Simple bounds with best possible accuracy for ratios of modified Bessel functions

Abstract

The best bounds of the form B(α,β,γ,x)=(α+β2+γ2 x2)/x for ratios of modified Bessel functions are characterized: if α, β and γ are chosen in such a way that B(α,β,γ,x) is a sharp approximation for (x)=I-1 (x)/I(x) as x→ 0+ (respectively x→ +∞) and the graphs of the functions B(α,β,γ,x) and (x) are tangent at some x=x*>0, then B(α,β,γ,x) is an upper (respectively lower) bound for (x) for any positive x, and it is the best possible at x*. The same is true for the ratio (x)=K+1 (x)/K(x) but interchanging lower and upper bounds (and with a slightly more restricted range for ). Bounds with maximal accuracy at 0+ and +∞ are recovered in the limits x*→ 0+ and x*→ +∞, and for these cases the coefficients have simple expressions. For the case of finite and positive x* we provide uniparametric families of bounds which are close to the optimal bounds and retain their confluence properties.

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