On the mixed derivatives of a separately twice differentiable function
classification
🧮 math.CA
keywords
derivativesfunctionmixedalmostdefineddifferentiableeverywherehaving
read the original abstract
We prove that a function $f(x,y)$ of real variables defined on a rectangle, having square integrable partial derivatives $f"_{xx}$ and $f"_{yy}$, has almost everywhere mixed derivatives $f"_{xy}$ and $f"_{yx}$.
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