6533b870fe1ef96bd12cf284

RESEARCH PRODUCT

F-signature of pairs: Continuity, p-fractals and minimal log discrepancies

Karl SchwedeKevin TuckerManuel Blickle

subject

General Mathematics010102 general mathematicsRegular polygonMultiplicity (mathematics)Mathematics - Commutative AlgebraCommutative Algebra (math.AC)01 natural sciencesUpper and lower bounds13A35 13D40 14B05 13H10 14F18CombinatoricsMathematics - Algebraic GeometryFractalClose relationship0103 physical sciencesFOS: Mathematics010307 mathematical physics0101 mathematicsAlgebraic Geometry (math.AG)Mathematics

description

This paper contains a number of observations on the {$F$-signature} of triples $(R,\Delta,\ba^t)$ introduced in our previous joint work. We first show that the $F$-signature $s(R,\Delta,\ba^t)$ is continuous as a function of $t$, and for principal ideals $\ba$ even convex. We then further deduce, for fixed $t$, that the $F$-signature is lower semi-continuous as a function on $\Spec R$ when $R$ is regular and $\ba$ is principal. We also point out the close relationship of the signature function in this setting to the works of Monsky and Teixeira on Hilbert-Kunz multiplicity and $p$-fractals. Finally, we conclude by showing that the minimal log discrepancy of an arbitrary triple $(R,\Delta,\ba^t)$ is an upper bound for the $F$-signature.

yearjournalcountryeditionlanguage
2011-11-11
https://dx.doi.org/10.48550/arxiv.1111.2762