Mandelbrot Set

San Marco Bay

Dense lattice of dragon-scale filaments near c = −0.727 + 0.189i.

filamentsspirals

About this location

This region near the period-doubling sequence produces a remarkable tiling of overlapping dragon-scale-like structures reminiscent of Byzantine mosaics.

Coordinates

Real axis (Re)

-0.72733

Imaginary axis (Im)

0.18901i

Zoom

14.0K×

Max iterations

1,000

Complex address

$c = -0.72733 + 0.18901i$

Mathematical context

This location lies in the boundary region of the Mandelbrot set, defined by iterating $z_{n+1} = z_n^2 + c$ starting from $z_0 = 0$ . A point $c$ belongs to the set if the orbit never exceeds $|z| = 2$ .

At zoom $14.0K×$ , each screen pixel represents a region of the complex plane roughly $\Delta c \approx 3.57e-7$ wide — smaller than most atoms on a real object of the same size.

The iteration depth of 1000 means the algorithm checks up to 1,000 times before declaring a point interior (black). Higher values reveal finer boundary detail but require more computation.

Related locations

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Seahorse Valley

A classic Mandelbrot region filled with curling seahorse-like spirals.

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Elephant Valley

Massive elephant-trunk filaments wind through the boundary in repeating arcs.

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Feigenbaum Spiral

A dense spiral basin where bifurcating arms fold into one another.

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Lightning Filaments

Forked filaments branch outward like a high-voltage tree frozen in mid-strike.

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Mathematical context

At zoom $14.0K×$ , each screen pixel represents a region of the complex plane roughly $\Delta c \approx 3.57e-7$ wide — smaller than most atoms on a real object of the same size.

The iteration depth of 1000 means the algorithm checks up to 1,000 times before declaring a point interior (black). Higher values reveal finer boundary detail but require more computation.