Monotonicity Properties of Determinants of Special Functions
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Abstract
We prove the absolute monotonicity or complete monotonicity of some
determinant functions whose entries involve
modified Bessel functions Iν, Kν, the confluent hypergeometric function Φ, and the Tricomi function Ψ. Our results recover and generalize some known determinantal inequalities.
We also show that a certain determinant formed by the Fibonacci numbers are nonnegative while determinants involving Hermite polynomials of imaginary arguments are
shown to be completely monotonic functions.
$$\psi^{(m)}(x)=({d^m}/{dx^m}) [\Gamma'(x)/\Gamma(x)],$$
Polygamma functions Confluent hypergeometric function Tricomi Ψ function Hermite polynomials Hypergeometric function Fibonacci numbers Spherical functions Complete monotonicity Absolute monotonicity
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© Springer 2006