Characters and projective characters of alternating and symmetric groups determined by values on l'-classes
Abstract
This paper identifies all pairs of ordinary irreducible characters of the alternating group which agree on conjugacy classes of elements of order not divisible by a fixed integer l, for l ≠ 3. We do the same for the double covers of the symmetric and alternating groups. The only such characters are the conjugate or associate pairs labelled by partitions with a certain parameter divisible by l. When l is prime, this implies that the rows of the l-modular decomposition matrix are distinct except for the rows labelled by these pairs. When l=3 we exhibit many additional examples of such pairs of characters.
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