TL;DR
This paper presents a new, simple inversion formula for analytical functions that is easier to apply than traditional methods, facilitating calculations in physical and mathematical contexts.
Contribution
The work introduces a novel inversion formula that simplifies the process of inverting analytical functions without requiring limits, applicable in various scientific problems.
Findings
The formula is straightforward and easy to use in hand calculations.
It does not require taking limits, unlike the Lagrange-Burmann formula.
Applicable to a wide range of physical and mathematical problems.
Abstract
This work introduces a new inversion formula for analytical functions. It is simple, generally applicable and straightforward to use both in hand calculations and for symbolic machine processing. It is easier to apply than the traditional Lagrange-Burmann formula since no taking limits is required. This formula is important for inverting functions in physical and mathematical problems.
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Taxonomy
TopicsQuantum and Classical Electrodynamics · Polynomial and algebraic computation