Difference between revisions of "Principal part of a differential operator"
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The homogeneous differential operator formed from the given operator by discarding all the terms not containing derivatives of maximal order. The principal part of the differential operator | The homogeneous differential operator formed from the given operator by discarding all the terms not containing derivatives of maximal order. The principal part of the differential operator | ||
− | + | $$L=\sum_{|\alpha|\leq m}a_\alpha D^\alpha$$ | |
− | is | + | is $\sum_{|\alpha|=m}a_\alpha D^\alpha$. The principal part of a differential operator is sometimes defined by the introduction of supplementary weights assigned to the differentiations with respect to the various arguments. For instance, the principal part of the differential operator $D_1-D_2^2+\alpha D_2$ is sometimes defined as $D_1-D_2^2$ (if $D_1$ is given weight 2 and $D_2$ weight 1). |
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The principal part is also called the principal symbol (cf. also [[Symbol of an operator|Symbol of an operator]]). | The principal part is also called the principal symbol (cf. also [[Symbol of an operator|Symbol of an operator]]). | ||
− | The zero sets of the principal symbol are called the characteristics of | + | The zero sets of the principal symbol are called the characteristics of $L$ (cf. also [[Characteristic|Characteristic]]). |
− | Further, a constant-coefficient differential operator | + | Further, a constant-coefficient differential operator $L$ in $\mathbf R^n$ is said to be of real principal type if the principal symbol $l$ is real and if $l'(\xi)\neq0$ for $\xi\in\mathbf R^n\setminus 0$ (cf. also [[Principal type, partial differential operator of|Principal type, partial differential operator of]]). |
− | For a differential operator | + | For a differential operator $L$ of order $m$ with $C^\infty$ coefficients in a $C^\infty$-manifold $X$ the principal symbol can be regarded as an invariantly-defined function on the cotangent bundle of $X$. |
====References==== | ====References==== | ||
<table><TR><TD valign="top">[a1]</TD> <TD valign="top"> L.V. Hörmander, "The analysis of linear partial differential operators" , '''1''' , Springer (1983)</TD></TR></table> | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> L.V. Hörmander, "The analysis of linear partial differential operators" , '''1''' , Springer (1983)</TD></TR></table> |
Latest revision as of 14:26, 8 August 2014
The homogeneous differential operator formed from the given operator by discarding all the terms not containing derivatives of maximal order. The principal part of the differential operator
$$L=\sum_{|\alpha|\leq m}a_\alpha D^\alpha$$
is $\sum_{|\alpha|=m}a_\alpha D^\alpha$. The principal part of a differential operator is sometimes defined by the introduction of supplementary weights assigned to the differentiations with respect to the various arguments. For instance, the principal part of the differential operator $D_1-D_2^2+\alpha D_2$ is sometimes defined as $D_1-D_2^2$ (if $D_1$ is given weight 2 and $D_2$ weight 1).
Comments
The principal part is also called the principal symbol (cf. also Symbol of an operator).
The zero sets of the principal symbol are called the characteristics of $L$ (cf. also Characteristic).
Further, a constant-coefficient differential operator $L$ in $\mathbf R^n$ is said to be of real principal type if the principal symbol $l$ is real and if $l'(\xi)\neq0$ for $\xi\in\mathbf R^n\setminus 0$ (cf. also Principal type, partial differential operator of).
For a differential operator $L$ of order $m$ with $C^\infty$ coefficients in a $C^\infty$-manifold $X$ the principal symbol can be regarded as an invariantly-defined function on the cotangent bundle of $X$.
References
[a1] | L.V. Hörmander, "The analysis of linear partial differential operators" , 1 , Springer (1983) |
Principal part of a differential operator. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Principal_part_of_a_differential_operator&oldid=32767