Generating triangulations on closed surfaces with minimum degree at least 4

It will be shown that any two triangulations on a closed surface, except the sphere, with minimum degree at least 4 can be transformed into each other by a finite sequence of diagonal flips through those triangulations if they have a sufficiently large and same number of vertices. The same fact hold

In this article, we show that all quadrangulations of the sphere with minimum degree at least 3 can be constructed from the pseudo-double wheels, preserving the minimum degree at least 3, by a sequence of two kinds of transformations called "vertex-splitting" and "4-cycle addition." We also consider

## Reseirrch problems Problem 142. The symmetric genus of a group G is the minimum genus of a surface on which G acts. Let A, denote the alternating group of degree n, y(G) denote the genus of the group G, and a(G) the symmetric genus of G. Is the following conjecture true? Conjecture: For at leas