Julián Rojas Millán
@lobachevscki.bsky.social
Mi guayoyo se bate así ↑ ↑ ↓ ↓ ← → ← → B A
Illustration: https://tinyurl.com/2s4efu33
IG: https://tinyurl.com/47bvktcv
Artstation: https://tinyurl.com/3phdpd9v
Linkedin: https://tinyurl.com/ydh4565x
-- Sr. Tech Artist at Ubisoft Berlin.
Opinions my own.
Illustration: https://tinyurl.com/2s4efu33
IG: https://tinyurl.com/47bvktcv
Artstation: https://tinyurl.com/3phdpd9v
Linkedin: https://tinyurl.com/ydh4565x
-- Sr. Tech Artist at Ubisoft Berlin.
Opinions my own.
You should... Disney artist certainly read it, they referenced in one of the teasers (this is 100% serious)
November 25, 2025 at 9:05 PM
You should... Disney artist certainly read it, they referenced in one of the teasers (this is 100% serious)
Are you following the UCL this year?
November 25, 2025 at 9:04 PM
Are you following the UCL this year?
I cant say for sure but it looks similar to this artpictures.club/autumn-2023.... which was very common place back in the CG of the early 2000s, and similar to this one as well images.gamebanana.com/img/ss/mods/...
Great work, it is really nice to see you developing those skills!.
Great work, it is really nice to see you developing those skills!.
November 23, 2025 at 11:38 PM
I cant say for sure but it looks similar to this artpictures.club/autumn-2023.... which was very common place back in the CG of the early 2000s, and similar to this one as well images.gamebanana.com/img/ss/mods/...
Great work, it is really nice to see you developing those skills!.
Great work, it is really nice to see you developing those skills!.
I really like the texture work on the ship. Are you planning to continue working in the rest of the elements or is it finished as an assignment? the references are coming through, although the texturing process is completely different i do see the HL2 influence.
November 23, 2025 at 11:29 PM
I really like the texture work on the ship. Are you planning to continue working in the rest of the elements or is it finished as an assignment? the references are coming through, although the texturing process is completely different i do see the HL2 influence.
What this means, so you can have a sense of size, is that if i put the set of arbitrary functions F into a box, try to put my hand in the box to randomly pick one continous function from G the probability of that happening is 0. You will never grab a continuous function.
November 16, 2025 at 5:58 PM
What this means, so you can have a sense of size, is that if i put the set of arbitrary functions F into a box, try to put my hand in the box to randomly pick one continous function from G the probability of that happening is 0. You will never grab a continuous function.
And the cardinality of Q is countable, so this means [Q] = 2^[a] (where a is aleph, the countable set) and that is simply the same as the cardinality of R, [R]. You can prove that the set of continous functions G is a 'zero measure' set inside the set of arbitrary functions F.
November 16, 2025 at 5:57 PM
And the cardinality of Q is countable, so this means [Q] = 2^[a] (where a is aleph, the countable set) and that is simply the same as the cardinality of R, [R]. You can prove that the set of continous functions G is a 'zero measure' set inside the set of arbitrary functions F.
F is just not useful set, in math you need structure so we would like to study at least the set of continuous functions G. There are some jumps in this argument but basically you can characterize any continuous functions only using rational numbers Q, so you are mapping rational into rationals.
November 16, 2025 at 5:54 PM
F is just not useful set, in math you need structure so we would like to study at least the set of continuous functions G. There are some jumps in this argument but basically you can characterize any continuous functions only using rational numbers Q, so you are mapping rational into rationals.
It is considerably bigger. From that you can just extent the reasoning for any mapping and it always be 2^[R] due to properties of transfinite numbers. 2^[R] is the biggest "standard" infinity in math. To see how big that is you can calculate the cardinality of a subset that is actually more useful.
November 16, 2025 at 5:52 PM
It is considerably bigger. From that you can just extent the reasoning for any mapping and it always be 2^[R] due to properties of transfinite numbers. 2^[R] is the biggest "standard" infinity in math. To see how big that is you can calculate the cardinality of a subset that is actually more useful.
It is suffice to calculate the number for f: R--->R. The set F of all arbitrary functions from R to R maps a single real number to all the rest of the real numbers, the cardinality of F, [F] = R^[R] = 2^[R] that is the cardinality of F, [F] is bigger than the the cardinality of the real numbers [R]
November 16, 2025 at 5:51 PM
It is suffice to calculate the number for f: R--->R. The set F of all arbitrary functions from R to R maps a single real number to all the rest of the real numbers, the cardinality of F, [F] = R^[R] = 2^[R] that is the cardinality of F, [F] is bigger than the the cardinality of the real numbers [R]
Are you able to share what is the subject of the Hbomberguy video? The title at least
November 14, 2025 at 1:17 PM
Are you able to share what is the subject of the Hbomberguy video? The title at least
Reposted by Julián Rojas Millán
You pieces of shit care more about the oil than the people as we are not selling oil for pennies to China, i dont give two shits if oil is the price of the freedom of the people of my country, every single Venezuelan is more valuable that all our oil reserves.
October 26, 2025 at 10:24 PM
You pieces of shit care more about the oil than the people as we are not selling oil for pennies to China, i dont give two shits if oil is the price of the freedom of the people of my country, every single Venezuelan is more valuable that all our oil reserves.
My mom showing this to everyone
November 6, 2025 at 12:13 PM
My mom showing this to everyone