Malgrange preparation theorem

E1020443

mathematical theorem theorem in analysis theorem in singularity theory

The Malgrange preparation theorem is a fundamental result in analysis and singularity theory that generalizes the Weierstrass preparation theorem to smooth functions, providing a local factorization of such functions near singular points.

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All labels observed (1)

Label	Occurrences
Malgrange preparation theorem canonical	2

Statements (46)

Predicate	Object
instanceOf	mathematical theorem ⓘ theorem in analysis ⓘ theorem in singularity theory ⓘ
appliesTo	C-infinity functions ⓘ germs of smooth functions ⓘ real-analytic functions ⓘ smooth functions ⓘ
assumes	smoothness conditions on coefficients ⓘ
concerns	local behavior of smooth mappings ⓘ
context	ideals generated by smooth functions ⓘ local rings of smooth function germs ⓘ
describes	structure of smooth functions near singular points ⓘ
field	differential topology ⓘ mathematical analysis ⓘ microlocal analysis ⓘ singularity theory ⓘ
generalizes	Weierstrass preparation theorem NERFINISHED ⓘ
hasConsequence	finite generation of certain modules of smooth functions ⓘ local polynomial representation in a distinguished variable ⓘ
hasDomain	germs of smooth functions on Euclidean spaces ⓘ
holdsIn	complex smooth category ⓘ real smooth category ⓘ
implies	existence of invertible smooth factors ⓘ existence of polynomial-like factors ⓘ
isPartOf	local analysis of mappings ⓘ theory of singularities of differentiable maps ⓘ
namedAfter	Bernard Malgrange NERFINISHED ⓘ
provides	local factorization of smooth functions ⓘ
relatedTo	Malgrange division theorem NERFINISHED ⓘ Thom–Mather theory NERFINISHED ⓘ Weierstrass division theorem NERFINISHED ⓘ division theorem for smooth functions ⓘ finite determinacy of singularities ⓘ
strengthens	Weierstrass preparation theorem for analytic functions NERFINISHED ⓘ
usedFor	analyzing multiplicity of zeros of smooth functions ⓘ constructing local models of singularities ⓘ local study of solutions of PDEs near characteristic points ⓘ proving stability results in singularity theory ⓘ reducing smooth maps to polynomial form in one variable ⓘ
usedIn	implicit function problems ⓘ local normal form theory ⓘ microlocal analysis of PDEs ⓘ singularity classification ⓘ study of differential equations ⓘ theory of stratifications ⓘ transversality arguments ⓘ

Referenced by (2)

Full triples — surface form annotated when it differs from this entity's canonical label.

Bernard Malgrange → notableFor → Malgrange preparation theorem ⓘ

Bernard Malgrange → hasNotableTheorem → Malgrange preparation theorem ⓘ