ag.algebraic geometry – higher tanning and cohomologies

Accept $ X $ is a scheme over a field $ k $ and $ G $ a group scheme over $ k $ (can assume commutative), one can talk about it $ G $-Torsors and $ G $– tanned over $ X $ and their isomorphism classes are given by $ H ^ 1 (X, G) $ and $ H ^ 2 (X, G) $ (calculated in suitable Grothendieck topologies). These are well written in the literature. I think the similar results apply to higher tanners and higher cohomologies, but I couldn't find a reference. Could someone suggest a reference for it? Thanks a lot.

Ask for advice I'm looking for the best tanning lotion that can work on my skin.

I am a regular user of different types of lotions recommended to me by my work colleagues. At first, the lotion that was recommended to me seemed to work for a few days. After a week of using the tanning lotion, I got scars like burns. I went back to my friends and asked them what was going on. They told me that it will be fine in a few days. It's been two months now and nothing seems to change. Care, help me and recommend the tanning lotion that can help me.

Am I one of the few white Americans who are not afraid of the tanning of white America?

**** to you of you. I will not touch your freak spawn.

But I will make every white woman annoy you if you do nothing.

You and your "tan" is just your brain for drugs and alcohol that "boil away" just under the sun.

Put your aluminum foil hat back on, it will help.