Let A be a commutative unital Banach algebra. We know that for any two elements of A

Lydia Carey

Lydia Carey

Answered question

2022-06-13

Let A be a commutative unital Banach algebra. We know that for any two elements of A σ ( a + b ) σ ( a ) + σ ( b ) and σ ( a b ) σ ( a ) σ ( b ).
I know that if we consider 2 × 2 matrices, then we get examples of a non-commutative unital banach algebra such that σ ( a ) + σ ( b ) σ ( a + b ) and σ ( a ) σ ( b ) σ ( a b ).
I wonder if there are examples of a and b in a non-unital commutative A such that σ ( a ) + σ ( b ) σ ( a + b ) and σ ( a ) σ ( b ) σ ( a b ). (I can't think of any at the moment)

Answer & Explanation

Bruno Hughes

Bruno Hughes

Beginner2022-06-14Added 24 answers

Let A = C 2 C 0 ( R ). For the sum, you could do
a = [ 1 1 ] 0 , b = [ 1 1 ] 0.
Then
σ ( a ) + σ ( b ) = { 2 , 0 , 2 } { 0 } = σ ( a + b ) .
For the product,
a = [ 1 0 ] 0 , b = [ 0 1 ] 0.
Then
σ ( a ) σ ( b ) = { 0 , 1 } { 0 } = σ ( a b ) .

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