TY - JOUR
T1 - On the Nodal Set of Solutions to Dirac Equations
AU - Borrelli, William
AU - Wu, Ruijun
N1 - Publisher Copyright:
© Mathematica Josephina, Inc. 2026.
PY - 2026/6
Y1 - 2026/6
N2 - Motivated by various geometric problems, we study the nodal set of solutions to Dirac equations on manifolds, of general form. We prove that such set has Hausdorff dimension less than or equal to n-2, n being the ambient dimension. We extend this result, previously known only in the smooth case or in specific cases, working with locally Lipschitz coefficients. Under some additional, but still quite general, structural assumptions we provide a stratification result for the nodal set, which appears to be new already in the smooth case. This is achieved by exploiting the properties of a suitable Almgren-type frequency function, which is of independent interest.
AB - Motivated by various geometric problems, we study the nodal set of solutions to Dirac equations on manifolds, of general form. We prove that such set has Hausdorff dimension less than or equal to n-2, n being the ambient dimension. We extend this result, previously known only in the smooth case or in specific cases, working with locally Lipschitz coefficients. Under some additional, but still quite general, structural assumptions we provide a stratification result for the nodal set, which appears to be new already in the smooth case. This is achieved by exploiting the properties of a suitable Almgren-type frequency function, which is of independent interest.
KW - Dirac equation
KW - Frequency function
KW - Hausdorff dimension
KW - Nodal set
KW - Stratification
UR - https://www.scopus.com/pages/publications/105038746908
U2 - 10.1007/s12220-026-02443-8
DO - 10.1007/s12220-026-02443-8
M3 - Article
AN - SCOPUS:105038746908
SN - 1050-6926
VL - 36
JO - Journal of Geometric Analysis
JF - Journal of Geometric Analysis
IS - 6
M1 - 195
ER -