Abstract
AbstractWe show that there are biases in the number of appearances of the parts in two residue classes in the set of ordinary partitions. More precisely, let
$p_{j,k,m} (n)$
be the number of partitions of n such that there are more parts congruent to j modulo m than parts congruent to k modulo m for
$m \geq 2$
. We prove that
$p_{1,0,m} (n)$
is in general larger than
$p_{0,1,m} (n)$
. We also obtain asymptotic formulas for
$p_{1,0,m}(n)$
and
$p_{0,1,m}(n)$
for
$m \geq 2$
.
Publisher
Cambridge University Press (CUP)
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