Conformal mappings are a class of functions in mathematics, particularly in complex analysis, that preserve angles locally. A function \( f \) is said to be conformal at a point if it is holomorphic (complex differentiable) at that point and its derivative \( f' \) is non-zero. This property ensures that the mapping preserves the shapes of infinitesimally small figures (though not necessarily their sizes).
Articles by others on the same topic
There are currently no matching articles.