If a complex function is analytic it must hold Cauchy-Reimann Conditions, So conjugate of F(Z) is irrotational and solenoidal , Does this points mapping from $R^2 $ to a subspace of $R^2 $ ($R^1 $) , if F(Z) maps to $R^2 $ we dont get a divergent less field , But the above interpretation does not satisfy idea of conformal mappings , can any one correct me?
2026-03-25 15:58:57.1774454337
Mapping and Cauchy- Reimann conditions
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