Question
Download Solution PDFAssume that Φ is harmonic in domain D and for x0 ∈ D, B(x0, r) ⊆ D, then the average value of Φ over the boundary of B(x0, r) equals
Answer (Detailed Solution Below)
Detailed Solution
Download Solution PDFConcept:
Mean value Property of Harmonic function,
Let, B(x, r) = Ball of radius r about x in Rn
∂B(x, r) = boundary of the ball of radius r about x in Rn
For a function u defined on ∂B (x, r), the average of u on ∂B(x, r) is given as:
Now, if u is the harmonic function, then, we get:
Analysis:
ϕ is harmonic in domain D,
B(x0, r) ⊆ D
The average value of ϕ over the boundary of B(x0, r) is given as:
∴ Option 1 is the correct answer.
Conclusion: if ϕ is harmonic, then it's average (mean) value over a sphere centered at x0 is independent of r.
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