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Abstract:We study sharp exponents in inequalities for pairs of finite geometric blocks. We characterize exactly when the endpoint $t=1$ determines the optimal exponent and compute the exponent that is uniform in the length of one block. For a two-term first block the answer is $p_0=\log 4/\log 6$. This yields a uniform two-slice max-convolution inequality and, for every $m,d\ge1$, the dimension-free mixed-alphabet sumset bound \[
|A+B|\ge (|A||B|)^{p_0},
\qquad
A\subset\{0,1\}^d,\quad
B\subset\{0,1,\ldots,m\}^d. \] For every $m\ge2$, the exponent $p_0$ is best possible; for $m=1$, a larger exponent is available.

Submission history

From: Johannes Hosle [view email]
[v1] Wed, 24 Jun 2026 03:33:28 UTC (17 KB)