Answer: Show that if there does not exist a real-valued function such that for all in
Chapter 14, Problem 76(choose chapter or problem)
Show that if \(\lambda>\frac{1}{2}\) there does not exist a real-valued function u such that for all x in the closed interval \(0 \leq x \leq 1, u(x)=1+\lambda \int_{x}^{1} u(y) u(y-x) d y\).
Text Transcription:
lambda > 1 / 2
0 leq x leq 1, u(x) = 1 + lambda int_{x}^{1} u(y) u(y - x) dy
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