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Math 412. The Orbit Stabilizer Theorem

(c)Karen E. Smith 2018 UM math Deptlicensed under a Creative CommonsBy-NC-SA International 412. The Orbit Stabilizer TheoremFix an action of a groupGon a setX. For each pointxofX, we have two important concepts:DEFINITION: Theorbitofx Xis the subset ofXO(x) :={g x|g G} : Thestabilizerofxis the subgroup ofGStab(x) ={g G|g x=x} :If a finite groupGacts on a setX, then for everyx X, we have|G|=|O(x)| |Stab(x)|.A. LetD4be the symmetry group of the square. Consider the natural action ofD4on the setR2byrotations and reflections of the whole space.(1) Complete the following chart which records, for different points of the setR2, the Orbit , Stabilizer ,and cardinalities of each. Use the notation{e, r, r2, r3, x, y, d, a}.(2) Now verify the Orbit Stabilizer Theorem for each of the five points in your chart. Easy: the numberof elements in the Orbit times the number of elements in the Stabilizer is the same, always 8, foreach THESTABILIZER OF EVERY POINT IS A a groupGacts on a setX.

By-NC-SA 4.0 International License. Math 412. The Orbit Stabilizer Theorem Fix an action of a group G on a set X. For each point x of X, we have two important concepts: DEFINITION: The orbit of x 2X is the subset of X O(x) := fg xjg 2GgˆX: DEFINITION: The …

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