Green ring of Z/p^e Z equals e-fold tensor product of Green ring of Z/p Z by p-adic expansions, enabling explicit Hilbert-Kunz multiplicity for Fermat quadrics that decreases with characteristic and answers Yoshida's conjecture.
Asymptotic behavior of modular representations over abelian $p$-groups
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abstract
In this paper, we prove some results on the asymptotic behavior arising in modular representation theory over abelian $p$-groups. First, we embed the representation ring of a cyclic $p$-group into a real algebra of functions. Second, we calculate the asymptotic order of the dimension of the core of $n$-th tensor power of a direct sum of syzygies and cosyzygies of the trivial module, which is of the form $C\gamma^nn^\alpha$. This result leads to a negative answer to a question by Benson and Symonds, that is, the dimension of the core of $M^{\otimes n}$ for certain $\Omega$-algebraic module $M$ is not eventually recursive. Third, we give a systematic way of computing the core series of $\Omega$-algebraic modules. Finally, we show the existence of a transcendental core series, which comes from iterated syzygy modules of the trivial representation.
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2026 1verdicts
UNVERDICTED 1representative citing papers
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Hilbert-Kunz multiplicity of quadrics decreases
Green ring of Z/p^e Z equals e-fold tensor product of Green ring of Z/p Z by p-adic expansions, enabling explicit Hilbert-Kunz multiplicity for Fermat quadrics that decreases with characteristic and answers Yoshida's conjecture.