Zobrazeno 1 - 10
of 93
pro vyhledávání: '"Fried, Michael D."'
Autor:
Fried, Michael D.
To figure properties of a curve of form $C_{f,g} = {(x,y)| f(x) - g(y)= 0}$ you must address the genus 0 and 1 components of its projective normalization $\tilde C_{f,g}$. For $f$ and $g$ polynomials with $f$ indecomposable, [Fr73a] distinguished $\t
Externí odkaz:
http://arxiv.org/abs/2208.09533
Autor:
Fried, Michael D.
Publikováno v:
Finite Fields and their Applications, Proceedings 14th Inter. Conf. on Finite Fields and their Applications, Vancouver, June 3-7, 2019 Series: De Gruyter Proceedings in Mathematics Edited by: James A. Davis 2020
Using Felgner's problem I revisit a key issue in using the "Galois Stratification Procedure" that first appeared in [FrS76]. The emphasis here is on using arithmetic homotopy to make the production of Poincare; series attached to general diophantine
Externí odkaz:
http://arxiv.org/abs/2208.09476
Introduction to moduli, l-adic representations and the Regular Version of the Inverse Galois Problem
Autor:
Fried, Michael D.
Publikováno v:
In "Teichmuller theory and its impact", in the Nankai Series in Pure, Applied Mathematics and Theoretical Physics, published by the World Scientific Company (2018)
Sect 1 introduces Nielsen classes attached to (G,C), where C is r conjugacy classes in a finite group G, and a braid action on them. These give reduced Hurwitz spaces, denoted H(G,C)^rd. The section concludes with a braid formula for the genus of the
Externí odkaz:
http://arxiv.org/abs/1803.10728
Autor:
FRIED, MICHAEL D.1 mfried@math.uci.edu
Publikováno v:
Albanian Journal of Mathematics. 2023, Vol. 17 Issue 2, p19-80. 62p.
Autor:
Fried, Michael D., Gusic, Ivica
Schinzel's original problem was to describe when an expression f(x)-g(y), with f,g nonconstant and having complex coefficients, is reducible. We call such an (f,g) a Schinzel pair if this happens nontrivially: f(x)-g(y) is newly reducible. Fried acco
Externí odkaz:
http://arxiv.org/abs/1104.1740
Autor:
Fried, Michael d.
H. Davenport's Problem asks: What can we expect of two polynomials, over the integers, with the same ranges on almost all residue class fields? This stood out among many separated variable problems posed by Davenport, D.J. Lewis and A. Schinzel. By b
Externí odkaz:
http://arxiv.org/abs/1012.5297
Autor:
Fried, Michael D.
Publikováno v:
Inst. of Math. Science Analysis 1267, June 2002, Communications in Arithmetic Fundamental Groups, 70-94
Gives the most precise available description of the p-Frattini module for any p-perfect finite group G=G_0 (Thm. 2.8), and therefore of the groups G_{k,ab}, k \ge 0, from which we form the abelianized M(odular) T(ower). \S 4 includes a classification
Externí odkaz:
http://arxiv.org/abs/0910.4219