Hilbert modular
WebSep 21, 2009 · For the p-adic Galois representation associated to a Hilbert modular form, Carayol has shown that, under a certain assumption, its restriction to the local Galois group at a finite place not dividing p is compatible with the local Langlands correspondence. Under the same assumption, we show that the same is true for the places dividing p, in the … http://math.bu.edu/people/jsweinst/Teaching/MA843/AdelicModularForms.pdf
Hilbert modular
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Webon the Hilbert modular case. Finally, we remark that there is a rather different method to compute the Hecke action on Hilbert modular forms using the Jacquet–Langlands correspon-dence. For details we refer to work of L. Demb´el´e [14,15]. However, the Jacquet– Langlands technique works only with the complex cohomology of subgroups of … Webthe modular curve into the Hilbert modular sur-face. We have SL2(Z) ,→ SL2(O F) and h,→ h × h giving rise to SL2(Z)\h,→ SL2(O F)\(h × h). More generally, we can work with a congruence subgroup. The projection of these cycles to each π component produces a Tate class in each IH2(π) for which πis a lift. Embedding the modular curve ...
WebHILBERT'S MODULAR GROUP OF THE FIELD Q (√5) AND THE CUBIC DIAGONAL SURFACE OF CLEBSCH AND KLEIN F. Hirzebruch Published 1 October 1976 Mathematics Russian Mathematical Surveys View via Publisher Save to Library Create Alert Cite 28 Citations Citation Type More Filters Hilbert Modular Forms E. Freitag Mathematics 1990 In mathematics, a Hilbert modular surface or Hilbert–Blumenthal surface is an algebraic surface obtained by taking a quotient of a product of two copies of the upper half-plane by a Hilbert modular group. More generally, a Hilbert modular variety is an algebraic variety obtained by taking a quotient of a product of multiple copies of the upper half-plane by a Hilbert modular group. Hilbert modular surfaces were first described by Otto Blumenthal (1903, 1904) using some unpu…
WebOutlineTorus embeddingsHilbert modular varieties and their boundary componentsToroidal compacti cation analytic theoryAlgebraic theory Toroidal compacti cations of Hilbert … WebHILBERT MODULAR FORMS AND THEIR GALOIS REPRESENTATIONS 3 elements of K. Then we have 4 = dimF D= (dimK D) ×[K: F]. Thus [K: F] is either 4 or 2. If [K: F] = 4, K= D, and …
WebJul 19, 2024 · Given a Hilbert space H, the set P(H) of one-dimensional subspaces of H becomes an orthoset when equipped with the orthogonality relation ⊥ induced by the inner product on H. Here, an orthoset is a pair (X,⊥) of a set X and a symmetric, irreflexive binary relation ⊥ on X. In this contribution, we investigate what conditions on an orthoset (X,⊥) …
WebThe foliated Hilbert modular surface (XD,FD) presents a similar struc-ture, with the fibration p : X → V replaced by the holomorphic foliation AD coming from the level sets of τ 1 on … how many drops of sweet oil for earacheWebcertain Hilbert modular surface: we have V ˆ ˘= (H H)= ˆ M2; where is commensurable to SL2(OK), and parameterizes those X ad-mitting real multiplication by a given order in K. Let us say ! is a Weierstrass form if its zero divisor is concentrated at a single point. By imposing this additional condition, we reduce from surfaces to curves and ... high tides chartWebA Hilbert modular variety Σ = Hg/Γ is a quotient of Hg by a lattice Γ ⊂ SL2(K). A typical example is provided by Γ = SL2(OK), where OK is the ring of integers in K. These varieties arise naturally in connection with real multiplication, as follows. high tides at snack jack restaurantWebModular Homes. Modular homes are built in only half the time it takes to build a conventional custom home. Our legendary craftsmanship combined with our use of the … how many drops of stevia for one cup coffeeWebThe moduli spaces of such abelian surfaces are Hilbert modular surfaces. Since the moduli spaces of polarized complex abelian varieties are Siegel modular varieties we find natural maps of Hilbert modular surfaces to Siegel modular threefolds. high tides bay of fundyWebNov 20, 2024 · In this article we refine the method of Bertolini and Darmon $\left[ \text{BD}1 \right],\,\left[ \text{BD2} \right]$ and prove several finiteness results for anticyclotomic Selmer groups of Hilbert modular forms of parallel weight two. high tides at snack jacks flagler beachWebJun 15, 2006 · Hilbert Modular Forms and Iwasawa Theory Haruzo Hida Published: 15 June 2006 Cite Permissions Share Abstract The 1995 work by Wiles and Taylor-Wiles opened up a whole new technique in algebraic number theory and, a decade on, the waves caused by this incredibly important work are still being felt. high tides clacton