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D.5.2 chern_lib
- Library:
- chern.lib
- Purpose:
- Symbolic Computations with Chern classes,
Computation of Chern classes
- Author:
- Oleksandr Iena, o.g.yena@gmail.com
- Overview:
- A toolbox for symbolic computations with Chern classes.
The Aluffi's algorithms for computation of characteristic classes of algebraic varieties
(Segre, Fulton, Chern-Schwartz-MacPherson classes) are implemented as well.
- References:
- [1] Aluffi, Paolo Computing characteristic classes of projective schemes.
Journal of Symbolic Computation, 35 (2003), 3-19.
[2] Iena, Oleksandr, On symbolic computations with Chern classes:
remarks on the library chern.lib for Singular,
http://hdl.handle.net/10993/22395, 2015.
[3] Lascoux, Alain, Classes de Chern d'un produit tensoriel. C. R. Acad. Sci., Paris, Ser. A 286, 385-387 (1978). [4] Manivel, Laurent Chern classes of tensor products, arXiv 1012.0014, 2010.
Procedures:
D.5.2.1 symm symmetric functions in the entries of l D.5.2.2 symNsym symmetric and non-symmetric parts of a polynomial f D.5.2.3 CompleteHomog complete homogeneous symmetric functions D.5.2.4 segre Segre classes in terms of Chern classes D.5.2.5 chern Chern classes in terms of Segre classes D.5.2.6 chNum the non-zero Chern numbers in degree N in the entries of c D.5.2.7 chNumbers the Chern numbers in degree N in the entries of c D.5.2.8 sum_of_powers the sum of k-th powers of the entries of l D.5.2.9 powSumSym the sums of powers [up to degree N] in terms of the elementary symmetric polynomials (entries of l) D.5.2.10 chAll Chern character in terms of the Chern classes D.5.2.11 chAllInv Chern classes in terms of the Chern character D.5.2.12 chHE the highest term of the Chern character D.5.2.13 ChernRootsSum the Chern roots of a direct sum D.5.2.14 chSum the Chern classes of a direct sum D.5.2.15 ChernRootsDual the Chern roots of the dual vector bundle D.5.2.16 chDual the Chern classes of the dual vector bundle D.5.2.17 ChernRootsProd the Chern roots of a tensor product of vector bundles D.5.2.18 chProd Chern classes of a tensor product of vector bundles D.5.2.19 chProdE Chern classes of a tensor product of vector bundles D.5.2.20 chProdL Chern classes of a tensor product of vector bundles D.5.2.21 chProdLP total Chern class of a tensor product of vector bundles D.5.2.22 chProdM Chern classes of a tensor product of vector bundles D.5.2.23 chProdMP total Chern class of a tensor product of vector bundles D.5.2.24 ChernRootsHom the Chern roots of a Hom vector bundle D.5.2.25 chHom Chern classes of the Hom-vector bundle D.5.2.26 ChernRootsSymm the Chern roots of the n-th symmetric power of a vector bundle with Chern roots from l D.5.2.27 ChernRootsWedge the Chern roots of the n-th exterior power of a vector bundle with Chern roots from l D.5.2.28 chSymm the rank and the Chern classes of the k-th symmetric power of a vector bundle of rank r with Chern classes c D.5.2.29 chSymm2L the rank and the Chern classes of the second symmetric power of a vector bundle of rank r with Chern classes c D.5.2.30 chSymm2LP the total Chern class of the second symmetric power of a vector bundle of rank r with Chern classes c D.5.2.31 chWedge the rank and the Chern classes of the k-th exterior power of a vector bundle of rank r with Chern classes c D.5.2.32 chWedge2L the rank and the Chern classes of the second exterior power of a vector bundle of rank r with Chern classes c D.5.2.33 chWedge2LP the total Chern class of the second exterior power of a vector bundle of rank r with Chern classes c D.5.2.34 todd the Todd class D.5.2.35 toddE the highest term of the Todd class D.5.2.36 Bern the second Bernoulli numbers D.5.2.37 tdCf the coefficients of the Todd class of a line bundle D.5.2.38 tdTerms the terms of the Todd class of a line bundle corresponding to the Chern root t D.5.2.39 tdFactor the Todd class of a line bundle corresponding to the Chern root t D.5.2.40 cProj the total Chern class of (the tangent bundle on) the projective space P_n D.5.2.41 chProj the Chern character of (the tangent bundle on) the projective space P_n D.5.2.42 tdProj the Todd class of (the tangent bundle on) the projective space P_n D.5.2.43 eulerChProj Euler characteristic of a vector bundle on the projective space P_n via Hirzebruch-Riemann-Roch theorem D.5.2.44 chNumbersProj the Chern numbers of the projective space P_n D.5.2.45 classpoly polynomial in t with coefficients from l (without constant term) D.5.2.46 chernPoly Chern polynomial (constant term 1) D.5.2.47 chernCharPoly polynomial in t corresponding to the Chern character (constant term r) D.5.2.48 toddPoly polynomial in t corresponding to the Todd class (constant term 1) D.5.2.49 rHRR the main ingredient of the right-hand side of the Hirzebruch-Riemann-Roch formula D.5.2.50 SchurS the Schur polynomial corresponding to partition I in terms of the Segre classes S D.5.2.51 SchurCh the Schur polynomial corresponding to partition I in terms of the Chern classes C D.5.2.52 part partitions of integers not exceeding n into m non-negative summands D.5.2.53 dualPart partition dual to I D.5.2.54 PartC the complement of a partition with respect to m D.5.2.55 partOver partitions over a given partition J with summands not exceeding n D.5.2.56 partUnder partitions under a given partition J D.5.2.57 SegreA Segre class of the projective subscheme defined by I D.5.2.58 FultonA Fulton class of the projective subscheme defined by I D.5.2.59 CSMA Chern-Schwartz-MacPherson class of the projective subscheme defined by I D.5.2.60 EulerAff Euler characteristic of the affine subvariety defined by I D.5.2.61 EulerProj Euler characteristic of the projective subvariety defined by I