Abstract
Using a Q 2 dependent Regge ansatz for xF 3(x, Q 2) structure function, developed on the basis of observed similarity between the Q 2 behavior of F 2(x, Q 2) and xF 3(x, Q 2) structure functions at low x and low Q 2, Dokshitzer–Gribov–Lipatov–Altarelli–Parisi (DGLAP) evolution equation is solved analytically. The solutions are analyzed phenomenologically in comparison with experimental data taken from CCFR and NuTeV collaborations and it is observed that application of the Regge ansatz in DGLAP evolution equation leads to a very good agreement with experimental data.
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