Many different physical situations can be described by multifractal distributions. A general framework is presented. Several specific examples are discussed.
Lai, Y. H. (2010). 以廣義弗羅奎茲(Floquet)方法處理奈米尺度下時變電子傳輸 [master's thesis, National Taiwan University]. Airiti Library. https://doi.org/10.6342/NTU.2010.00322
Joosten, J. J., Toscano, F. S., & Zenil, H. (2016). Fractal Dimension versus Process Complexity. Advances in Mathematical Physics, 2016(), 534-554. https://doi.org/10.1155/2016/5030593
Chen, T. J. (2011). Multi-fractal Analysis for Sofic Shift [master's thesis, National Central University]. Airiti Library. https://www.airitilibrary.com/Article/Detail?DocID=U0031-1903201314412912
Cattani, C. (2010). Fractals and Hidden Symmetries in DNA. Mathematical Problems in Engineering, 2010(), 267-297-118. https://doi.org/10.1155/2010/507056