Suzuki, Alfredo Takashi [UNESP]2014-05-272014-05-272006-10-01Acta Physica Polonica B, v. 37, n. 10, p. 2767-2779, 2006.0587-4254http://hdl.handle.net/11449/69149The standard way of evaluating residues and some real integrals through the residue theorem (Cauchy's theorem) is well-known and widely applied in many branches of Physics. Herein we present an alternative technique based on the negative dimensional integration method (NDIM) originally developed to handle Feynman integrals. The advantage of this new technique is that we need only to apply Gaussian integration and solve systems of linear algebraic equations, with no need to determine the poles themselves or their residues, as well as obtaining a whole class of results for differing orders of poles simultaneously.2767-2779engAlgebraic equationsCauchy's theoremGaussian integrationNegative dimensional integration method (NDIM)IntegrationLinear algebraLinear equationsPoles and zerosTheorem provingIntegral equationsArtigoWOS:000241402900003Acesso aberto2-s2.0-337500149452-s2.0-33750014945.pdf7511139477883318