Literature¶
Emery, A., Johansson, O., Lobo, M., Abrous, A. (1991). A comparative study of methods for computing the diffuse radiation viewfactors for complex structures. In: 29th Structures, Structural Dynamics and Materials Conference. pp. AIAA-88-2223.
Ertürk, H., Howell, J. R. (2017). Monte Carlo Methods for Radiative Transfer. In: Handbook of Thermal Science and Engineering, Chapter 29. pp. 1-43.
Ferziger, J. H., Peric, M., Street, R. L. (2020). Numerische Strömungsmechanik. 2nd German edition. Springer Vieweg.
Gundlach, B., & Blum, J. (2013). A new method to determine the grain size of planetary regolith. Icarus, Volume 223(1), pp. 479-492.
Gutiérrez, P. J., Ortiz, J. L., Rodrigo, R., López-Moreno, J. J. (2001). Effects of irregular shape and topography in thermophysical models of heterogeneous cometary nuclei. Astronomy and Astrophysics, Volume 374. pp. 326-336.
Hayne, P. O., Bandfield, J. L., Siegler, M. A., Vasavada, A. R., Ghent, R. R., Williams, J. P., … & Paige, D. A. (2017). Global regolith thermophysical properties of the Moon from the Diviner Lunar Radiometer Experiment. Journal of Geophysical Research: Planets, Volume 122(12), pp. 2371-2400.
Ingersoll, A. P., Svitek, T., Murray, B. C. (1992). Stability of Polar Frosts in Spherical Bowl-Shaped Craters on Moon, Mercury, and Mars. Icarus, Volume 100, Issue 1. pp. 40-70
King, O., Warren, T., Bowles, N., Sefton-Nash, E., Fisackerly, R., Trautner, R. (2020). The Oxford 3D thermophysical model with application to PROSPECT/Luna 27 study landing sites. Planetary and Space Science, Volume 182. 104790.
Lagerros, J. S. V. (1997). Thermal physics of asteroids III. Irregular shapes and albedo variegations. Astronomy and Astrophysics, Volume 325. pp. 1226-1236.
Lewis, R. W., Nithiarasu, P., Seetharamu, K. N. (2004). Fundamentals of the Finite Element Method for Heat and Fluid Flow. John Wiley & Sons Ltd.
Maxwell, J. C. (1873). Theory of Heat. In: Treatise on Electricity and Magnetism, 2nd German edition. Longmans, Green.
Mazumder, S., Ravishankar, M. (2012). General procedure for calculation of diffuse view factors between arbitrary planar polygons. International Journal of Heat and Mass Transfer, Volume 55. pp. 7330–7335.
Okada, T., Fukuhara, T., Tanaka, S., Taguchi, M., Arai, T., Senshu, H., … & Tsuda, Y. (2020). Highly porous nature of a primitive asteroid revealed by thermal imaging. Nature, Volume 579(7800), pp. 518-522.
Patankar, S. V. (1980). Numerical heat transfer and fluid flow. Hemisphere Publishing Corporation.
Potter, S. F., Bertone, S., Schörghofer, N., Mazarico, E. (2023). Fast hierarchical low-rank view factor matrices for thermal irradiance on planetary surfaces. Journal of Computational Physics: X, Volume 17. 100130.
Saad, Y. (2003). Iterative Methods for Sparse Linear Systems. 2nd edition. Society for Industrial and Applied Mathematics.
Schörghofer, N., & Khatiwala, S. (2024). Semi-implicit Solver for the Heat Equation with Stefan–Boltzmann Law Boundary Condition. The Planetary Science Journal, Volume 5(5), pp. 120.
Siegel, R., Howell, J. R. (1971). Thermal Radiation Heat Transfer Volume III. Radiation Transfer With Absorbing, Emitting, and Scattering Media. NASA Special Publication SP-164.