Lasse Rempe's user avatar
Lasse Rempe's user avatar
Lasse Rempe's user avatar
Lasse Rempe
  • Member for 14 years, 1 month
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27 votes

Are the algebraic numbers dense everywhere on the boundary of the Mandelbrot set?

23 votes
Accepted

Analysis of the boundary of the Mandelbrot set

21 votes
Accepted

Which way for reading the proofs?

16 votes

13 months and not even one report. what would you do?

14 votes
Accepted

Transcendentality of all irrationals in the Cantor set

14 votes

Countable path-connected Hausdorff space

13 votes

Parametrization of the boundary of the Mandelbrot set

11 votes
Accepted

Can an "almost injective'' function exist between compact connected metric spaces?

10 votes

complement of a totally disconnected closed set in the plane

10 votes

Why are the Julia sets so simple? (quadratic family)

10 votes

Is the area of the Mandelbrot provably computable?

9 votes

Listing ORCiD in LaTeX papers

9 votes

Cutting a Julia set into infinitely many pieces at finitely many points

8 votes

How to solve $f(f(x)) = \cos(x)$?

8 votes
Accepted

Why are the Julia sets so simple? (quadratic family)

8 votes

Topological spaces whose continuous image is always closed

8 votes
Accepted

Is there a way to find regions of depth in the Mandelbrot set other than simply poking around?

8 votes

Connected but no path-connected components

7 votes
Accepted

Is there a reference for "computing $\pi$" using external rays of the Mandelbrot set?

7 votes

Experimental mathematics leading to major advances

7 votes
Accepted

When is a Newton basin fractal continuously determined by the roots of its polynomial?

7 votes

Failure of Mostow rigidity in dimension 2

7 votes
Accepted

Is the generalized Baire space complete?

7 votes

Entire function which diverges along every path

6 votes

Interesting results for open Riemann surfaces

6 votes

Holomorphic function bounded in a sector with angle $>\pi$

6 votes

Demystifying complex numbers

6 votes

Functions holomorphic on a region minus a Cantor set

6 votes
Accepted

Hausdorff dimension of Julia sets of quadratics not in the Mandelbrot set.

6 votes
Accepted

Is there an (almost) dense set of quadratic polynomials which is not in the interior of the Mandelbrot set?