What Conditions Must p(x) and V(x) Fulfill for a Functional to Have an Extremum?

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For the functional J[y] to have an extremum, the functions p(x) and V(x) must satisfy specific conditions related to their continuity and positivity. The requirement that p(x) > 0 ensures that the term involving (y')^2 contributes positively to the integral. Additionally, V(x) must be non-negative to maintain the functional's boundedness. The constraint ∫_{a}^{b} y^2 dx = C ensures that the extremum occurs under a fixed norm. Proper formulation and clarity in LaTeX are crucial for accurately conveying these mathematical conditions.
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what are the requirements of a functional J[y] to exist in the form that its minimum will yield to a differential equation?..i mean let be the functional with condition:

J[y]=\int_{a}^{b}dx(p(x)(y`)^{2}+V(x)y^{2})

\int_{a}^{b}y^{2}dx=C with c a constant...

then what conditions should p and V(x) function fulfill in order to the functional have an extremum?..
 
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You do realize there's a bug in your LaTeX, don't you? When you make a post, you really should make sure it says what you think it's saying.

(This isn't the first time you've done this: you've had some pretty serious bugs in your LaTeX before too)
 

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