path of 40 wavelengths (Lee method)

  45. Data Collection location

  46. Collected data

  47. Power Loss Cellular systems Hata (1980) Microcellular systems Double regression formulas Typical values: empirical formulas

  48. Fitting the data Power Flux Power Density

  49. Simplified formula (dB/m losses at large distances) based on the theoretical, wandering photon model

  50. Fitting the data dashed blue line: wandering photon model red line: power law model, 4.7 exponent staircase green line: best monotone fit

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