The double mellin-barnes type integrals and their applications to convolution theory

This book presents new results in the theory of the double Mellin-Barnes integrals popularly known as the general H-function of two variables.A general integral convolution is constructed by the authors and it contains Laplace convolution as a particular case and possesses a factorization property for one-dimensional H-transform. Many examples of convolutions for classical integral transforms are obtained and they can be applied for the evaluation of series and integrals.

• General H-function of two variables and the solution of its convergence problem
• main properties, series presentations and characteristic of the H-function
• H-function with the third characteristic and its particular cases
• G-function of two variables
• table of special cases of the G-function
• one-dimensional H-transform in spaces -1(L) and -1c,gamma(L) and its composition structure
• classical Laplace convolution and its new properties
• general integral convolution for H-function transform
• existence and factorization property of the convolution
• new examples of convolution for classical integral transforms
• generalized integral convolution
• general Leibniz rules and their integral analogs.