Abstract
Some new integral relation of I- function
Highlights
The I- function of one variable is defined by Saxena [1] and we shall represent here in the following manner: I[z] =
The following formulas will be required in our investigation (i) The second class of multivariable polynomials given by Srivastava [8,9] is defined as follows:
We prove two integral formulae, which involving multivariable polynomials, and I function of one variable
Summary
The I- function of one variable is defined by Saxena [1] and we shall represent here in the following manner: I[z] =. In which log |z| represent the natural logarithm of |z| and arg |z| is not necessarily the principle value. Satyanarayana and Pragathi Kumar [5] has evaluated Some finite integrals involving multivariable polynomials, Agarwal [6] established integral involving the product of Srivastava’s polynomials and generalized Mellin-Barnes type of contour integral, Bhattar [7] established some integral formulas involving two H - function and multivariable’s general class of polynomiyals. Satyanarayana and Pragathi Kumar [5] has evaluated some finite integrals involving multivariable polynomials. I evaluated some new integrals involving multivariable polynomials, and I-function of one variable
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