Published August 3, 2019
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Espil short proof of generalized Cauchy's residue theorem
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Description
Shortly we can derive the Cauchy's residue tbeorem (its general form) just by integration of a Taylor Series "without" making any radius go to zero,even without the limit circumference idea take place.
The Espil's theorem it's a short proof of the Cauchy's generalized residue theorem.
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theorem 3.pdf
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