Mathematics – K-Theory and Homology
Scientific paper
2007-06-09
Mathematics
K-Theory and Homology
LaTeX, 17 pages
Scientific paper
Let $\g_1$ and $\g_2$ be two dg Lie algebras, then it is well-known that the $L_\infty$ morphisms from $\g_1$ to $\g_2$ are in 1-1 correspondence to the solutions of the Maurer-Cartan equation in some dg Lie algebra $\Bbbk(\g_1,\g_2)$. Then the gauge action by exponents of the zero degree component $\Bbbk(\g_1,\g_2)^0$ on $MC\subset\Bbbk(\g_1,\g_2)^1$ gives an explicit "homotopy relation" between two $L_\infty$ morphisms. We prove that the quotient category by this relation (that is, the category whose objects are $L_\infty$ algebras and morphisms are $L_\infty$ morphisms modulo the gauge relation) is well-defined, and is a localization of the category of dg Lie algebras and dg Lie maps by quasi-isomorphisms. As localization is unique up to an equivalence, it is equivalent to the Quillen-Hinich homotopical category of dg Lie algebras [Q1,2], [H1,2]. Moreover, we prove that the Quillen's concept of a homotopy coincides with ours. The last result was conjectured by V.Dolgushev [D].
No associations
LandOfFree
An explicit construction of the Quillen homotopical category of dg Lie algebras does not yet have a rating. At this time, there are no reviews or comments for this scientific paper.
If you have personal experience with An explicit construction of the Quillen homotopical category of dg Lie algebras, we encourage you to share that experience with our LandOfFree.com community. Your opinion is very important and An explicit construction of the Quillen homotopical category of dg Lie algebras will most certainly appreciate the feedback.
Profile ID: LFWR-SCP-O-677538