Askey-Wilson version of Second Main Theorem for holomorphic curves in projective space
Abstract
In this paper, an Askey-Wilson version of the Wronskian-Casorati determinant W(f0, …, fn)(x) for meromorphic functions f0, …, fn is introduced to establish an Askey-Wilson version of the general form of the Second Main Theorem in projective space. This improves upon the original Second Main Theorem for the Askey-Wilson operator due to Chiang and Feng. In addition, by taking into account the number of irreducible components of hypersurfaces, an Askey-Wilson version of the Truncated Second Main Theorem for holomorphic curves into projective space with hypersurfaces located in l-subgeneral position is obtained.
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