User:Ffschwarz/Loewy Decomposition

= Loewy Decomposition =

Solving differential equations is one of the most important subfields in mathematics. Of particular interest are solutions in closed form. For a long time finding such solutions was essentially an ad hoc procedure, supported by collections of solved examples.

For linear ordinary differential equations (ode's) this has been changed by a fundamental result due to Loewy ; a detailed discussion may be found in. He determined a unique decomposition of any linear ode into so-called largest completely reducible components. In this way, solving the original equation is reduced to solving irreducible equations of lowest possible order. Furthermore, this proceeding is algorithmic, i.e.the best possible answer for solving a reducible equation is guaranteed.

Loewy's results have been extended to linear partial differential equations (pde's) in two independent variables. In this way, algorithmic methods for solving large classes of linear pde's have become available.

Decomposing linear ordinary differential equations
Let $$D\equiv\frac{d}{dx}$$ denote the derivative w.r.t. the variable $$x$$. A differential operator of order $$n$$ is a polynomial of the form

$$L\equiv D^n+a_1D^{n-1}+\ldots +a_{n-1}D+a_n$$

where the coefficients $$a_i$$, $$i=1,\ldots,n$$ are from some function field, the base field of $$L$$. Usually it is the field of rational functions in the variable $$x$$, i.e. $$a_i\in{\mathbb Q}(x)$$. If $$y$$ is an indeterminate with $$\frac{dy}{dx}\neq 0$$, $$Ly$$ becomes a differential polynomial, and $$Ly=0$$ is the differential equation corresponding to $$L$$.

An operator $$L$$ of order $$n$$ is called reducible if it may be represented as the product of two operators $$L_1$$ and $$L_2$$, both of order lower than $$n$$. Then one writes $$L=L_1L_2$$, i.e. juxtaposition means the operator product, it is defined by the rule $$Da_i=a_iD+a_i'$$; $$L_1$$ is called a left factor of $$L$$, $$L_2$$ a right factor. By default, the coefficient domain of the factors is assumed to be the base field of $$L$$, possibly extended by some algebraic numbers, i.e. $${\bar{\mathbb Q}}(x)$$ is allowed. If an operator does not allow any right factor it is called irreducible.

For any two operators $$L_1$$ and $$L_2$$ the least common left multiple $$Lclm(L_1,L_2)$$ is the operator of lowest order such that both $$L_1$$ and $$L_2$$ divide it from the right. The greatest common right divisior $$Gcrd(L_1,L_2)$$ is the operator of highest order that divides both $$L_1$$ and $$L_2$$ from the right. If an operator may be represented as $$Lclm$$ of irreducible operators it is called completely reducible. By definition, an irreducible operator is called completely reducible.

If an operator is not completely reducible, the $$Lclm$$ of its irreducible right factors is divided out and the same procedure is repeated with the quotient. Due to the lowering of order in each step, this proceeding terminates after a finite number of iterations and the desired decomposition is obtained. Based on these considerations, Loewy obtained the following fundamental result.

Theorem 1 (Loewy 1906) Let $$D=\frac{d}{dx}$$ be a derivative and $$a_i\in{\mathbb Q(x)}$$. A differential operator

$$L\equiv D^n+a_1D^{n-1}+\ldots +a_{n-1}D+a_n$$

of order $$n$$ may be written uniquely as the product of completely reducible factors $$L^{(d_k)}_k$$ of maximal order $$d_k$$ over $${\mathbb Q}(x)$$ in the form

$$L=L_m^{(d_m)}L_{m-1}^{(d_{m-1})}\ldots L_1^{(d_1)}$$

with $$d_1+\ldots+d_m=n$$. The factors $$L^{(d_k)}_k$$ are unique. Any factor $$L^{(d_k)}_k$$, $$k=1,\ldots,m$$ may be written as

$$L^{(d_k)}_k=Lclm(l^{(e_1)}_{j_1},l^{(e_2)}_{j_2},\ldots,l^{(e_k)}_{j_k})$$

with $$e_1+e_2+\ldots+e_k=d_k$$; $$l^{(e_i)}_{j_i}$$ for $$i=1,\ldots,k$$, denotes an irreducible operator of order $$e_i$$ over $${\mathbb Q}(x)$$.

The decomposition determined in this theorem is called the Loewy decomposition of $$L$$. It provides a detailed description of the function space containing the solution of a reducible linear differential equation $$Ly=0$$.

For operators of fixed order the possible Loewy decompositions, differing by the number and the order of factors, may be listed explicitly; some of the factors may contain parameters. Each alternative is called a type of Loewy decomposition. The complete answer for $$n=2$$ is detailed in the following corollary to the above theorem .

Corollary 1 Let $$L$$ be a second-order operator. Its possible Loewy decompositions are denoted by $${\mathcal L}^2_0,\ldots{\mathcal L}^2_3$$, they may be described as follows; $$l^{(i)}$$ and $$l^{(i)}_j$$ are irreducible operators of order $$i$$; $$C$$ is a constant.

$$ {\mathcal L}^2_1: L=l^{(1)}_2l^{(1)}_1; $$ $$ {\mathcal L}^2_2: L=Lclm(l^{(1)}_2,l^{(1)}_1); $$ $$ {\mathcal L}^2_3: L=Lclm(l^{(1)}(C)). $$

The decomposition type of an operator is the decomposition $${\mathcal L}^2_i$$ with the highest value of $$i$$. An irreducible second-order operator is defined to have decomposition type $${\mathcal L}^2_0$$.

The decompositions $${\mathcal L}^2_0$$, $${\mathcal L}^2_2$$ and $${\mathcal L}^2_3$$ are completely reducible.

If a decomposition of type $${\mathcal L}^2_i$$, $$i=1,2$$ or $$3$$ has been obtained for a second-order equation $$Ly=0$$, a fundamental system may be given explicitly.

Corollary 2 Let $$L$$ be a second-order differential operator, $$D\equiv\frac{d}{dx}$$, $$y$$ a differential indeterminate, and $$a_i\in{\mathbb Q}(x)$$. Define $$\varepsilon_i(x)\equiv\exp{(-\int a_i dx)}$$ for $$i=1,2$$ and $$\varepsilon(x,C)\equiv\exp{(-\int a(C)dx)}$$, $$C$$ is a parameter; the barred quantities $$\bar{C}$$ and $$\bar{\bar{C}}$$ are arbitrary numbers, $$\bar{C}\neq\bar{\bar{C}}$$. For the three nontrivial decompositions of Corollary 1 the following elements $$y_1$$ and $$y_2$$ of a fundamental system are obtained.

$${\mathcal L}^2_1$$: $$Ly=(D+a_2)(D+a_1)y=0$$; $$y_1=\varepsilon_1(x)$$, $$y_2=\varepsilon_1(x)\int\frac{\varepsilon_2(x)}{\varepsilon_1(x)}dx$$.

$${\mathcal L}^2_2$$: $$Ly=Lclm(D+a_2,D+a_1)y=0$$; $$y_i=\varepsilon_i(x)$$; $$a_1$$ is not equivalent to $$a_2$$.

$${\mathcal L}^2_3$$: $$Ly=Lclm(D+a(C))y=0;$$ $$y_1=\varepsilon(x,\bar{C})$$},  $$y_2=\varepsilon(x,\bar{\bar{C}})$$.

Here two rational functions $$p,q\in{\mathbb Q}(x)$$ are called equivalent if there exists another rational function $$r\in{\mathbb Q}(x)$$ such that $$p-q=\frac{r'}{r}$$.

There remains the question how to obtain a factorization for a given equation or operator. It turns out that for linear ode's finding the factors comes down to determining rational solutions of Riccati equations or linear ode's; both may be determined algorithmically. The two examples below show how the above corollary is applied.

Example 1 Equation 2.201 from Kamke's collection. has the $${\mathcal L}^2_2$$ decomposition

$$y''+(2+\frac{1}{x})y'-\frac{4}{x^{2}}y= Lclm\Big(D+\frac{2}{x}-\frac{2x-2}{x^{2}-2x+ {\frac{3}{2}}}, D+2+\frac{2}{x}-\frac{1}{x+{\frac{3}{2}}}\Big)y=0. $$

The coefficients $$a_1=2+\frac{2}{x}-\frac{1}{x+\frac{3}{2}}$$ and $$a_2=\frac{2}{x}-\frac{2x-2}{x^2-2x+\frac{3}{2}}$$ are rational solutions of the Riccati equation $$a'-a^2+\big(2+\frac{1}{x}\big)+\frac{4}{x^2}=0$$, they yield the fundamental system

$$y_1=\frac{2}{3}-\frac{4}{3x}+\frac{1}{x^2},$$ $$y_2=\frac{2}{x}+\frac{3}{x^2}e^{-2x}.$$

Example 2 An equation with a type $${\mathcal L}^2_3$$ decomposition is

$$y''-\frac{6}{x^2}y=Lclm\big(D+\frac{2}{x}-\frac{5x^4}{x^5+C}\big)y=0.$$

The coefficient of the first-order factor is the rational solution of $$a'-a^2+\frac{6}{x^2}=0$$. Upon integration the fundamental system $$y_1=x^3$$ and $$y_2=\frac{1}{x^2}$$ for $$C=0$$ and $$C\rightarrow\infty$$ respectively is obtained.

These results show that factorization provides an algorithmic scheme for solving reducible linear ode's. Whenever an equation of order 2 factorizes according to one of the types defined above the elements of a fundamental system are explicitly known, i.e. factorization is equivalent to solving it.

A similar scheme may be set up for linear ode's of any order, although the number of alternatives grows considerably with the order; for order $$n=3$$ the answer is given in full detail in.

If an equation is irreducible it may occur that its Galois group is nontrivial, then algebraic solutions may exist. If the Galois group is trivial it may be possible to express the solutions in terms of special function like e.g. Bessel or Legendre functions, see or.

Basic facts from differential algebra
In order to generalize Loewy's result to linear pde's it is necessary to apply the more general setting of differential algebra. Therefore a few basic concepts that are required for this purpose are given next.

A field $${\mathcal F}$$ is called a differential field if it is equipped with a derivation operator. An operator $$\delta$$ on a field $${\mathcal F}$$ is called a derivation operator if $$\delta(a+b)=\delta(a)+\delta(b)$$ and $$\delta(ab)=\delta(a)b+a\delta(b)$$ for all elements $$a,b\in{\mathcal F}$$. A field with a single derivation operator is called an ordinary differential field; if there is a finite set containing several commuting derivation operators the field is called a partial differential field.

Here differential operators with derivatives $$\partial_x=\frac{\partial}{\partial x}$$ and $$\partial_y=\frac{\partial}{\partial y}$$ with coefficients from some differential field are considered. Its elements have the form $$\sum_{i,j} r_{i,j}(x,y)\partial_x^i\partial_y^j$$; almost all coefficients $$r_{i,j}$$ are zero. The coefficient field is called the base field. If constructive and algorithmic methods are the main issue it is $${\mathbb Q}(x,y)$$. The respective ring of differential operators is denoted by $${\mathcal D}={\mathbb Q}(x,y)[\partial_x,\partial_y]$$ or $${\mathcal D}={\mathcal F}[\partial_x,\partial_y]$$. The ring $${\mathcal D}$$ is non-commutative, $$\partial_xa=a\partial_x+\frac{\partial a}{\partial x}$$ and similarly for the other variables; $$a$$ is from the base field.

For an operator $$L=\sum_{i+j\leq n}r_{i,j}(x,y)\partial_x^i\partial_y^j$$ of order $$n$$ the symbol of L is the homogeneous algebraic polynomial $$symb(L)\equiv\sum_{i+j=n}r_{i,j}(x,y)X^iY^j$$ where $$X$$ and $$Y$$ algebraic indeterminates.

Let $$I$$ be a left ideal which is generated by $$l_i\in{\mathcal D}$$, $$i=1,\ldots,p$$. Then one writes $$I=\langle l_1,\ldots,l_p\rangle$$. Because right ideals are not considered here, sometimes $$I$$ is simply called an ideal.

The relation between left ideals in $${\mathcal D}$$ and systems of linear pde's is established as follows. The elements $$l_i\in{\mathcal D}$$ are applied to a single differential indeterminate $$z$$. In this way the ideal $$I=\langle l_1,l_2,\ldots\rangle$$ corresponds to the system of pde's $$l_1z=0$$, $$l_2z=0,\ldots$$ for the single function $$z$$.

The generators of an ideal are highly non-unique; its members may be transformed in infinitely many ways by taking linear combinations of them or its derivatives without changing the ideal. Therefore M. Janet introduced a normal form for systems of linear pde's that has been baptized Janet basis. They are the differential analog to Groebner bases of commutative algebra, originally they have been introduced by Bruno Buchberger ; therefore they are also called differential Groebner basis.

In order to generate a Janet basis, a ranking of derivatives must be defined. It is a total ordering such that for any derivatives $$\delta$$, $$\delta_1$$ and $$\delta_2$$, and any derivation operator $$\theta$$ the relations $$\delta\preceq\theta\delta$$, and $$\delta_1\preceq\delta_2\rightarrow\delta\delta_1\preceq\delta\delta_2$$ are valid. Here graded lexicographic term orderings $$grlex$$ are applied. For partial derivatives of a single function their definition is analogous to the monomial orderings in commutative algebra. The S-pairs in commutative algebra correspond to the integrability conditions.

If it is assured that the generators $$l_1,\ldots,l_p$$ of an ideal $$I$$ form a Janet basis the notation $$I={\big\langle\big\langle} l_1,\ldots,l_p{\big\rangle\big\rangle}$$ is applied.

Example 3 Consider the ideal

$$I=\Big\langle l_1\equiv\partial_{xx}-\frac{1}{x}\partial_x-\frac{y}{x(x+y)}\partial_y,$$ $$ l_2\equiv\partial_{xy}+\frac{1}{x+y}\partial_y,$$ $$l_3\equiv\partial_{yy}+\frac{1}{x+y}\partial_y\Big\rangle $$

in $$grlex$$ term order with $$x\succ y$$. Its generators are autoreduced. If the integrability condition

$$l_{1,y}=l_{2,x}-l_{2,y}=\frac{y+2x}{x(x+y)}\partial_{xy}+\frac{y}{x(x+y)}\partial_{yy}$$

is reduced w.r.t. to $$I$$, the new generator $$\partial_y$$ is obtained. Adding it to the generators and performing all possible reductions, the given ideal is represented as $$I={\Big\langle\Big\langle}\partial_{xx}-\frac{1}{x}\partial_x,\partial_y{\Big\rangle\Big\rangle}$$. Its generators are autoreduced and the single integrability condition is satisfied, i.e. they form a Janet basis.

Given any ideal $$I$$ it may occur that it is properly contained in some larger ideal $$J$$ with coefficients in the base field of $$I$$; then $$J$$ is called a divisor of $$I$$. In general, a divisor in a ring of partial differential operators need not be principal.

The greatest common right divisor (Gcrd) or sum of two ideals $$I$$ and $$J$$ is the smallest ideal with the property that both $$I$$ and $$J$$ are contained in it. If they have the representation $$I\equiv\langle f_1,\ldots,f_p\rangle$$ and $$J\equiv\langle g_1,\ldots,g_q\rangle, $$ $$f_i$$, $$g_j\in{\mathcal D}$$ for all $$i$$ and $$j$$, the sum is generated by the union of the generators of $$I$$ and $$J$$. The solution space of the equations corresponding to $$Gcrd(I,J)$$ is the intersection of the solution spaces of its arguments.

The least common left multiple (Lclm) or left intersection of two ideals $$I$$ and $$J$$ is the largest ideal with the property that it is contained both in $$I$$ and $$J$$. The solution space of $$Lclm(I,J)z=0$$ is the smallest space containing the solution spaces of its arguments.

A special kind of divisor is the so-called Laplace divisor of a given operator $$L$$, page 34. It is defined as follows.

Definition Let $$L$$ be a partial differential operator in the plane; define

$${\mathfrak l}_m\equiv\partial_{x^m}+a_{m-1}\partial_{x^{m-1}}+\ldots+a_1\partial_x+a_0$$ and

$${\mathfrak k}_n\equiv\partial_{y^n}+b_{n-1}\partial_{y^{n-1}}+\ldots+b_1\partial_y+b_0$$

be ordinary differential operators w.r.t. $$x$$ or $$y$$; $$a_i,b_i\in{\mathbb Q}(x,y)$$ for all i; $$m$$ and $$n$$ are natural numbers not less than 2. Assume the coefficients $$a_i$$, $$i=0,\ldots,m-1$$ are such that $$L$$ and $${\mathfrak l}_m$$ form a Janet basis. If $$m$$ is the smallest integer with this property then $${\mathbb L}_{x^m}(L)\equiv{\langle\langle} L,{\mathfrak l}_m{\rangle\rangle}$$ is called a Laplace divisor of $$L$$. Similarly, if $$b_j$$, $$j=0,\ldots,n-1$$ are such that $$L$$ and $${\mathfrak k}_n$$ form a Janet basis and $$n$$ is minimal, then $${\mathbb L}_{y^n}(L)\equiv{\langle\langle} L,{\mathfrak k}_n{\rangle\rangle}$$ is also called a Laplace divisor of $$L$$.

In order for a Laplace divisor to exist the coeffients of an operator $$L$$ must obey certain constraints. An algorithm for determining an upper bound for a Laplace divisor is not known at present, therefore in general the existence of a Laplace divisor may be undecidable

Decomposing second-order inear partial differential equations in the plane
Applying the above concepts Loewy's theory may be generalized to linear pde's. Here it is applied to individual linear pde's of second order in the plane with coordinates $$x$$ and $$y$$, and the principal ideals generated by the corresponding operators.

Second-order equations have been considered extensively in the literature of the 19th century,. Usually equations with leading derivatives $$\partial_{xx}$$ or $$\partial_{xy}$$ are distinguished. Their general solutions contain not only constants but undetermined functions of varying numbers of arguments; determining them is part of the solution procedure. For equations with leading derivative $$\partial_{xx}$$ Loewy's results may be generalized as follows.

Theorem 2 Let the differential operator $$L$$ be defined by

$$L\equiv\partial_{xx}+A_1\partial_{xy}+A_2\partial_{yy}+A_3\partial_x+A_4\partial_y+A_5$$ where $$A_i\in{\mathbb Q}(x,y)$$ for all $$i$$.

Let $$l_i\equiv\partial_x+a_i\partial_y+b_i$$ for $$i=1$$ and $$i=2$$, and $$l(\Phi)\equiv\partial_x+a\partial_y+b(\Phi)$$ be first-order operators with $$a_i,b_i,a\in{\mathbb Q}(x,y)$$; $$\Phi$$ is an undetermined function of a single argument. Then $$L$$ has a Loewy decomposition according to one of the following types.

$${\mathcal L}_{xx}^1: L=l_2l_1;$$ $${\mathcal L}_{xx}^2: L=Lclm(l_2,l_1);$$ $${\mathcal L}_{xx}^3: L=Lclm(l(\Phi)). $$

The decomposition type of an operator $$L$$ is the decomposition $${\mathcal L}_{xx}^i$$ with the highest value of $$i$$. If $$L$$ does not have any first-order factor in the base field, its decomposition type is defined to be $${\mathcal L}_{xx}^0$$. Decompositions $${\mathcal L}_{xx}^0$$, $${\mathcal L}_{xx}^2$$ and $${\mathcal L}_{xx}^3$$ are completely reducible.

In order to apply this result for solving any given differential equation involving the operator $$L$$ the question arises whether its first-order factors may be determined algorithmically. The subsequent corollary provides the answer for factors with coefficients either in the base field or a universal field extension.

Corollary 3 In general, first-order right factors of a linear pde in the base field cannot be determined algorithmically. If the symbol polynomial is separable any factor may be determined. If it has a double root in general it is not possible to determine the right factors in the base field. The existence of factors in a universal field, i.e. absolute irreducibility, may always be decided.

The above theorem may be applied for solving reducible equations in closed form. Because there are only principal divisors involved the answer is similar as for ordinary second-order equations.

Proposition 1 Let a reducible second-order equation

$$Lz\equiv z_{xx}+A_1z_{xy}+A_2z_{yy}+A_3z_x+A_4z_y+A_5z=0$$ where $$A_1,\ldots,A_5\in{\mathbb Q}(x,y)$$.

Define $$l_i\equiv\partial_x+a_i\partial_y+b_i$$, $$a_i,b_i\in{\mathbb Q}(x,y)$$ for $$i=1,2$$; $$\varphi_i(x,y)=const$$ is a rational first integral of $$\frac{dy}{dx}=a_i(x,y)$$; $$\bar{y}\equiv\varphi_i(x,y)$$ and the inverse $$y=\psi_i(x,\bar{y})$$; both $$\varphi_i$$ and $$\psi_i$$ are assumed to exist. Furthermore define

$${\mathcal E}_i(x,y)\equiv\exp\Big(-{\displaystyle\int} b_i(x,y)\big|_{y=\psi_i(x,\bar{y})}dx\Big)\Big|_{\bar{y}=\varphi_i(x,y)}$$ for $$i=1,2$$.

A differential fundamental system has the following structure for the various decompositions into first-order components.

$${\mathcal L}^1_{xx}: z_1(x,y)={\mathcal E}_1(x,y)F_1(\varphi_1)$$, $$ z_2(x,y)={\mathcal E}_1(x,y){\displaystyle\int}\frac{{\mathcal E}_2(x,y)}{{\mathcal E}_1(x,y)}F_2 \big(\varphi_2(x,y)\big)\big|_{y=\psi_1(x,\bar{y})}dx \Big|_{\bar{y}=\varphi_1(x,y)};$$

$${\mathcal L}^2_{xx}: z_i(x,y)={\mathcal E}_i(x,y)F_i\big(\varphi_i(x,y)\big), i=1,2; $$

$${\mathcal L}^3_{xx}: z_i(x,y)={\mathcal E}_i(x,y)F_i\big(\varphi(x,y)\big),i=1,2.$$

The $$F_i$$ are undetermined functions of a single argument; $$\varphi$$, $$\varphi_1$$ and $$\varphi_2$$ are rational in all arguments; $$\psi_1$$ is assumed to exist. In general $$\varphi_1\neq\varphi_2$$, they are determined by the coefficients $$A_1$$, $$A_2$$ and $$A_3$$ of the given equation.

A typical example of a linear pde where factorization applies is an equation that has been discussed by Forsyth , vol. VI, page 16,

Example 5 (Forsyth 1906)} Consider the differential equation $$z_{xx}-z_{yy}+\frac{4}{x+y}z_x=0$$. Upon factorization the representation

$$ Lz\equiv l_2l_1z=\Big(\partial_x+\partial_y+\frac{2}{x+y}\Big)\Big(\partial_x-\partial_y+\frac{2}{x+y}\Big)z=0$$ is obtained. There follows

$$ \varphi_1(x,y)=x+y,\psi_1(x,y)=\bar{y}-x, {\mathcal E}_1(x,y)=\exp{\Big(\frac{2y}{x+y}\Big)}$$,

$$ \varphi_2(x,y)=x-y,\psi_2(x,y)=x-\bar{y}, {\mathcal E}_2(x,y)=-\frac{1}{x+y}.$$

Consequently a differential fundamental system is

$$z_1(x,y)=\exp{\Big(\frac{2y}{x+y}\Big)}F(x+y),$$ $$z_2(x,y)=\frac{1}{x+y}\exp{\Big(\frac{2y}{x+y}\Big)} {\displaystyle\int}\exp{\Big(\frac{2x-\bar{y}}{\bar{y}}\Big)}G(2x-\bar{y})dx \Big|_{\bar{y}=x+y}. $$

$$F$$ and $$G$$ are undetermined functions.

If the only second-order derivative of an operator is $$\partial_{xy}$$, its possible decompositions involving only principal divisors may be described as follows.

Theorem 3 Let the differential operator $$L$$ be defined by

$$L\equiv\partial_{xy}+A_1\partial_x+A_2\partial_y+A_3$$ where $$A_i\in{\mathbb Q}(x,y)$$ for all $$i$$.

Let $$l\equiv\partial_x+A_2$$ and $$k\equiv\partial_y+A_1$$ are first-order operators. $$L$$ has Loewy decompositions involving first-order principal divisors of the following form.

$${\mathcal L}_{xy}^1: L=kl;$$ $${\mathcal L}_{xy}^2: L=lk;$$ $${\mathcal L}_{xy}^3: L=Lclm(k,l).$$

The decomposition type of an operator $$L$$ is the decomposition $${\mathcal L}_{xy}^i$$ with highest value of $$i$$. The decomposition of type $${\mathcal L}_{xy}^3$$ is completely reducible

In addition there are five more possible decomposition types involving non-principal Laplace divisors as shown next.

Theorem 4 Let the differential operator $$L$$ be defined by

$$L\equiv\partial_{xy}+A_1\partial_x+A_2\partial_y+A_3$$ where $$A_i\in{\mathbb Q}(x,y)$$ for all $$i$$.

$$\mathbb{L}_{x^m}(L)$$ and $$\mathbb{L}_{y^n}(L)$$ as well as $${\mathfrak l}_m$$ and $${\mathfrak k}_n$$ are defined above; furthermore $$l\equiv \partial_x+a$$, $$k\equiv\partial_y+b$$, $$a,b\in{\mathbb Q}(x,y)$$. $$L$$ has Loewy decompsitions involving Laplace divisors according to one of the following types; $$m$$ and $$n$$ obey $$m,n\geq 2$$.

$${\mathcal L}_{xy}^4: L=Lclm\big(\mathbb{L}_{x^m}(L),\mathbb{L}_{y^n}(L)\big);$$

$${\mathcal L}_{xy}^5: L=Exquo\big(L,\mathbb{L}_{x^m}(L)\big)\mathbb{L}_{x^m}(L)= \left(\begin{array}{cc} 1  &  0\\ 0  &  \partial_y+A_1\end{array}\right) \left(\begin{array}{c} L\\ {\mathfrak l}_m\end{array}\right);$$

$${\mathcal L}_{xy}^6: L=Exquo\big(L,\mathbb{L}_{y^n}(L)\big)\mathbb{L}_{y^n}(L)= \left(\begin{array}{cc} 1  &  0\\ 0  & \partial_x+A_2\end{array}\right) \left(\begin{array}{c} L\\ {\mathfrak k}_n\end{array}\right);$$

$${\mathcal L}_{xy}^7: L=Lclm\big(k,\mathbb{L}_{x^m}(L)\big);$$ $${\mathcal L}_{xy}^8: L=Lclm\big(l,\mathbb{L}_{y^n}(L)\big).$$

If $$L$$ does not have a first order right factor and it may be shown that a Laplace divisor does not exist its decomposition type is defined to be $${\mathcal L}_{xy}^0$$. The decompositions $${\mathcal L}_{xy}^0$$, $${\mathcal L}_{xy}^4$$, $${\mathcal L}_{xy}^7$$ and $${\mathcal L}_{xy}^8$$ are completely reducible.

An equation that does not allow a decomposition involving principal divisors but is completely reducible w.r.t. non-principal Laplace divisors of type $${\mathcal L}_{xy}^4$$ has been considered by Forsyth.

Example 6 (Forsyth 1906) Define

$$L\equiv\partial_{xy}+\frac{2}{x-y}\partial_x-\frac{2}{x-y}\partial_y-\frac{4}{(x-y)^2}$$

generating the principal ideal $$\langle L\rangle$$. A first-order factor does not exist. However, there are Laplace divisors

$${\mathbb L}_{x^2}(L)\equiv{\Big\langle\Big\langle} \partial_{xx}-\frac{2}{x-y}\partial_x+\frac{2}{(x-y)^2},L{\Big\rangle\Big\rangle}$$ and $${\mathbb L}_{y^2}(L)\equiv{\Big\langle\Big\langle} L,\partial_{yy}+\frac{2}{x-y}\partial_y+\frac{2}{(x-y)^2}{\Big\rangle\Big\rangle}.$$

The ideal generated by $$L$$ has the representation $$\langle L\rangle=Lclm\big({\mathbb L}_{x^2}(L),{\mathbb L}_{y^2}(L)\big)$$, i.e. it is completely reducible; its decomposition type is $${\mathcal L}^4_{xy}$$. Therefore the equation $$Lz=0$$ has the the differential fundamental system

$$z_1(x,y)=2(x-y)F(y)+(x-y)^2F'(y)$$ and $$ z_2(x,y)=2(y-x)G(x)+(y-x)^2G'(x)$$.

Decomposing linear pde's of order higher than 2
It turns out that operators of higher order have more complicated decompositions and there are more alternatives, many of them in terms of non-principal divisors. The solutions of the corresponding equations get more complex. For equations of order three in the plane a fairly complete answer may be found in. A typical example of a third-order equation that is also of historical interest is due to Blumberg .

Example 7 (Blumberg 1912) In his dissertation Blumberg considered the third order operator

$$L\equiv\partial_{xxx}+x\partial_{xxy}+2\partial_{xx}+2(x+1)\partial_{xy}+\partial_x+(x+2)\partial_y$$.

It allows the two first-order factors $$l_1\equiv\partial_x+1$$ and $$l_2\equiv\partial_x+x\partial_y$$. Their intersection is not principal; defining

$$L_1\equiv\partial_{xxx}-x^2\partial_{xyy}+3\partial_{xx}+(2x+3)\partial_{xy}-x^2\partial_{yy}+2\partial_x+(2x+3)\partial_y$$

$$L_2\equiv\partial_{xxy}+x\partial_{xyy}-\frac{1}{x}\partial_{xx}-\frac{1}{x}\partial_{xy}+x\partial_yy -\frac{1}{x}\partial_x-\big(1+\frac{1}{x}\big)\partial_y{\big\rangle\big\rangle}. $$

it may be written as $$Lclm(l_2,l_1)={\langle\langle}L_1,L_2{\rangle\rangle} $$. Consequently the Loewy decomposition of Blumbergs's operator is

$$ L=\left(\begin{array}{cc} 1 & x \\ 0 & \partial_x+1+\frac{1}{x}\end{array}\right) \left(\begin{array}{c}L_1\\L_2\end{array}\right). $$

It yields the differential fundamental system

$$z_1(x,y)=F(y-\frac{1}{2}x^2)$$, $$z_2(x,y)=G(y)e^{-x}$$, $$z_3(x,y)={\displaystyle\int} xe^{-x}H\big(\bar{y}+\frac{1}{2}x^2\big) dx\Big|_{\bar{y}=y-\frac{1}{2}x^2}$$

$$F,G$$ and $$H$$ are an undetermined functions.

Factorizations and Loewy decompositions turned out to be an extremely useful method for determining solutions of linear differential equations in closed form, both for ordinary and partial equations. It should be possible to generalize these methods to equations of higher order, equations in more variables and system of differential equations.