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Averi Mitchell

Averi Mitchell

Answered question

2022-06-18

Define the on l 1 ( Z ) by
( x y ) ( n ) = k = x ( n k ) y ( k ) , with  n Z  and  x , y l 1 ( Z )
I want to show that this defines a commutative Banach algebra.
Firstly I must show that for x , y , z l 1 ( Z ),
( x ( y z ) ) ( n ) = ( ( x y ) z ) ( n )
However, I am struggling to derive the expression for (x∗(y∗z))(n). I came up with something like
( x ( y z ) ) ( n )
( x ( y z ) ) ( n ) = k = x ( n k ) ( y ( n k ) z ( k ) )
But I am sure that is wrong.

Answer & Explanation

odmeravan5c

odmeravan5c

Beginner2022-06-19Added 20 answers

Convolution really comes out of gathering like powers of things such as powers of exponentials or of powers of a complex variable.
n = a n e i n θ n = b n e i n θ = n = ( j + k = n a j b k ) e i n θ = n = ( k = a k b n k ) e i n θ .
The above is rigorously justified for { a n } , { b n } 1 ( Z ) for all θ R because the series are absolutely convergent. And that's another way you can show that the convolution identities apply. The convolution problems are reduced to function multiplication of periodic functions on [ 0 , 2 π ], for example.
( n a n e i n θ n b n e i n θ ) n c n e i n θ = n a n e i n θ ( n b n e i n θ n a n e i n θ ) .
By uniqueness of coefficients, you find convolution is commutative and associative.
Jackson Duncan

Jackson Duncan

Beginner2022-06-20Added 10 answers

( x ( y z ) ) ( n ) = k i x ( n k ) y ( k i ) z ( i )

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