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Topic:
hyperpolic geometry
Replies:
1
Last Post:
Jul 25, 2013 12:59 AM



mohamed
Posts:
9
From:
egypt
Registered:
7/25/13


hyperpolic geometry
Posted:
Jul 25, 2013 12:58 AM


the number of polygon in hyperbolic plane is uncountable proof
the area of polygon from gauss bonnet theorem is defined by 1/wdv integration i mean and now from Hahn Banach theorem we can find afunction m/wdv integration which represent an area of polygon and so i have bigger polygon and maximal function from banach theorem the maps are conformal of mobius and lines are distinguished and so m in m/wdv can belong to R



