Spectral theory of ordinary differential equations

In mathematics, the spectral theory of ordinary differential equations is the part of spectral theory concerned with the determination of the spectrum and eigenfunction expansion associated with a linear ordinary differential equation. In his dissertation, Hermann Weyl generalized the classical Sturm–Liouville theory on a finite closed interval to second order differential operators with singularities at the endpoints of the interval, possibly semi-infinite or infinite. Unlike the classical case, the spectrum may no longer consist of just a countable set of eigenvalues, but may also contain a continuous part. In this case the eigenfunction expansion involves an integral over the continuous part with respect to a spectral measure, given by the TitchmarshKodaira formula. The theory was put in its final simplified form for singular differential equations of even degree by Kodaira and others, using von Neumann's spectral theorem. It has had important applications in quantum mechanics, operator theory and harmonic analysis on semisimple Lie groups.

Introduction

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Spectral theory for second order ordinary differential equations on a compact interval was developed by Jacques Charles François Sturm and Joseph Liouville in the nineteenth century and is now known as Sturm–Liouville theory. In modern language, it is an application of the spectral theorem for compact operators due to David Hilbert. In his dissertation, published in 1910, Hermann Weyl extended this theory to second order ordinary differential equations with singularities at the endpoints of the interval, now allowed to be infinite or semi-infinite. He simultaneously developed a spectral theory adapted to these special operators and introduced boundary conditions in terms of his celebrated dichotomy between limit points and limit circles.

In the 1920s, John von Neumann established a general spectral theorem for unbounded self-adjoint operators, which Kunihiko Kodaira used to streamline Weyl's method. Kodaira also generalised Weyl's method to singular ordinary differential equations of even order and obtained a simple formula for the spectral measure. The same formula had also been obtained independently by E. C. Titchmarsh in 1946 (scientific communication between Japan and the United Kingdom had been interrupted by World War II). Titchmarsh had followed the method of the German mathematician Emil Hilb, who derived the eigenfunction expansions using complex function theory instead of operator theory. Other methods avoiding the spectral theorem were later developed independently by Levitan, Levinson and Yoshida, who used the fact that the resolvent of the singular differential operator could be approximated by compact resolvents corresponding to Sturm–Liouville problems for proper subintervals. Another method was found by Mark Grigoryevich Krein; his use of direction functionals was subsequently generalised by Izrail Glazman to arbitrary ordinary differential equations of even order.

Weyl applied his theory to Carl Friedrich Gauss's hypergeometric differential equation, thus obtaining a far-reaching generalisation of the transform formula of Gustav Ferdinand Mehler (1881) for the Legendre differential equation, rediscovered by the Russian physicist Vladimir Fock in 1943, and usually called the Mehler–Fock transform. The corresponding ordinary differential operator is the radial part of the Laplacian operator on 2-dimensional hyperbolic space. More generally, the Plancherel theorem for SL(2,R) of Harish Chandra and GelfandNaimark can be deduced from Weyl's theory for the hypergeometric equation, as can the theory of spherical functions for the isometry groups of higher dimensional hyperbolic spaces. Harish Chandra's later development of the Plancherel theorem for general real semisimple Lie groups was strongly influenced by the methods Weyl developed for eigenfunction expansions associated with singular ordinary differential equations. Equally importantly the theory also laid the mathematical foundations for the analysis of the Schrödinger equation and scattering matrix in quantum mechanics.

Solutions of ordinary differential equations

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Reduction to standard form

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Let D be the second order differential operator on (a, b) given by   where p is a strictly positive continuously differentiable function and q and r are continuous real-valued functions.

For x0 in (a, b), define the Liouville transformation ψ by  

If   is the unitary operator defined by   then   and  

Hence,   where   and  

The term in g′ can be removed using an Euler integrating factor. If S′/S = −R/2, then h = Sg satisfies   where the potential V is given by  

The differential operator can thus always be reduced to one of the form [1]  

Existence theorem

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The following is a version of the classical Picard existence theorem for second order differential equations with values in a Banach space E.[2]

Let α, β be arbitrary elements of E, A a bounded operator on E and q a continuous function on [a, b].

Then, for c = a or c = b, the differential equation   has a unique solution f in C2([a,b], E) satisfying the initial conditions  

In fact a solution of the differential equation with these initial conditions is equivalent to a solution of the integral equation   with T the bounded linear map on C([a,b], E) defined by   where K is the Volterra kernel   and  

Since Tk tends to 0, this integral equation has a unique solution given by the Neumann series  

This iterative scheme is often called Picard iteration after the French mathematician Charles Émile Picard.

Fundamental eigenfunctions

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If f is twice continuously differentiable (i.e. C2) on (a, b) satisfying Df = λf, then f is called an eigenfunction of D with eigenvalue λ.

  • In the case of a compact interval [a, b] and q continuous on [a, b], the existence theorem implies that for c = a or c = b and every complex number λ there a unique C2 eigenfunction fλ on [a, b] with fλ(c) and fλ(c) prescribed. Moreover, for each x in [a, b], fλ(x) and fλ(x) are holomorphic functions of λ.
  • For an arbitrary interval (a, b) and q continuous on (a, b), the existence theorem implies that for c in (a, b) and every complex number λ there a unique C2 eigenfunction fλ on (a, b) with fλ(c) and fλ(c) prescribed. Moreover, for each x in (a, b), fλ(x) and fλ(x) are holomorphic functions of λ.

Green's formula

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If f and g are C2 functions on (a, b), the Wronskian W(f, g) is defined by  

Green's formula - which in this one-dimensional case is a simple integration by parts - states that for x, y in (a, b)  

When q is continuous and f, g are C2 on the compact interval [a, b], this formula also holds for x = a or y = b.

When f and g are eigenfunctions for the same eigenvalue, then   so that W(f, g) is independent of x.

Classical Sturm–Liouville theory

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Let [a, b] be a finite closed interval, q a real-valued continuous function on [a, b] and let H0 be the space of C2 functions f on [a, b] satisfying the Robin boundary conditions   with inner product  

In practice usually one of the two standard boundary conditions:

is imposed at each endpoint c = a, b.

The differential operator D given by   acts on H0. A function f in H0 is called an eigenfunction of D (for the above choice of boundary values) if Df = λ f for some complex number λ, the corresponding eigenvalue. By Green's formula, D is formally self-adjoint on H0, since the Wronskian W(f, g) vanishes if both f, g satisfy the boundary conditions:  

As a consequence, exactly as for a self-adjoint matrix in finite dimensions,

It turns out that the eigenvalues can be described by the maximum-minimum principle of RayleighRitz[3] (see below). In fact it is easy to see a priori that the eigenvalues are bounded below because the operator D is itself bounded below on H0:

  for some finite (possibly negative) constant  .

In fact, integrating by parts,  

For Dirichlet or Neumann boundary conditions, the first term vanishes and the inequality holds with M = inf q.

For general Robin boundary conditions the first term can be estimated using an elementary Peter-Paul version of Sobolev's inequality:

"Given ε > 0, there is constant R > 0 such that |f(x)|2ε (f′, f′) + R (f, f) for all f in C1[a, b]."

In fact, since   only an estimate for f(b) is needed and this follows by replacing f(x) in the above inequality by (xa)n·(ba)n·f(x) for n sufficiently large.

Green's function (regular case)

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From the theory of ordinary differential equations, there are unique fundamental eigenfunctions φλ(x), χλ(x) such that

  • D φλ = λ φλ, φλ(a) = sin α, φλ'(a) = cos α
  • D χλ = λ χλ, χλ(b) = sin β, χλ'(b) = cos β

which at each point, together with their first derivatives, depend holomorphically on λ. Let   be an entire holomorphic function.

This function ω(λ) plays the role of the characteristic polynomial of D. Indeed, the uniqueness of the fundamental eigenfunctions implies that its zeros are precisely the eigenvalues of D and that each non-zero eigenspace is one-dimensional. In particular there are at most countably many eigenvalues of D and, if there are infinitely many, they must tend to infinity. It turns out that the zeros of ω(λ) also have mutilplicity one (see below).

If λ is not an eigenvalue of D on H0, define the Green's function by  

This kernel defines an operator on the inner product space C[a,b] via  

Since Gλ(x,y) is continuous on [a, b] × [a, b], it defines a Hilbert–Schmidt operator on the Hilbert space completion H of C[a, b] = H1 (or equivalently of the dense subspace H0), taking values in H1. This operator carries H1 into H0. When λ is real, Gλ(x,y) = Gλ(y,x) is also real, so defines a self-adjoint operator on H. Moreover,

  • Gλ (Dλ) = I on H0
  • Gλ carries H1 into H0, and (Dλ) Gλ = I on H1.

Thus the operator Gλ can be identified with the resolvent (Dλ)−1.

Spectral theorem

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Theorem — The eigenvalues of D are real of multiplicity one and form an increasing sequence λ1 < λ2 < ⋯ tending to infinity.

The corresponding normalised eigenfunctions form an orthonormal basis of H0.

The k-th eigenvalue of D is given by the minimax principle  

In particular if q1q2, then  

In fact let T = Gλ for λ large and negative. Then T defines a compact self-adjoint operator on the Hilbert space H. By the spectral theorem for compact self-adjoint operators, H has an orthonormal basis consisting of eigenvectors ψn of T with n = μn ψn, where μn tends to zero. The range of T contains H0 so is dense. Hence 0 is not an eigenvalue of T. The resolvent properties of T imply that ψn lies in H0 and that  

The minimax principle follows because if   then λ(G) = λk for the linear span of the first k − 1 eigenfunctions. For any other (k − 1)-dimensional subspace G, some f in the linear span of the first k eigenvectors must be orthogonal to G. Hence λ(G) ≤ (Df,f)/(f,f) ≤ λk.

Wronskian as a Fredholm determinant

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For simplicity, suppose that mq(x) ≤ M on [0, π] with Dirichlet boundary conditions. The minimax principle shows that  

It follows that the resolvent (Dλ)−1 is a trace-class operator whenever λ is not an eigenvalue of D and hence that the Fredholm determinant det I − μ(Dλ)−1 is defined.

The Dirichlet boundary conditions imply that  

Using Picard iteration, Titchmarsh showed that φλ(b), and hence ω(λ), is an entire function of finite order 1/2:  

At a zero μ of ω(λ), φμ(b) = 0. Moreover,   satisfies (Dμ)ψ = φμ. Thus  

This implies that[4]

μ is a simple zero of ω(λ).

For otherwise ψ(b) = 0, so that ψ would have to lie in H0. But then   a contradiction.

On the other hand, the distribution of the zeros of the entire function ω(λ) is already known from the minimax principle.

By the Hadamard factorization theorem, it follows that[5]   for some non-zero constant C.

Hence  

In particular if 0 is not an eigenvalue of D  

Tools from abstract spectral theory

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Functions of bounded variation

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A function ρ(x) of bounded variation[6] on a closed interval [a, b] is a complex-valued function such that its total variation V(ρ), the supremum of the variations   over all dissections   is finite. The real and imaginary parts of ρ are real-valued functions of bounded variation. If ρ is real-valued and normalised so that ρ(a) = 0, it has a canonical decomposition as the difference of two bounded non-decreasing functions:   where ρ+(x) and ρ(x) are the total positive and negative variation of ρ over [a, x].

If f is a continuous function on [a, b] its Riemann–Stieltjes integral with respect to ρ   is defined to be the limit of approximating sums   as the mesh of the dissection, given by sup |xr+1xr|, tends to zero.

This integral satisfies  

and thus defines a bounded linear functional on C[a, b] with norm ‖ = V(ρ).

Every bounded linear functional μ on C[a, b] has an absolute value |μ| defined for non-negative f by[7]  

The form |μ| extends linearly to a bounded linear form on C[a, b] with norm μ and satisfies the characterizing inequality   for f in C[a, b]. If μ is real, i.e. is real-valued on real-valued functions, then   gives a canonical decomposition as a difference of positive forms, i.e. forms that are non-negative on non-negative functions.

Every positive form μ extends uniquely to the linear span of non-negative bounded lower semicontinuous functions g by the formula[8]   where the non-negative continuous functions fn increase pointwise to g.

The same therefore applies to an arbitrary bounded linear form μ, so that a function ρ of bounded variation may be defined by[9]   where χA denotes the characteristic function of a subset A of [a, b]. Thus μ = and μ‖ = ‖. Moreover μ+ = + and μ = .

This correspondence between functions of bounded variation and bounded linear forms is a special case of the Riesz representation theorem.

The support of μ = is the complement of all points x in [a, b] where ρ is constant on some neighborhood of x; by definition it is a closed subset A of [a, b]. Moreover, μ((1 − χA)f) = 0, so that μ(f) = 0 if f vanishes on A.

Spectral measure

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Let H be a Hilbert space and   a self-adjoint bounded operator on H with  , so that the spectrum   of   is contained in  . If   is a complex polynomial, then by the spectral mapping theorem   and hence   where   denotes the uniform norm on C[0, 1]. By the Weierstrass approximation theorem, polynomials are uniformly dense in C[0, 1]. It follows that   can be defined  , with   and  

If   is a lower semicontinuous function on [0, 1], for example the characteristic function   of a subinterval of [0, 1], then   is a pointwise increasing limit of non-negative  .

If   is a vector in H, then the vectors   form a Cauchy sequence in H, since, for  ,   and   is bounded and increasing, so has a limit.

It follows that   can be defined by[a]  

If   and η are vectors in H, then   defines a bounded linear form   on H. By the Riesz representation theorem   for a unique normalised function   of bounded variation on [0, 1].

  (or sometimes slightly incorrectly   itself) is called the spectral measure determined by   and η.

The operator   is accordingly uniquely characterised by the equation  

The spectral projection   is defined by   so that  

It follows that   which is understood in the sense that for any vectors   and  ,  

For a single vector   is a positive form on [0, 1] (in other words proportional to a probability measure on [0, 1]) and   is non-negative and non-decreasing. Polarisation shows that all the forms   can naturally be expressed in terms of such positive forms, since  

If the vector   is such that the linear span of the vectors   is dense in H, i.e.   is a cyclic vector for  , then the map   defined by   satisfies  

Let   denote the Hilbert space completion of   associated with the possibly degenerate inner product on the right hand side.[b] Thus   extends to a unitary transformation of   onto H.   is then just multiplication by   on  ; and more generally   is multiplication by  . In this case, the support of   is exactly  , so that

the self-adjoint operator becomes a multiplication operator on the space of functions on its spectrum with inner product given by the spectral measure.

Weyl–Titchmarsh–Kodaira theory

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The eigenfunction expansion associated with singular differential operators of the form   on an open interval (a, b) requires an initial analysis of the behaviour of the fundamental eigenfunctions near the endpoints a and b to determine possible boundary conditions there. Unlike the regular Sturm–Liouville case, in some circumstances spectral values of D can have multiplicity 2. In the development outlined below standard assumptions will be imposed on p and q that guarantee that the spectrum of D has multiplicity one everywhere and is bounded below. This includes almost all important applications; modifications required for the more general case will be discussed later.

Having chosen the boundary conditions, as in the classical theory the resolvent of D, (D + R)−1 for R large and positive, is given by an operator T corresponding to a Green's function constructed from two fundamental eigenfunctions. In the classical case T was a compact self-adjoint operator; in this case T is just a self-adjoint bounded operator with 0 ≤ TI. The abstract theory of spectral measure can therefore be applied to T to give the eigenfunction expansion for D.

The central idea in the proof of Weyl and Kodaira can be explained informally as follows. Assume that the spectrum of D lies in [1, ∞) and that T = D−1 and let   be the spectral projection of D corresponding to the interval [1, λ]. For an arbitrary function f define   f(x, λ) may be regarded as a differentiable map into the space of functions of bounded variation ρ; or equivalently as a differentiable map   into the Banach space E of bounded linear functionals on C[α,β] whenever [α, β] is a compact subinterval of [1, ∞).

Weyl's fundamental observation was that dλ f satisfies a second order ordinary differential equation taking values in E:  

After imposing initial conditions on the first two derivatives at a fixed point c, this equation can be solved explicitly in terms of the two fundamental eigenfunctions and the "initial value" functionals  

This point of view may now be turned on its head: f(c, λ) and fx(c, λ) may be written as   where ξ1(λ) and ξ2(λ) are given purely in terms of the fundamental eigenfunctions. The functions of bounded variation   determine a spectral measure on the spectrum of D and can be computed explicitly from the behaviour of the fundamental eigenfunctions (the Titchmarsh–Kodaira formula).

Limit circle and limit point for singular equations

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Let q(x) be a continuous real-valued function on (0, ∞) and let D be the second order differential operator   on (0, ∞). Fix a point c in (0, ∞) and, for complex λ, let   be the unique fundamental eigenfunctions of D on (0, ∞) satisfying   together with the initial conditions at c  

Then their Wronskian satisfies  

since it is constant and equal to 1 at c.

Let λ be non-real and 0 < x < ∞. If the complex number   is such that   satisfies the boundary condition   for some   (or, equivalently,   is real) then, using integration by parts, one obtains  

Therefore, the set of μ satisfying this equation is not empty. This set is a circle in the complex μ-plane. Points μ in its interior are characterized by   if x > c and by   if x < c.

Let Dx be the closed disc enclosed by the circle. By definition these closed discs are nested and decrease as x approaches 0 or . So in the limit, the circles tend either to a limit circle or a limit point at each end. If   is a limit point or a point on the limit circle at 0 or , then   is square integrable (L2) near 0 or , since   lies in Dx for all x > c (in the ∞ case) and so   is bounded independent of x. In particular:[10]

  • there are always non-zero solutions of Df = λf which are square integrable near 0 resp. ;
  • in the limit circle case all solutions of Df = λf are square integrable near 0 resp. .

The radius of the disc Dx can be calculated to be   and this implies that in the limit point case   cannot be square integrable near 0 resp. . Therefore, we have a converse to the second statement above:

  • in the limit point case there is exactly one non-zero solution (up to scalar multiples) of Df = λf which is square integrable near 0 resp. .

On the other hand, if Dg = λg for another value λ, then   satisfies Dh = λh, so that  

This formula may also be obtained directly by the variation of constant method from (Dλ)g = (λ′ − λ)g. Using this to estimate g, it follows that[10]

  • the limit point/limit circle behaviour at 0 or is independent of the choice of λ.

More generally if Dg = (λr) g for some function r(x), then[11]  

From this it follows that[11]

  • if r is continuous at 0, then D + r is limit point or limit circle at 0 precisely when D is,

so that in particular[12]

  • if q(x) − a/x2 is continuous at 0, then D is limit point at 0 if and only if a3/4.

Similarly

  • if r has a finite limit at , then D + r is limit point or limit circle at precisely when D is,

so that in particular[13]

  • if q has a finite limit at , then D is limit point at .

Many more elaborate criteria to be limit point or limit circle can be found in the mathematical literature.

Green's function (singular case)

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Consider the differential operator   on (0, ∞) with q0 positive and continuous on (0, ∞) and p0 continuously differentiable in [0, ∞), positive in (0, ∞) and p0(0) = 0.

Moreover, assume that after reduction to standard form D0 becomes the equivalent operator   on (0, ∞) where q has a finite limit at . Thus

  • D is limit point at .

At 0, D may be either limit circle or limit point. In either case there is an eigenfunction Φ0 with DΦ0 = 0 and Φ0 square integrable near 0. In the limit circle case, Φ0 determines a boundary condition at 0:  

For complex λ, let Φλ and Χλ satisfy

  • (Dλλ = 0, (Dλλ = 0
  • Χλ square integrable near infinity
  • Φλ square integrable at 0 if 0 is limit point
  • Φλ satisfies the boundary condition above if 0 is limit circle.

Let   a constant which vanishes precisely when Φλ and Χλ are proportional, i.e. λ is an eigenvalue of D for these boundary conditions.

On the other hand, this cannot occur if Im λ ≠ 0 or if λ is negative.[10]

Indeed, if D f = λf with q0λδ > 0, then by Green's formula (Df,f) = (f,Df), since W(f,f*) is constant. So λ must be real. If f is taken to be real-valued in the D0 realization, then for 0 < x < y  

Since p0(0) = 0 and f is integrable near 0, p0f f must vanish at 0. Setting x = 0, it follows that f(y) f′(y) > 0, so that f2 is increasing, contradicting the square integrability of f near .

Thus, adding a positive scalar to q, it may be assumed that  

If ω(λ) ≠ 0, the Green's function Gλ(x,y) at λ is defined by   and is independent of the choice of Φλ and Χλ.

In the examples there will be a third "bad" eigenfunction Ψλ defined and holomorphic for λ not in [1, ∞) such that Ψλ satisfies the boundary conditions at neither 0 nor . This means that for λ not in [1, ∞)

  • Wλλ) is nowhere vanishing;
  • Wλλ) is nowhere vanishing.

In this case Χλ is proportional to Φλ + m(λ) Ψλ, where  

Let H1 be the space of square integrable continuous functions on (0, ∞) and let H0 be

  • the space of C2 functions f on (0, ∞) of compact support if D is limit point at 0
  • the space of C2 functions f on (0, ∞) with W(f, Φ0) = 0 at 0 and with f = 0 near if D is limit circle at 0.

Define T = G0 by  

Then T D = I on H0, D T = I on H1 and the operator D is bounded below on H0:  

Thus T is a self-adjoint bounded operator with 0 ≤ TI.

Formally T = D−1. The corresponding operators Gλ defined for λ not in [1, ∞) can be formally identified with   and satisfy Gλ (Dλ) = I on H0, (Dλ)Gλ = I on H1.

Spectral theorem and Titchmarsh–Kodaira formula

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Theorem.[10][14][15] — For every real number λ let ρ(λ) be defined by the Titchmarsh–Kodaira formula:  

Then ρ(λ) is a lower semicontinuous non-decreasing function of λ and if   then U defines a unitary transformation of L2(0, ∞) onto L2([1,∞), ) such that UDU−1 corresponds to multiplication by λ.

The inverse transformation U−1 is given by  

The spectrum of D equals the support of .

Kodaira gave a streamlined version[16][17] of Weyl's original proof.[10] (M.H. Stone had previously shown[18] how part of Weyl's work could be simplified using von Neumann's spectral theorem.)

In fact for T =D−1 with 0 ≤ TI, the spectral projection E(λ) of T is defined by  

It is also the spectral projection of D corresponding to the interval [1, λ].

For f in H1 define  

f(x, λ) may be regarded as a differentiable map into the space of functions ρ of bounded variation; or equivalently as a differentiable map   into the Banach space E of bounded linear functionals on [C[α, β]] for any compact subinterval [α, β] of [1, ∞).

The functionals (or measures) dλ f(x) satisfies the following E-valued second order ordinary differential equation:   with initial conditions at c in (0, ∞)  

If φλ and χλ are the special eigenfunctions adapted to c, then  

Moreover,   where   with   (As the notation suggests, ξλ(0) and ξλ(1) do not depend on the choice of z.)

Setting   it follows that  

On the other hand, there are holomorphic functions a(λ), b(λ) such that

  • φλ + a(λ) χλ is proportional to Φλ;
  • φλ + b(λ) χλ is proportional to Χλ.

Since W(φλ, χλ) = 1, the Green's function is given by  

Direct calculation[19] shows that   where the so-called characteristic matrix Mij(z) is given by  

Hence   which immediately implies   (This is a special case of the "Stieltjes inversion formula".)

Setting ψλ(0) = φλ and ψλ(1) = χλ, it follows that  

This identity is equivalent to the spectral theorem and Titchmarsh–Kodaira formula.

Application to the hypergeometric equation

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The Mehler–Fock transform[20][21][22] concerns the eigenfunction expansion associated with the Legendre differential operator D   on (1, ∞). The eigenfunctions are the Legendre functions[23]   with eigenvalue λ ≥ 0. The two Mehler–Fock transformations are[24]   and  

(Often this is written in terms of the variable τ = λ.)

Mehler and Fock studied this differential operator because it arose as the radial component of the Laplacian on 2-dimensional hyperbolic space. More generally,[25] consider the group G = SU(1,1) consisting of complex matrices of the form  

with determinant |α|2 − |β|2 = 1.

Application to the hydrogen atom

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Generalisations and alternative approaches

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A Weyl function can be defined at a singular endpoint a giving rise to a singular version of Weyl–Titchmarsh–Kodaira theory.[26] this applies for example to the case of radial Schrödinger operators  

The whole theory can also be extended to the case where the coefficients are allowed to be measures.[27]

Gelfand–Levitan theory

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Notes

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  1. ^ This is a limit in the strong operator topology.
  2. ^ A bona fide inner product is defined on the quotient by the subspace of null functions  , i.e. those with  . Alternatively in this case the support of the measure is  , so the right hand side defines a (non-degenerate) inner product on  .

References

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Citations

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  1. ^ Titchmarsh 1962, p. 22
  2. ^ Dieudonné 1969, Chapter X
  3. ^ Courant & Hilbert 1989
  4. ^ Titchmarsh 1962
  5. ^ Titchmarsh 1939, §8.2
  6. ^ Burkill 1951, pp. 50–52
  7. ^ Loomis 1953, p. page 40
  8. ^ Loomis 1953, pp. 30–31
  9. ^ Kolmogorov & Fomin 1975, pp. 374–376
  10. ^ a b c d e Weyl 1910.[specify]
  11. ^ a b Bellman 1969, p. 116
  12. ^ Reed & Simon 1975, p. 159
  13. ^ Reed & Simon 1975, p. 154
  14. ^ Titchmarsh 1946, Chapter III
  15. ^ Kodaira 1949, pp. 935–936
  16. ^ Kodaira 1949, pp. 929–932; for omitted details, see Kodaira 1950, pp. 529–536
  17. ^ Dieudonné 1988
  18. ^ Stone 1932, Chapter X
  19. ^ Kodaira 1950, pp. 534–535
  20. ^ Mehler 1881.
  21. ^ Fock 1943, pp. 253–256
  22. ^ Vilenkin 1968
  23. ^ Terras 1984, pp. 261–276
  24. ^ Lebedev 1972
  25. ^ Vilenkin 1968, Chapter VI
  26. ^ Kostenko, Sakhnovich & Teschl 2012, pp. 1699–1747
  27. ^ Eckhardt & Teschl 2013, pp. 151–224

Bibliography

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