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Abstract We introduce the immersion poset$$({\mathcal {P}}(n), \leqslant _I)$$ on partitions, defined by$$\lambda \leqslant _I \mu $$ if and only if$$s_\mu (x_1, \ldots , x_N) - s_\lambda (x_1, \ldots , x_N)$$ is monomial-positive. Relations in the immersion poset determine when irreducible polynomial representations of$$GL_N({\mathbb {C}})$$ form an immersion pair, as defined by Prasad and Raghunathan [7]. We develop injections$$\textsf{SSYT}(\lambda , \nu ) \hookrightarrow \textsf{SSYT}(\mu , \nu )$$ on semistandard Young tableaux given constraints on the shape of$$\lambda $$ , and present results on immersion relations among hook and two column partitions. The standard immersion poset$$({\mathcal {P}}(n), \leqslant _{std})$$ is a refinement of the immersion poset, defined by$$\lambda \leqslant _{std} \mu $$ if and only if$$\lambda \leqslant _D \mu $$ in dominance order and$$f^\lambda \leqslant f^\mu $$ , where$$f^\nu $$ is the number of standard Young tableaux of shape$$\nu $$ . We classify maximal elements of certain shapes in the standard immersion poset using the hook length formula. Finally, we prove Schur-positivity of power sum symmetric functions on conjectured lower intervals in the immersion poset, addressing questions posed by Sundaram [12].
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This content will become publicly available on May 28, 2026
On a Bohr set analogue of Chowla’s conjecture
Abstract Let$$\lambda $$ denote the Liouville function. We show that the logarithmic mean of$$\lambda (\lfloor \alpha _1n\rfloor )\lambda (\lfloor \alpha _2n\rfloor )$$ is 0 whenever$$\alpha _1,\alpha _2$$ are positive reals with$$\alpha _1/\alpha _2$$ irrational. We also show that for$$k\geqslant 3$$ the logarithmic mean of$$\lambda (\lfloor \alpha _1n\rfloor )\cdots \lambda (\lfloor \alpha _kn\rfloor )$$ has some nontrivial amount of cancellation, under certain rational independence assumptions on the real numbers$$\alpha _i.$$ Our results for the Liouville function generalise to produce independence statements for general bounded real-valued multiplicative functions evaluated at Beatty sequences. These results answer the two-point case of a conjecture of Frantzikinakis (and provide some progress on the higher order cases), generalising a recent result of Crnčević–Hernández–Rizk–Sereesuchart–Tao. As an ingredient in our proofs, we establish bounds for the logarithmic correlations of the Liouville function along Bohr sets.
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- Award ID(s):
- 1926686
- PAR ID:
- 10625745
- Publisher / Repository:
- Springer Nature
- Date Published:
- Journal Name:
- Mathematische Zeitschrift
- Volume:
- 310
- Issue:
- 4
- ISSN:
- 0025-5874
- Format(s):
- Medium: X
- Sponsoring Org:
- National Science Foundation
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