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Funke, J., & Millson, J. (2011). Spectacle cycles with coefficients and modular forms of half-integral weight. In J. Cogdell, J. Funke, M. Rapoport, & T. Yang (Eds.), Arithmetic geometry and automorphic forms (91-154).
Research. Areas of Interest: Number theory, automorphic and modular forms, representation theory, cohomology of arithmetic groups. Research Topics: I am interested in cohomology classes of arithmetic quotients of orthogonal and unitary symmetric spaces which arise from certain naturally embedded submanifolds.
Today Ben and I are joined by the legendary Jens Funke who talks to us about his research into number theory! We also discuss topics such as the importance o...
Jens Funke. Department of Mathematical Sciences University of Durham Science Laboratories, South Rd Durham DH1 3LE United Kingdom tel. +44 191 3343063 email: jens.funke@durham.ac.uk webpage: www.maths.dur.ac.uk/ dma0jf. Education. Ph.D. in Mathematics, University of Maryland, College Park, May 1999 Advisor: S. S. Kudla.
Jens Funke's 26 research works with 715 citations and 555 reads, including: On Jacobi--Weierstrass mock modular forms Jens Funke's research while affiliated with Durham University and...
1 de mar. de 2019 · Jens Funke, Eric Hofmann. With applications in the Kudla program in mind we employ singular theta lifts for the reductive dual pair $U (p,q)\times U (1,1)$ to construct two different kinds of Green forms for codimension $q$-cycles in Shimura varieties associated to unitary groups.
1 de out. de 2007 · Jens Funke via Crossref Metadata Search Cycles in hyperbolic manifolds of non-compact type and Fourier coefficients of Siegel modular forms manuscripta mathematica