Author(s): Patel Nirmal Rajnikant and Ritu Khanna

Abstract: This work discusses new developments and novel applications originating in Cauchy's Theorem and Cauchy's Integral Formula in complex analysis. Extending beyond traditional theory, the research delves into their significance in current mathematical and applied situations, such as computational complex analysis, quantum mechanics, and signal processing. Highlighting successes recently, research suggests how these core theorems increase numerical methods, allow advanced contour changes for techniques, and help to study complex systems. Research also extends the ideas of Cachy in their coordination in broader groups of tasks and their coordination, which they are still flexible and relevant, give new approaches to it. By diving into this subject, we show that the theorem and formula of Cachy remains powerful tools in many fields of science.

DOI: 10.22271/maths.2025.v10.i5b.2049

Pages: 143-149 | Views: 372 | Downloads: 8

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