Hilbert modular
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 … In mathematics, a Hilbert modular form is a generalization of modular forms to functions of two or more variables. It is a (complex) analytic function on the m-fold product of upper half-planes $${\displaystyle {\mathcal {H}}}$$ satisfying a certain kind of functional equation. See more These modular forms, for real quadratic fields, were first treated in the 1901 Göttingen University Habilitationssschrift of Otto Blumenthal. There he mentions that David Hilbert had considered them initially in work from 1893-4, … See more • Siegel modular form • Hilbert modular surface See more
Hilbert modular
Did you know?
WebDec 23, 2024 · In mathematics, a Hilbert modular surface or Hilbert–Blumenthal surface is one of the surfaces obtained by taking a quotient of a product of two copies of the upper … WebDOI: 10.5802/AIF.1569 Corpus ID: 55489674 $p$-adic interpolation of convolutions of Hilbert modular forms @article{Dnger1997padicIO, title={\$p\$-adic interpolation ...
WebJun 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. WebJul 20, 2024 · It doesn't preserve holomorphicity, but it sends holomorphic Hilbert modular forms to "nearly-holomorphic" forms in Shimura's sense. For n = 1 something special happens, which is that the nearly-holomorphic forms are freely generated by E 2 as a polynomial ring over the holomorphic ones.
WebHilbert modular surfaces have been objects of extensive investigation in complex and algebraic geometry, and more recently in number theory. Since Hilbert modular varieties are moduli spaces for abelian varieties with real multiplication by an order in a totally real eld, they have intrinsic arithmetic content. Their geometry WebImportant results on the Hilbert modular group and Hilbert modular forms are introduced and described in this book. In recent times, this branch of number theory has been given …
WebA 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.
WebHilbert modular forms and varieties Applications of Hilbert modular forms The Serre conjecture for Hilbert modular forms The next three lectures: goal Classical Hilbert … phione platinumWebRemark 11. As the name suggests, Hilbert modular forms are connected to Hilbert modular sur-faces. Analogously to the case of modular curves, Hilbert modular forms are related to di erential forms on the Hilbert modular surface. The only complications arise from being careful about the behavior at the singularities [10, I.6, III.3]. phione\u0027s weightWebDans cet article, nous étudions la théorie d’Iwasawa pour les formes modulaires de Hilbert sur l’extension anticyclotomique d’un champ CM. Nous prouvons un résultat de divisibilité unilatérale vers la conjecture principale d’Iwasawa dans ce cadre. phione rarityWebOct 14, 2003 · Borcherds products and arithmetic intersection theory on Hilbert modular surfaces Jan H. Bruinier, Jose I. Burgos Gil, Ulf Kuehn We prove an arithmetic version of a theorem of Hirzebruch and Zagier saying that Hirzebruch-Zagier divisors on a Hilbert modular surface are the coefficients of an elliptic modular form of weight two. phione or manaphyWebOct 14, 2003 · Borcherds products and arithmetic intersection theory on Hilbert modular surfaces. We prove an arithmetic version of a theorem of Hirzebruch and Zagier saying … phione pokedexWebthe 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 ... tsp anchorWebThe 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. tspan8 cell