Goss, David - Department of Mathematics, Ohio State University

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Goss, David - Department of Mathematics, Ohio State University

[Ab1] S. Abhyankar: Factorizations over finite fields, in Finite Fields and Applications, London Math. Soc. Lecture Notes Series 233, (1996),
CAN A DRINFELD MODULE BE MODULAR? Abstract. Let k be a global function eld with eld of constants F r , r = p m , and let
3. The Carlitz Module We present here the details of the Carlitz module. This is the simplest of all
APPLICATIONS OF NON-ARCHIMEDEAN INTEGRATION TO THE L-SERIES OF -SHEAVES
3. The Carlitz Module We present here the details of the Carlitz module. This is the simplest of all
[Ab1] S. Abhyankar: Factorizations over finite fields, in Finite Fields and Applications, London Math. Soc. Lecture Notes Series 233, (1996),
APPLICATIONS OF NON-ARCHIMEDEAN INTEGRATION TO THE L-SERIES OF -SHEAVES
The impact of the in nite primes on the Riemann hypothesis for characteristic p
A RIEMANN HYPOTHESIS FOR CHARACTERISTIC p LFUNCTIONS Abstract. We propose analogs of the classical Generalized Riemann Hypothesis and the
A RIEMANN HYPOTHESIS FOR CHARACTERISTIC p L-FUNCTIONS Abstract. We propose analogs of the classical Generalized Riemann Hypothesis and the
ZEROES OF L-SERIES IN CHARACTERISTIC p Abstract. In the classical theory of L-series, the exact order (of zero) at a trivial zero
CAN A DRINFELD MODULE BE MODULAR? Abstract. Let k be a global function field with field of constants Fr, r = pm
The impact of the infinite primes on the Riemann hypothesis for characteristic p
Some Hints on Mathematical Style Many years ago, just after my degree, I had the good fortune to be given some
CAN A DRINFELD MODULE BE MODULAR? DAVID GOSS
Table of Contents 1. Additive Polynomials ................................... 1
Some Hints on Mathematical Style Many years ago, just after my degree, I had the good fortune to be given some
Contents Preface....................................................................i*
ZEROES OF L-SERIES IN CHARACTERISTIC p DAVID GOSS
[Ab1] S. Abhyankar: Factorizations over finite fields, in Finite Fields * Applications, London Math. Soc. Lecture Notes Series 233, (1996),
APPLICATIONS OF NON-ARCHIMEDEAN INTEGRATION TO THE L-SERIES OF o-SHEAVES
The impact of the infinite primes on the Riemann hypothesis for characteristic p
3. The Carlitz Module We present here the details of the Carlitz module. This is the simplest of all
Some Hints on Mathematical Style David Goss
A RIEMANN HYPOTHESIS FOR CHARACTERISTIC p L-FUNCTIONS DAVID GOSS