Find a function f which is not zero almost everywhere (f != 0 a.e.) and such that int_(RR) f(t)e^(-ts) dt=0 forall s in bbb(Z)

Kaila Branch

Kaila Branch

Answered question

2022-09-24

Find a function f which is not zero almost everywhere ( f 0   a . e .) and such that
R f ( t ) e t s d t = 0   s Z
I was thinking of taking an inverse Laplace transform of sine to help me with this, but apparently it does not exist.

Answer & Explanation

ticotaku86

ticotaku86

Beginner2022-09-25Added 12 answers

We are dealing with the bilateral Laplace transform.
It follows from the Cauchy integral theorem that
e ( t + 2 i π ) 2 e s t d t = e t 2 e s ( t 2 i π ) d t
whence take
f ( t ) = e t 2 e ( t + 2 i π ) 2

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