The First Solution for the Helical Flow of a Generalized Maxwell Fluid within Annulus of Cylinders by New Definition of Transcendental Function B_N (rr_n)
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机译:The First Solution for the Helical Flow of a Generalized Maxwell Fluid within Annulus of Cylinders by New Definition of Transcendental Function B_N (rr_n)
Most articles choose the transcendental function B-1(rr(n)) to define the finite Hankel transform, and very few articles choose B-0(rr(n)). The derivations of B-0(rr(n)) and B-1(rr(n)) are also considered the same. In this paper, we find that the derivative formulas for the transcend function B-N (rr(n)) are different and prove the derivative formulas for B-0(rr(n)) and B-1(rr(n)). Based on the exact formulas of B-0(rr(n)) and B-1(rr(n)), we keep on studying the helical flow of a generalized Maxwell fluid between two boundless coaxial cylinders. In this case, the inner and outer cylinders start to rotate around their axis of symmetry at different angular frequencies and slide at different linear velocities at time t = 0(+). We deduced the velocity field and shear stress via Laplace transform and finite Hankel transform and their inverse transforms. According to generalized G and R functions, the solutions we obtained are given in the form of integrals and series. The solution of ordinary Maxwell fluid has been also obtained by solving the limit of the general solution of fractional Maxwell fluid.
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