Prodigi
Lotus, Sunset Fine Art Print
Lotus, Sunset Fine Art Print
Couldn't load pickup availability
A non-empty open set in the plane is "simply-connected" if any two points of the set are joined by a path lying in the set, and if every closed path in the set can be "shrunk to a point" staying within the set. Qualitatively, the set is in one piece, and does not enclose any holes.
A disk, a rectangle, and the plane with a closed ray removed are simply-connected. A union of two disjoint disks, an annulus, and the plane with one or more points removed are not simply-connected.
A "conformal equivalence" of open sets is an invertible, complex-differentiable mapping. The Riemann mapping theorem asserts that any two simply-connected sets other than the plane itself are conformally equivalent. The lotus is the image of a polar coordinate grid under a conformal equivalence from the disk to the disk with the vertical radial ray removed.
Printed on museum-quality fine art print paper (200 gsm) with a textured, matte finish.Share
![Lotus, Sunset Fine Art Print](http://diffgeom.com/cdn/shop/products/961332df-b3b9-43d6-8995-720a0ff9a9d0.jpg?v=1701625055&width=1445)
![Lotus, Sunset Fine Art Print](http://diffgeom.com/cdn/shop/products/d94b919e-d8fb-4622-bcb9-7aad6057e39c.jpg?v=1701625055&width=1445)
![Lotus, Sunset Fine Art Print](http://diffgeom.com/cdn/shop/products/ce68b4b0-ff49-4fa1-91ff-fc47edcc5e92.jpg?v=1701625055&width=1445)