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... • Know what is meant by the projection of a vector v onto a subspace S: Write v uniquely as s + s′ , s ∈ S and s′ ∈ S ⊥ . Then, this s is the “projection of v onto s”. Another way to find this projection is as follows: Find s ∈ S such that v − s is orthogonal to every basis vector of S. • Know basic ...
... • Know what is meant by the projection of a vector v onto a subspace S: Write v uniquely as s + s′ , s ∈ S and s′ ∈ S ⊥ . Then, this s is the “projection of v onto s”. Another way to find this projection is as follows: Find s ∈ S such that v − s is orthogonal to every basis vector of S. • Know basic ...
GENERATING SETS 1. Introduction In R
... We’ve found a pair of generators for Sn consisting of a transposition and n-cycle, and then a transposition and (n − 1)-cycle. These have orders 2 and n, and then 2 and n − 1. How small can the orders of a pair of generators of Sn be? Theorem 2.7. For n ≥ 3 except for n = 5, 6, 8, Sn is generated by ...
... We’ve found a pair of generators for Sn consisting of a transposition and n-cycle, and then a transposition and (n − 1)-cycle. These have orders 2 and n, and then 2 and n − 1. How small can the orders of a pair of generators of Sn be? Theorem 2.7. For n ≥ 3 except for n = 5, 6, 8, Sn is generated by ...
M.4. Finitely generated Modules over a PID, part I
... Step 3. By an appropriate inductive hypothesis, B is equivalent to a diagonal matrix diag(d2 , . . . , dr , 0, . . . , 0), with di dividing dj if 2 ≤ i ≤ j. The row and column operations effecting this equivalence do not change the first row or first column of the larger matrix, nor do they change t ...
... Step 3. By an appropriate inductive hypothesis, B is equivalent to a diagonal matrix diag(d2 , . . . , dr , 0, . . . , 0), with di dividing dj if 2 ≤ i ≤ j. The row and column operations effecting this equivalence do not change the first row or first column of the larger matrix, nor do they change t ...