Weyl’s law for arbitrary archimedean type

Weyl’s law for arbitrary archimedean type

We generalize the work of Lindenstrauss and Venkatesh establishing Weyl’s Law for cusp forms from the spherical spectrum to arbitrary archimedean type. Weyl’s law for the spherical spectrum gives an asymptotic formula for the number of cusp forms that are bi- K ∞ invariant in terms of eigenvalue T o...

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Veröffentlicht in:Manuscripta mathematica 2024-11, Vol.175 (3-4), p.971-1001
1. Verfasser: Maiti, Ayan
Format: Artikel
Sprache:eng
Schlagworte:
Algebraic Geometry
Asymptotic properties
Calculus of Variations and Optimal Control
Optimization
Cusps
Eigenvalues
Geometry
Lie Groups
Mathematics
Mathematics and Statistics
Number Theory
Topological Groups
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Beschreibung
Zusammenfassung:We generalize the work of Lindenstrauss and Venkatesh establishing Weyl’s Law for cusp forms from the spherical spectrum to arbitrary archimedean type. Weyl’s law for the spherical spectrum gives an asymptotic formula for the number of cusp forms that are bi- K ∞ invariant in terms of eigenvalue T of the Laplacian. We prove that an analogous asymptotic holds for cusp forms with archimedean type τ , where the main term is multiplied by dim τ . While in the spherical case, the surjectivity of the Satake Map was used, in the more general case that is not available and we use Arthur’s Paley–Wiener theorem and multipliers.
ISSN:0025-2611
1432-1785
DOI:10.1007/s00229-024-01584-w