Mathematics Subject Classification: 44A05, 44A35
With the help of a generalized convolution and prove Watson’s and Plancherel’s theorems. Using
generalized convolutions a class of Toeplitz plus Hankel integral equations,
and also a system of integro-differential equations are solved in closed form.
A generalized convolution with a weight function for the Fourier cosine
and sine transforms is introduced. Its properties and applications to solving
a system of integral equations are considered.
We deal with several classes of integral transformations of the form
where is an operator. In case is the identity operator, we obtain several operator properties on with weights for a generalized operator related to the Fourier cosine and the Kontorovich-Lebedev integral transforms. For a class of differential operators of infinite order, we prove the unitary property of these transforms on and define the inversion formula. Further, for an other class of differential operators of finite...
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