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Research on Equivalent Scale Analysis for On-Orbit Assembly of Ultra-Large Space Structures. [PDF]
Materials (Basel)Zhang D +7 more
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Lipid II unlocked: strategies for obtaining a major antibiotic target.
Chem Commun (Camb)Tyrie LJ, Karak M, Cochrane SA.
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2008
Modular forms are functions with an enormous amount of symmetry that play a central role in number theory, connecting it with analysis and geometry. They have played a prominent role in mathematics since the 19th century and their study continues to flourish today.
Edixhoven, B. +2 more
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Modular forms are functions with an enormous amount of symmetry that play a central role in number theory, connecting it with analysis and geometry. They have played a prominent role in mathematics since the 19th century and their study continues to flourish today.
Edixhoven, B. +2 more
openaire +4 more sources
Mock modular forms and quantum modular forms
Proceedings of the American Mathematical Society, 2015zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Choi, Dohoon +2 more
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Oberwolfach Reports, 2015
The theory of Modular Forms has been central in mathematics with a rich history and connections to many other areas of mathematics. The workshop explored recent developments and future directions with a particular focus on connections to the theory of periods.
Jan Hendrik Bruinier +3 more
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The theory of Modular Forms has been central in mathematics with a rich history and connections to many other areas of mathematics. The workshop explored recent developments and future directions with a particular focus on connections to the theory of periods.
Jan Hendrik Bruinier +3 more
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Journal of Soviet Mathematics, 1983
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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The Quarterly Journal of Mathematics, 2014
We show that the Atiyah-Patodi-Singer reduced $ $-invariant of the twisted Dirac operator on a closed $4m-1$ dimensional spin manifold, with the twisted bundle being the Witten bundle appearing in the theory of elliptic genus, is a meromorphic modular form of weight $2m$ up to an integral $q$-series.
Han, Fei, Zhang, Weiping
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We show that the Atiyah-Patodi-Singer reduced $ $-invariant of the twisted Dirac operator on a closed $4m-1$ dimensional spin manifold, with the twisted bundle being the Witten bundle appearing in the theory of elliptic genus, is a meromorphic modular form of weight $2m$ up to an integral $q$-series.
Han, Fei, Zhang, Weiping
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2014
The theory of Modular Forms has been central in mathematics with a rich history and connections to many other areas of mathematics. The workshop explored recent developments and future directions with a particular focus on connections to the theory of periods.
openaire +2 more sources
The theory of Modular Forms has been central in mathematics with a rich history and connections to many other areas of mathematics. The workshop explored recent developments and future directions with a particular focus on connections to the theory of periods.
openaire +2 more sources
2019
The theory of Modular Forms has been central in mathematics with a rich history and connections to many other areas of mathematics. The workshop explored recent developments and future directions with a particular focus on connections to the theory of periods.
openaire +1 more source
The theory of Modular Forms has been central in mathematics with a rich history and connections to many other areas of mathematics. The workshop explored recent developments and future directions with a particular focus on connections to the theory of periods.
openaire +1 more source
Canadian Journal of Mathematics, 1980
In this paper we construct modular forms from combinatorial designs, and codes over finite fields. We construct codes from designs, and lattices from codes. Then we use the combinatorial properties of the designs and the weight (or shape) structures of the codes to study the theta functions of the associated lattices. These theta functions are shown to
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In this paper we construct modular forms from combinatorial designs, and codes over finite fields. We construct codes from designs, and lattices from codes. Then we use the combinatorial properties of the designs and the weight (or shape) structures of the codes to study the theta functions of the associated lattices. These theta functions are shown to
openaire +2 more sources