with

WARNING FOR: FLUFF
holding hands. jack trying to get the courage to HOLD HANDS with gabe for the first time and it takes him like 10 minutes to just do it. he’s trying to appear nonchalant about it but as a White he has a very obvious blush that goes up to his ears. gabe is surprised for like half a second when Jack laces their gay fingers together and looks at jack and sees how fucking embarrassed he looks and pretends for his sake that he doesn’t notice. he offers him a small smile and lets him hold his hand. maybe he holds it back a little.

with(ウィズ) 2016年 9月号 電子書籍版もあります

石原さとみが休日にしてること全部◇Tシャツコーデ◇あと1ヵ月で秋!そろそろ、大人っぽくしとく?◇佐々木希 カジュアルこそオトナに◇コンバース&スタンスミスで大人カジュアル◇宮田聡子"夏の黒"◇ちょこ変えメイクでオトナシフト◇日比理子さんのおしゃれテク◇夏のダメージ肌レスキュー◇トマトのお料理◇夏ヘアアレンジBOOK

「おしゃれ」も「恋」もwithと一緒。20代独身女性へのライフスタイル提案!!
ポジティブに毎日を送るOLたちのために、ファッションとビューティーを中心に、豊かなライフスタイルを提案☆毎号豪華ブランド付録つき♪ [人気連載] 関ジャニ∞「Free!!」。東山紀之〝本物〟を知るって楽しい!。宮田聡子の聡子BEAUTY。ピース綾部の恋メール相談室。SHIORIんちのThe 定番!

I tried to write a bunch of your names! Reblog with ur name and I’ll try to get it in next

Update 7/24
Will be returning to LA, I will be writing names still when I get the chance, sorry if I missed yours or didn’t get it in frame of the picture.

Here’s a tip though, you’re more likely to see your name if you Sub an odd character for a regular one like ñick for example.

Whose dream was it anyway?

Oh fuck how slow am I!! I’ve been thinking about the movie Frequency (along with Inception, yes), where due to a freak storm of electromagnetic nature caused by an aurora borealis (northern lights), a homicide detective in 1999 makes contact over radio with his father in 1969.

The reason I’ve been thinking about this is, I’m still not clear as to whose drug-induced-or-not dream was this episode. Was it modern Sherlock’s who took drugs? And ended up solving the mystery of Moriarty’s death? Or was it Victorian Holmes’s who was embroiled in in his own demons and solved a case of dead-yet-not-dead wife? Because the end shot of the episode was Holmes wistfully looking out of the window thinking that he was the man out of his time, (something Moftiss have talked about endlessly, just another one of your self-referential scenes :/) since he had imagined a future with jets.

That made me think: it was the dreamscape of both the Holmeses, like the two time streams crossed somehow, and both Holmeses ended up making some sort of contact with each other. Like in the movie Frequency. And this is where I’m being slow:

(source)

I realized that there was a diagonal matrix and Maxwell’s equations of electromagnetism there earlier, and left it at that without thinking too much of it. (Sleeping is not that boring, ok? It was 5am at this point.) But now that I’ve seen it again, I realized something.

It isn’t JUST any other diagonal matrix. It’s Minkowski metric matrix.

Do you see a circled letter in front of that matrix in the screencap? It has an equality sign buried under it, and the letter pretty much looks like greet eta as in above matrix. Now what is Minkowski metric?

Simply speaking, metric is nothing but a description of how we measure distances. So in our day-to-day life where we use Euclidean geometry, if we know the coordinates of the two points, say (x1, y1, z1) and (x2, y2, z2), then the distance is simply 

Now, that’s a working formula. What do we see? There’re only terms in squares. There’s no wonky cross terms like (x1-x2)*(y1-y2), right? So in abstract maths, this fact would be represented as a Euclidean matrix:

Forget the left hand side. What it means is, if I want the distance between two points, I’m only going to look at where 1′s are. If they are on the diagonal of this arrangement of numbers, I’m only going to consider squares of coordinate difference. If there’s a 1 somewhere else, I’ll have to also consider wonky cross term like above. But fortunately for me, there isn’t any here, so good.

Now when one goes to Special Relativity, the geometry doesn’t remain our day-to-day Euclidean. Because time itself is very much equivalent of space, is relative and has to be considered in measuring distances. Because two events in a this joint space-time geometry are not just separated in space, but also in time, right? Some events may occur at the same place, like me coming to sit in my chair now and going somewhere later, coming back to sit again some time later. It happens in the same place but at different times, so these two ‘events’ have two different coordinates, this time denoted by (t1, x1, y1, z1) and (t2, x2, y2, z2).

When one tries to put in time into the geometry, one needs something different. Such geometry was devised by the Russian mathematician/physicist Minkowski. But when geometry changes, so does the concept of how to measure distances! I mean, you wouldn’t use the same formula for distance in a plane and on the surface of a big ball, would you? (Just trust me, you wouldn’t.) Adding this weird coordinate of time reaaaally screws our usual concept of distance, and we need that Minkowski matrix above! All that it means is, when I’m considering space-time as a continuum and then measuring the separation of ‘events’, I will still use squares of differences like in my daily Euclidean geometry (because there are 1′s on the diagonal of the matrix), but instead of simply adding all those differences, some have to be subtracted.

Coming back to the screencap, there is another thing on that list: Maxwell’s equations of electromagnetism. (To be precise, we see 2 out of 4 of Maxwell’s equations.) They basically tell you how light is nothing but an electromagnetic wave, and how it behaves.

Now what the fuck does this have to do with that scrap of list?

I think, and maybe I am over-reading here, the idea of the matrix + Maxwell’s equations is that like in the movie Frequency, due to some weird electromagnetic storm or other such unseen-by-us-free-to-use-our-imagination event, space-time continuum was warped, and two time streams crossed. One paralleling and aiding the other. So it wasn’t just the drug induced dream of modern Sherlock, but also a dreamscape of Victorian Holmes, where both delved deep inside, and connected with each other, paralleling and aiding each other.