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Abstract We study holomorphic mapsFfrom a smooth Levi non-degenerate real hypersurface$$ M_{\ell }\subset {\mathbb {C}}^n $$ into a hyperquadric$$ {\mathbb {H}}_{\ell '}^N $$ with signatures$$ \ell \le (n-1)/2 $$ and$$ \ell '\le (N-1)/2,$$ respectively. Assuming that$$ N - n < n - 1,$$ we prove that if$$ \ell = \ell ',$$ thenFis either CR transversal to$$ {\mathbb {H}}_{\ell }^N $$ at every point of$$ M_{\ell },$$ or it maps a neighborhood of$$ M_{\ell } $$ in$$ {\mathbb {C}}^n $$ into$$ {\mathbb {H}}_{\ell }^N.$$ Furthermore, in the case where$$ \ell ' > \ell ,$$ we show that ifFis not CR transversal at$$0\in M_\ell ,$$ then it must be transversally flat. The latter is best possible.
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The half-volume spectrum of a manifold
Abstract We define the half-volume spectrum$$\{{\tilde{\omega }_p\}_{p\in \mathbb {N}}}$$ of a closed manifold$$(M^{n+1},g)$$ . This is analogous to the usual volume spectrum ofM, except that we restrict top-sweepouts whose slices each enclose half the volume ofM. We prove that the Weyl law continues to hold for the half-volume spectrum. We define an analogous half-volume spectrum$$\tilde{c}(p)$$ in the phase transition setting. Moreover, for$$3 \le n+1 \le 7$$ , we use the Allen–Cahn min-max theory to show that each$$\tilde{c}(p)$$ is achieved by a constant mean curvature surface enclosing half the volume ofMplus a (possibly empty) collection of minimal surfaces with even multiplicities.
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- Award ID(s):
- 2243149
- PAR ID:
- 10588227
- Publisher / Repository:
- Springer Science + Business Media
- Date Published:
- Journal Name:
- Calculus of Variations and Partial Differential Equations
- Volume:
- 64
- Issue:
- 5
- ISSN:
- 0944-2669
- Format(s):
- Medium: X
- Sponsoring Org:
- National Science Foundation
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