Thanks.   I should probably give a talk or two when I visit Denmark.
I could give a talk on my derivation of 8 new examples of Artin's
conjecture with Kevin:

Title:  A mod five approach to modularity of icosahedral Galois
representations

Abstract:   Last year Kevin Buzzard and I used the Buzzard-Taylor
theorem along with an explicit modular symbols computation to give eight
new examples of icosahedral Galois representations that satisfy Artin's
conjecture on holomorphicity of their $L$-function.  Our examples have
conductors 1376, 2416, 3184, 3556, 3756, 4108, 4288, and 5373.
Recently, Richard Taylor used a base-change result of Ravi Ramakrishna
to give local hypothesis which circumvent our explicit modular symbols
computation; in particular, Taylor's result proves Artin's conjecture
for icosahedral representations of levels 1376, 2416, and 3184, but not
for our other examples.     In this talk I will explain the
computational method of myself and Buzzard and perhaps say something
about Taylor's theorem.