The Klein-Gordon equation V - m²v = 0 describes the quantum-mechanics of relativistic spin-0 particles. Show that the solution for the function (F) in any volume V bounded by a surface S is unique if either Dirchlet or Neumann conditions are specified on S

The Klein-Gordon equation V - m²v = 0 describes the quantum-mechanics of relativistic spin-0 particles. Show that the solution for the function (F) in any volume V bounded by a surface S is unique if either Dirchlet or Neumann conditions are specified on S

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The Klein-Gordon equation
V – m²ý = 0
describes the quantum-mechanics of relativistic spin-0 particles.
Show that the solution for the function (F) in any volume V bounded by a surface S is
unique if either Dirchlet or Neumann conditions are specified on S.

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