Local invariant cycle theorem

In mathematics, the local invariant cycle theorem was originally a conjecture of Griffiths ^[1] which states that, given a surjective proper map ${\displaystyle p}$ from a Kähler manifold ${\displaystyle X}$ to the unit disk that has maximal rank everywhere except over 0, each cohomology class on ${\displaystyle p^{-1}(t),t\neq 0}$ is the restriction of some cohomology class on the entire ${\displaystyle X}$ if the cohomology class is invariant under a circle action (monodromy action); in short,

${\displaystyle \operatorname {H} ^{*}(X)\to \operatorname {H} ^{*}(p^{-1}(t))^{S^{1}}}$

is surjective.^[2]

In algebraic geometry, Deligne proved the following analog.^[3][4] Given a proper morphism ${\displaystyle X\to S}$ over the spectrum ${\displaystyle S}$ of the henselization of ${\displaystyle k[T]}$, ${\displaystyle k}$ an algebraically closed field, if ${\displaystyle X}$ is essentially smooth over ${\displaystyle k}$ and ${\displaystyle X_{\overline {\eta }}}$ smooth over ${\displaystyle {\overline {\eta }}}$, then the homomorphism on ${\displaystyle \mathbb {Q} }$-cohomology:

${\displaystyle \operatorname {H} ^{*}(X_{s})\to \operatorname {H} ^{*}(X_{\overline {\eta }})^{\operatorname {Gal} ({\overline {\eta }}/\eta )}}$

is surjective, where ${\displaystyle s,\eta }$ are the special and generic points and the homomorphism is the composition ${\displaystyle \operatorname {H} ^{*}(X_{s})\simeq \operatorname {H} ^{*}(X)\to \operatorname {H} ^{*}(X_{\eta })\to \operatorname {H} ^{*}(X_{\overline {\eta }}).}$

• Hodge theory

• Clemens, C. H. Degeneration of Kähler manifolds. Duke Math. J. 44 (1977), no. 2, 215–290.
• Deligne, Pierre, La conjecture de Weil : II, Publications Mathématiques de l'IHÉS, Tome 52 (1980), pp. 137–252.
• Morrison, David R. The Clemens-Schmid exact sequence and applications, Topics in transcendental algebraic geometry (Princeton, N.J., 1981/1982), 101-119, Ann. of Math. Stud., 106, Princeton Univ. Press, Princeton, NJ, 1984. [1]

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