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181   $ctxt
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183   $acr
200 10$aBasic global relative invariants for homogeneous linear differential equations /$fRoger Chalkley
210  1$aProvidence, Rhode Island :$cAmerican Mathematical Society,$d[2002]
210  4$d©2002
215   $a1 online resource (223 p.)
225 1 $aMemoirs of the American Mathematical Society,$x0065-9266 ;$vnumber 744
300   $a"Volume 156, number 744 (end of volume)."
311   $a0-8218-2781-2 
320   $aIncludes bibliographical references (pages 197-199) and index.
327   $a""Chapter 4. L[sub(n)] and I[sub(n,i)] as Semi-Invariants of the First Kind""""Chapter 5. V[sub(n)] and J[sub(n,i)] as Semi-Invariants of the Second Kind""; ""Chapter 6. The Coefficients of Transformed Equations""; ""6.1. Alternative formulas for c**[sub(i)](I??) in (1.5)""; ""6.2. The coefficients of a composite transformation""; ""6.3. Several examples""; ""6.4. Proof of an old observation""; ""6.5. Conditions for transformed equations""; ""6.6. Formulas for later reference""; ""Chapter 7. Formulas That Involve L[sub(n)](z) or I[sub(n,n)](z)""
327   $a""7.1. The coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""""7.2. Derivatives for the coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""; ""7.3. Identities for the coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""; ""Chapter 8. Formulas That Involve V[sub(n)](z) or J[sub(n,n)](z)""; ""8.1. The coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""; ""8.2. Derivatives for the coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""
327   $a""8.3. Identities for the coefficients of (6.8) when d[sub(1)](I??) a??¡ d[sub(2)]((I??) a??¡ 0""""Chapter 9. Verification of I[sub(n,n)] a??¡ J[sub(n,n)]and Various Observations""; ""9.1. Proof for the first part of the Main Theorem in Chapter 1""; ""9.2. Global sets""; ""9.3. A fourth type of invariant: an absolute invariant""; ""9.4. Laguerre-Forsyth canonical forms""; ""Chapter 10. The Local Constructions of Earlier Research""; ""10.1. Standard techniques""; ""10.2. An improved computational procedure""; ""10.3. Hindrances to earlier research""
327   $a""Chapter 11. Relations for G[sub(i)], H[sub(i)], and L[sub(i)] That Yield Equivalent Formulas for Basic Relative Invariants""
410  0$aMemoirs of the American Mathematical Society ;$vno. 744.
606   $aDifferential equations, Linear
606   $aInvariants
615  0$aDifferential equations, Linear.
615  0$aInvariants.
676   $a510 s
676   $a515/.354
700   $aChalkley$b Roger$f1931-$01653336
801  0$bMiAaPQ
801  1$bMiAaPQ
801  2$bMiAaPQ
906   $aBOOK
912   $a9910818970703321
996   $aBasic global relative invariants for homogeneous linear differential equations$94004604
997   $aUNINA