TOPOLOGY

▸ Loading the surfaces: sphere · torus · Möbius · Klein…
▸ Building parametric meshes & normals
▸ Calibrating the mug ⇄ donut deformation
▸ Computing invariants: genus g · Euler characteristic χ
▸ "A coffee mug = a donut" — starting up…
▸ Ready — Online. ✅
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⌂ Mathematics

Simulation room Topology

Topology
Online
homeomorphism · genus g · Euler χ
Topological invariants
🍩 Torus
Euler characteristic χ
Genus (holes) g
Euler χ
Sides
Orientable?
Surface
V − E + F
Tip
Topology is \"rubber-sheet geometry\": it only cares about what is PRESERVED under continuous stretching–bending (no cutting, no gluing). The number of holes and Euler χ are those invariants.
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∮K dA / 2π = χ stays constant as the surface deforms (Gauss–Bonnet) χ theory (constant)∮K dA/2π measured