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Series solutions to ODEs: the Frobenius method £5.49   Add to cart

Lecture notes

Series solutions to ODEs: the Frobenius method

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This chapter focuses on ODEs, which are essential when solving PDEs. In particular it show how to solve ordinary differential equation using the Frobenius method, i.e. finding a series solution to the ODE.

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  • August 3, 2023
  • 13
  • 2022/2023
  • Lecture notes
  • Duncan hewitt
  • All classes
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eleonoraagostinelli
Series Solutions to ODEs
theFrobeniusMetht
A generic inFFin Ésradeoroliaryoligantiaquain one hastheform

W tpeewitglow e X

with twolinearlyindependent solutions Walz andWalz and generalsolution

W AW E BWalz
for constant A B
Weknow how tosolve when
look
Pigconstants forsolutions waemz
characteristicpolynomial matpmtq o with roots me ma
Aemz Bent me ma
w At Bzems ma ma


a

Put z ex Wax ween w z Wa exw zw Wa zaw tew
Z'wtzwitazw zu't bw
zaw tazw't bw z w Ew'tbzw o
Wxxt a s Wxtbw o
a
CA Bloge em ma ma
in

The idea ofthe Frobenius METHOD forgeneral p and q lookforseries solutionsexpandedaboutapoi
z z
we E ace za
with CER constant a o acer
coefficients
Isothat firstterminseriesexpansion is aczz.sc
WLOG we can scale zo o
bychange of variables
we will return to discusswhenthis methodwill worklater


EXAMPLE
Findseries solutionabout z o
of wi't w t w o

solution try WE.az't w E aceticzetasand w Eaccctidactica z't's
equation becomes
É ÉÉÉtgÉÉÉJÉn a
E gazer o
s



aceticCork a galacticthars za
or LaoCcc 2
tza.cz't o

, a Ccc s
24 0 INDIGALEQUATION ie
acctk atk a
za can ya RECURRENCERELATION RR

so IE C
zc o c ya c o c o or C Ya

i c o ar ke s
zack g ar act
Iggy
LEI
s


check e byinduction
as
af an
15 15.2 etc ak GIFT g
Solution is wa aoÉ.cz zk aeEEIIcrz a cost

in C Ya a
GEE LEEK
find that ax
ELIF
wa he E 2kt
Solution is
81 a sine

The generalsolution is W AcosetBsintz


Note in general it is not possible tospot a closedformexpressionfor the infinite sum

DEFINITION
A point ordinary PointYjÉn 5ÉÉÉFÉw'tacew e x pazos and
to is an if
qczo are analytic Ci e theyhave a Taylorseriesexpansion
The point z zo is a REGULAR SINGULARPOINT if Z Zo plz and Z Zo2pCz
are analytic at Z zo
but 2plz
e
g in previous example plz Iz qz Iz whichbothhavesinglepolesat z o

and 22g z are bothanalytic infinitelydifferentiable at 2 0 2 0 is a regular
singular point

THEOREM Foch'sTheorem
Thegeneral solution to x can befound as a generalisedcomplexpowerseriesexpanded around
Z Zo provided Ezo is a regularsingularpointof
If
Z Zo is also an ordinarypoint then solutions will beanalytic at z z i.e powerseries will be a
Taylorseries and c o

Note generalisedheremeansthat it may containsome logarithmicterms see later

e g Find seriessolutionabout X e C1 x2 y 2xy thy
for D
and aex
Identify pix
Iya Iya
se p and q are analytic at z o 2 0 is an ordinarypoint
Canimmediatelyset co and y E ax note he isnot constrainedhere

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