On the arithmetic and geometry of spaces Lm+1,n

Abstract

Let p be a prime number. Motivated by the local lifting problem for (Z/pZ)n with n>1, we prove several new results on certain Fp-vector spaces of logarithmic differential forms on the projective line in characteristic p, called "spaces Lm+1,n". Expanding the previous work by the first two authors, we prove positive and negative results for the existence of spaces Lm+1,n in many situations. Moreover, we classify all spaces L4p,2 for any p, and all spaces L15,2 for p=3. Among the novel tools we use, Moore determinants and computational algebra play a prominent role.

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