g = map(D, C, f)A map of factorizations $f : C' \rightarrow D'$ is a sequence of maps $f_i : C'_i \rightarrow D'_{d'+i}$. The new map $g : C \rightarrow D$ is the sequence of maps $g_i : C_i \rightarrow D_{d+i}$ induced by the matrix of $f_i$.
One use for this function is to get the new map of ZZ/d-graded factorizations obtained by shifting the source or target of an existing chain map. For example, one can regard the differential on a factorization can be regarded as a map of degree zero between shifted factorizations.
|
|
|
|
|
|
|
|
|
|
|
The source of this document is in /build/macaulay2-88fgJW/macaulay2-1.25.11+ds/M2/Macaulay2/packages/MatrixFactorizations/MatrixFactorizationsDOC.m2:2677:0.