Singular Eigenvalue Problems for the Equation y(n) + λp(x)y = 0

The paper studies singular eigenvalue problems for the equation y(n) + λp(x)y = 0 with boundary conditions imposed on the derivatives y(i) at the points x = a and x = ∞. We look for singular problems which are analogous to regular problems on a finite interval. It is characterized when each eigenfunction has a finite number of zeros and when the spectrum is discrete or continuous, respectively.