Evaluation of integrals with a logarithmic singularity (Q1608265)

The paper is devoted to integration methods, that make the best use of the featutes of a given function class. For expansions of certain subintegral functions, the matrix of the coefficients can be found using the properties of shifted Chebyshev polynomials of the first kind. By expanding the integrand \(f(x)\) into a series in the shifted Chebyshev polynomials and thus obtaining a sufficiently large matrix, one can evaluate certain integrals with a logarithmic singularity.