We evaluate the complex archimedean part of Godement-Jacquet zeta integrals for GL(2). We explicitly give test vectors for the zeta integrals, that is we show the coincidence of the zeta integrals and the Langlands L-factors by direct computation of zeta integrals
We introduce an “L-function” L built up from the integral representation of the Barnes’ multiple zet...
AbstractIgusa has discussed the general form for the functional equation of the family of p-adic zet...
International audienceIn a paper by Badulescu, results on the global Jacquet-Langlands correspondenc...
This thesis mainly comprises two parts. Both parts are related with local archimedean zeta integrals...
This is an announcement of a new result which is a generalization of Popa’s result in [Po]. Popa giv...
University of Minnesota Ph.D. dissertation. September 2018. Major: Mathematics. Advisor: Benjamin Br...
Let E be a quadratic semisimple extension of a local field F of characteristic zero. We determine ex...
In the last talk of this lecture series we will examine the relation between the p-adic L-functions ...
In this paper, we investigate the mean square estimate for the logarithmic derivative of the Godemen...
Using differential techniques, we compute the Jacquet module of the locally analytic vectors of irre...
This article is a survey on the author's preprint [T. Hara and K. Namikawa, A cohomological interpre...
Given an induced representation of Langlands type ( π , V π ) of GL n ( F ) with F non‐Archimedean, ...
We construct a theory of local gamma factors for $G_2 \times GL_r$ using a functorial lifting from $...
It was observed recently that relations between matrix elements of certain operators in the ${\rm SL...
We provide alternative constructions for the Local Langlands Correspondence for certain reductive gr...
We introduce an “L-function” L built up from the integral representation of the Barnes’ multiple zet...
AbstractIgusa has discussed the general form for the functional equation of the family of p-adic zet...
International audienceIn a paper by Badulescu, results on the global Jacquet-Langlands correspondenc...
This thesis mainly comprises two parts. Both parts are related with local archimedean zeta integrals...
This is an announcement of a new result which is a generalization of Popa’s result in [Po]. Popa giv...
University of Minnesota Ph.D. dissertation. September 2018. Major: Mathematics. Advisor: Benjamin Br...
Let E be a quadratic semisimple extension of a local field F of characteristic zero. We determine ex...
In the last talk of this lecture series we will examine the relation between the p-adic L-functions ...
In this paper, we investigate the mean square estimate for the logarithmic derivative of the Godemen...
Using differential techniques, we compute the Jacquet module of the locally analytic vectors of irre...
This article is a survey on the author's preprint [T. Hara and K. Namikawa, A cohomological interpre...
Given an induced representation of Langlands type ( π , V π ) of GL n ( F ) with F non‐Archimedean, ...
We construct a theory of local gamma factors for $G_2 \times GL_r$ using a functorial lifting from $...
It was observed recently that relations between matrix elements of certain operators in the ${\rm SL...
We provide alternative constructions for the Local Langlands Correspondence for certain reductive gr...
We introduce an “L-function” L built up from the integral representation of the Barnes’ multiple zet...
AbstractIgusa has discussed the general form for the functional equation of the family of p-adic zet...
International audienceIn a paper by Badulescu, results on the global Jacquet-Langlands correspondenc...
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