Hodge-Riemann property of Griffiths positive matrices with (1,1)-form entries
Abstract
The classical Hard Lefschetz theorem (HLT), Hodge-Riemann bilinear relation theorem (HRR) and Lefschetz decomposition theorem (LD) are stated for a power of a K\"ahler class on a compact K\"ahler manifold. These theorems are not true for an arbitrary class, even if it contains a smooth strictly positive representative. Dinh-Nguy\en proved the mixed HLT, HRR and LD for a product of arbitrary K\"ahler classes. Instead of products, they asked whether determinants of Griffiths positive k× k matrices with (1,1)-form entries in n satisfies these theorems in the linear case. This paper answered their question positively when k=2 and n=2,3. Moreover, assume that the matrix only has diagonalized entries, for k=2 and n≥slant 4, the determinant satisfies HLT for bidegrees (n-2,0), (n-3,1), (1,n-3) and (0,n-2). In particular, for k=2 and n=4,5 with this extra assumption, the determinant satisfies HRR, HLT and LD. Two applications: First, a Griffiths positive 2× 2 matrix with (1,1)-form entries, if all entries are C-linear combinations of the diagonal entries, then its determinant also satisfies these theorems. Second, on a complex torus of dimension ≤slant 5, the determinant of a Griffiths positive 2× 2 matrix with diagonalized entries satisfies these theorems.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.