Abstract:
In this talk I will discuss tropical mirror developed by me and
S. Lysov in three papers: arXiv:2204.06896, arXiv:2301.01687,
arXiv:2305.00423 based on the concept of Higher Topological Quantum
Mechanics (HTQM) on graphs (arXiv:2112.12756). HTQM is a collection of
data in the linear algebra and I will start with explaining it. Then I
will briefly explain how HTQM may be used in proving Kadeishvili
theorems for $A$-infinity and $L$-infinity case (see also
arXiv:2112.12756). I will proceed with explanation how problem of
counting of tropical curves passing through tropical cycles may be
understood as HTQM with circle action — we will call it $A$-model.
Then sum over graphs in $A$-model would be transformed into sum over
graphs in another HTQM $B$-model (of BCOV type). In this process
differential in $B$-model will happen to be differential in LG Quantum
mechanics, and evaluation operators would be transformed into mirror
states. These states would form a good section in terms of K. Saito
theory with exponential superpotential.