Hilbert modular

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August undefined, 2024

WebOct 8, 2024 · Let f be a primitive Hilbert modular cusp form of arbitrary level and parallel weight k, defined over a totally real number field F. We define a finite set of primes S{\mathcal{S}} that depends on ... WebHilbert modular variety (cf. [RT11, Section 3.1.9]). When F =Qand w=2−k we recover the usual notion of an elliptic modular form of weight k. If p is a prime number, then (by Eichler, Shimura, Deligne, Wiles, Tay-lor, Blasius-Rogawski) …

SHORT INTRODUCTION TO HILBERT MODULAR SURFACES …

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WebHilbert modular forms and varieties Applications of Hilbert modular forms The Serre conjecture for Hilbert modular forms The next three lectures: goal Classical Hilbert … WebModular forms are functions with loads of symmetry, and this symmetry causes things like spaces of modular forms to have nite dimensionality and nice congruences and … WebOct 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 … granny\\u0027s old fashioned coconut cake

HILBERT

WebOver the last 15 years important results have been achieved in the field of Hilbert Modular Varieties. Though the main emphasis of this book is on the geometry of Hilbert modular surfaces, both geometric and arithmetic aspects are treated. An abundance of examples - in fact a whole chapter - completes this competent presentation of the subject. 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. chinthanya thammasaroWebThe 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 … granny\u0027s on the river

"Webcertain 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. … " - Hilbert modular

Hilbert modular

Borcherds products and arithmetic intersection theory on Hilbert ...

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… WebHilbert-Jan heeft 4 functies op zijn of haar profiel. Bekijk het volledige profiel op LinkedIn om de connecties van Hilbert-Jan en vacatures bij …

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WebRemark 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]. WebThe 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.

WebIn mathematical physics, Hilbert system is an infrequently used term for a physical system described by a C*-algebra. In logic, especially mathematical logic, a Hilbert system, … WebJul 21, 2024 · My old book on Hilbert modular forms does a mildly adelic, but not overtly representation-theoretic, proof that Hilbert modular theta series are Hilbert modular forms.) And, yes, the archimedean theta correspondence sends the trivial repn of real-anisotropic orthogonal groups to holomorphic discrete series. Also, non-trivial repns, attached to ...

Webcertain 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 ... WebOct 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.

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.

WebThe quotient of the Hilbert modular group by its level 2 congruence subgroup is isomorphic to the alternating group of order 60 on 5 points. Like all nonsingular cubic surfaces, the Clebsch cubic can be obtained by blowing up the projective planein 6 points. Klein (1873)described these points as follows. chinthanaWebMotivated by the above discussion, for the rest of the introduction, we use the symbol fto denote a Hilbert modular form (for F) of weight (k;2), and discuss in turn the two periods that one can attach to such an fthat capture the transcendental 6 part of critical values of the Asai L-function of f. granny\u0027s originalWebSTRATIFICATIONS OF HILBERT MODULAR VARIETIES E. Z. GOREN AND F. OORT Abstract. We consider g-dimensional abelian varieties in characteristic p, with a given action of O L- the ring of integers of a totally real eld Lof degree g. A strati cation of the associated moduli spaces is de ned by considering the action of O granny\\u0027s orange slice cakeWebDans 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. chintha palliWebNov 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. chinthapalli forestWebIn order to generalize the notion of modular forms to other number elds (or function elds) in a uniform way, there is little alternative to the adelic theory. As for the last point, one can survive for a time studying Hilbert modular forms, Maass waveforms, Bianchi modular forms, etc, as these all can still be chinthapally pincodeWebWe give an introduction to the theory of Hilbert modular... The present notes contain the material of the lectures given by the author at the summer school on “Modular Forms and … granny\u0027s old fashioned peanut butter fudge