Regarding your question, how to prove this problem about Galois representation, I happened to do some research recently when I was studying Hodge theory.

First of all, note that A`∈H1(E*o′,Z/2(1)) can be set as the class of H1et(E,Z/2). Since it is reversible in the residual domain, this group will

The Z/2 parameterization of...

Br(S′)[2]→Br(S′Kp)[2]=Z/2. At this point, we need to continue to classify it as p into the field, and then use number theory methods to solve it. I believe that in

On this issue, no one has more knowledge than you, Professor Lin.

In fact, in the process of studying Hodge's theory, I also thought about Hodge's conjecture. I wonder if you have read the 2016 paper by Rosensson Andreas, where he faced the problem of how to obtain the correct integral of Hodge.

Qi conjecture, made a conjecture, I recommend you to take a look. In short, cohomology and Hodge conjecture are closely connected. Perhaps Motive is the most critical factor in solving the Hodge conjecture!

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After reading this reply, Peter Schulz basically had nothing to hide and gave Lin Xiao a great inspiration.

Lin Xiao has naturally read the paper recommended by Schultz.

But now, he has the confidence to truly solve Hodge's conjecture.

At least, it is an important stage result of Hodge's conjecture.

Thinking of this, he made a mouthful and then raised the corners of his mouth.
Chapter completed!