Stieltjes transformation

Template:Multiple issues In mathematics, the Stieltjes transformation Template:Math of a measure of density Template:Math on a real interval Template:Mvar is the function of the complex variable Template:Mvar defined outside Template:Mvar by the formula

$${\displaystyle S_{\rho }(z)=\underset{I}{\int }\frac{\rho (t)dt}{t-z},z\in ℂ\setminus I.}$$

Under certain conditions we can reconstitute the density function Template:Math starting from its Stieltjes transformation thanks to the inverse formula of Stieltjes-Perron. For example, if the density Template:Math is continuous throughout Template:Mvar, one will have inside this interval

$${\displaystyle \rho (x)=\underset{\epsilon \to 0^{+}}{\lim }\frac{S_{\rho }(x-i\epsilon )-S_{\rho }(x+i\epsilon )}{2i\pi }.}$$

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If the measure of density Template:Math has moments of any order defined for each integer by the equality $${\displaystyle m_n=\underset{I}{\int }{t}^n\rho (t)dt,}$$

then the Stieltjes transformation of Template:Math admits for each integer Template:Mvar the asymptotic expansion in the neighbourhood of infinity given by $${\displaystyle S_{\rho }(z)={\displaystyle \sum _{k=0}^n}\frac{m_k}{z^{k+1}}+o\left(\frac{1}{z^{n+1}}\right).}$$

Under certain conditions the complete expansion as a Laurent series can be obtained: $${\displaystyle S_{\rho }(z)={\displaystyle \sum _{n=0}^{\mathrm{\infty }}}\frac{m_n}{z^{n+1}}.}$$

The correspondence $(f,g)\mapsto \underset{I}{\int }f(t)g(t)\rho (t)dt$ defines an inner product on the space of continuous functions on the interval Template:Mvar.

If Template:Math is a sequence of orthogonal polynomials for this product, we can create the sequence of associated secondary polynomials by the formula $${\displaystyle Q_n(x)=\underset{I}{\int }\frac{P_n(t)-P_n(x)}{t-x}\rho (t)dt.}$$

It appears that $F_n(z)=\frac{Q_n(z)}{P_n(z)}$ is a Padé approximation of Template:Math in a neighbourhood of infinity, in the sense that $${\displaystyle S_{\rho }(z)-\frac{Q_n(z)}{P_n(z)}=O\left(\frac{1}{z^{2n}}\right).}$$

Since these two sequences of polynomials satisfy the same recurrence relation in three terms, we can develop a continued fraction for the Stieltjes transformation whose successive convergents are the fractions Template:Math.

The Stieltjes transformation can also be used to construct from the density Template:Math an effective measure for transforming the secondary polynomials into an orthogonal system. (For more details see the article secondary measure.)

• Orthogonal polynomials
• Secondary polynomials
• Secondary measure

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