Continuous nowhere differentiable multivariate functions
Abstract
Let U be an open set in Rd. A continuous function f U R is strongly nowhere differentiable if and only if for each γ∈(0,1] and for each unit speed C1,γ curve c [a,b] U, the composition f c [a,b] R is nowhere differentiable on (a,b). For bounded U, let U be the closure of U and C( U) be the Banach space of continuous real-valued functions on U with the sup norm. Theorem. In the sense of the Baire category theorem, almost every f∈ C( U) is strongly nowhere differentiable on U.
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