Spencer Differential Degeneration Theory and Its Applications in Algebraic Geometry

TL;DR

This paper develops a complete Spencer differential degeneration theory linking it to classical de Rham theory, with applications in algebraic geometry, especially on K3 surfaces, revealing new geometric and algebraic insights.

Contribution

It introduces a complete Spencer differential degeneration framework, proving its stability under mirror transformations and connecting it to de Rham cohomology in algebraic geometry.

Findings

Spencer differential degenerates to exterior differential under kernel conditions.

Degeneration condition remains stable under mirror transformations.

Framework helps identify algebraic (1,1)-Hodge classes on K3 surfaces.

Abstract

Based on the compatible pair theory of principal bundle constraint systems, this paper discovers and establishes a complete Spencer differential degeneration theory. We prove that when symmetric tensors satisfy a $\lambda$-dependent kernel condition $\delta_{\mathfrak{g}}^{\lambda}(s)=0$, the Spencer differential degenerates to the standard exterior differential, thus establishing a precise bridge between the complex Spencer theory and the classical de Rham theory. One of the advances in this paper is the rigorous proof that this degeneration condition remains stable under mirror transformations, revealing the profound symmetry origins of this phenomenon. Based on these rigorous mathematical results, we construct a canonical mapping from degenerate Spencer cocycles to de Rham cohomology and elucidate its geometric meaning. Finally, we demonstrate the application potential of this theory in algebraic geometry, particularly on K3 surfaces, where we preliminarily verify that this framework can systematically identify (1,1)-Hodge classes satisfying algebraicity conditions. This work provides new perspectives and technical approaches for studying algebraic invariants using tools from constraint geometry.