Find a continuous, strictly monotonic function f:R->R (R the set of real numbers) which is non-differentiable on a very dense set.

For this problem, we'll call a set of real numbers very dense if it intersects every interval [a,b] in an infinite, uncountable number of elements.

Nothing new to contribute.  I agree with vswitchs' point that any summation of countable functions which have a countable number of non-differentiable points results in a final function which has a countable number of non-differentiable points.

Posted by Steve Herman on 2006-10-31 08:37:16