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Vol. 8, Issue 2 (2019)

Fractal geometry: Theory and applications

Ajay Singh Rathore
Fractal Geometry, a profound branch of mathematics, has garnered significant attention due to its intricate structures and wide-ranging applications across various fields. This paper delves into the theory and applications of Fractal Geometry, elucidating its fundamental principles and exploring its diverse manifestations in natural phenomena and human-made systems. Beginning with an overview of fractals and their defining characteristics, we delve into the underlying mathematical frameworks that govern fractal behavior, including self-similarity, fractal dimension, and iterative algorithms. Subsequently, we investigate the practical implications of Fractal Geometry across disciplines such as physics, biology, finance, and image compression. Through insightful analyses and illustrative examples, this paper underscores the versatility and relevance of Fractal Geometry in modeling complex phenomena, optimizing processes, and unraveling the mysteries of our world. By synthesizing theoretical foundations with real-world applications, this research contributes to a deeper understanding of Fractal Geometry's significance in modern mathematics and its potential for driving innovation across various domains.
Pages: 876-879  |  87 Views  40 Downloads

The Pharma Innovation Journal
How to cite this article:
Ajay Singh Rathore. Fractal geometry: Theory and applications. Pharma Innovation 2019;8(2):876-879. DOI: 10.22271/tpi.2019.v8.i2n.25451

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