Akademik Veri Yönetim Sistemi
XV Annual International Conference of the Georgian Mathematical Union, Batumi, Gürcistan, 1 Eylül - 06 Aralık 2025, ss.113, (Özet Bildiri)
Generalized integral transforms extend classical transforms by allowing the kernel function to depend on additional parameters. These transforms are useful in solving a wide range of problems in mathematics and applied sciences. In this study, a type of integral transform called the generalized Laplace transform is considered. It is shown that the iteration of this transform and the Fourier sine and Fourier cosine transforms naturally leads to what is known as the generalized Glasser transform. Some identities involving these transforms are also obtained, including their relations with the Mellin transform and the generalized Stieltjes transform.