02:38 am oort
[Link] |
Abel Luiz Istrumentista & Terreiro de Crioulo - Êta, Povo pra Lutar / Menor Abandonado https://www.youtube.com/watch?v=c0nUTqbBi_g
Eta povo pra lutar, vai gostar de trabalhar Nunca vi tão disposto, nunca está de cara feia Sempre traz escancarao Um franco sorriso no rosto Se rola uma "intera" É o primeiro a pôr a mão no bolso Se um vizinho ao lado está passando Por má situação Ele faz um mutirão e ajeita a situação Então, por que que essa gente que tem Não aprende a lição Com esse povo que nada tem Mas tem bom coração Então, por que que essa gente que tem Não aprende a lição Com esse povo que nada tem Mas tem bom coração Eta povo pra lutar, vai gostar de trabalhar Nunca vi tão disposto (esse é o povo brasileiro) Nunca está de cara feia Sempre traz escancarado Um franco sorriso no rosto Se rola uma "intera" É o primeiro a pôr a mão no bolso Se um vizinho ao lado está passando Por má situação Ele faz um mutirão e ajeita a situação Então, por que que essa gente que tem Não aprende a lição Com esse povo que nada tem Mas tem bom coração Então, por que que essa gente que tem Não aprende a lição Com esse povo que nada tem Mas tem bom coração Já com a face enrugada e a mão calejada Lá vai ele pra batalha E a Deus pede saúde Vive no fio da navalha Então, por que que essa gente que tem Não aprende a lição Com esse povo que nada tem Mas tem bom coração Então, por que que essa gente que tem Não aprende a lição Com esse povo que nada tem Mas tem bom coração Com esse povo que nada tem Mas tem bom coração Com esse povo que nada tem Mas tem bom coração Eta povo guerreiro, faça chuva, faça sol Esse povo tá sempre na luta E a divisão é o lema desse povo Salve o povo brasileiro! Eta povo! Eta povo pra lutar!
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02:32 am oort
[Link] |
Flor de Tangerina лучшая бразильская песня кстати:
Alceu Valença - Flor de Tangerina (Trilha Original de Velho Chico) https://youtu.be/e4Ez99gCOiY?si=9IoQhMp6t6J8SMuE
João Gomes - Flor de Tangerina (Lançamento Oficial) MF EXPLODE https://youtu.be/RMchm8yiNv8?si=fXn-rk_6E1dnUqNt
https://youtube.com/shorts/udnc3G34iag?si=AKvIdzOT_Z2eQPUX
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02:29 am oort
[Link] |
Secos e Molhados - Flores Astrais - Clipe na íntegra (1974) https://www.youtube.com/watch?v=t63MPf1daCA
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11:17 pm oort
[Link] |
35. Teorema de Arzelà-Ascoli, parte 2 https://www.youtube.com/watch?v=3uYYWDWstVU
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10:23 pm oort
[Link] |
Various Artists - I.E.M.A. Collective Group Tape #1 (1981) https://youtu.be/X4jDV-JJBIs?si=g9CIS7_zIkftbNiw
Various Artists - The Scythe of Death, How Near It Sweeps! (Epitapes, 1988?) https://www.youtube.com/watch?v=gMCs9faD9fY
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02:18 am oort
[Link] | Local Indonesian mythology says that Orangutans actually have the ability to speak human languages, but choose not to, fearing they would be forced to get jobs and work if were they ever caught.
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Зверь, брат, тоже большевик, но молчит, потому что человек не велит. Придет время вскоре, заговорят и звери, остепенятся и образумятся... Это дело человека. Он должен сделать людьми все, что дышит и движется. Ибо в кои-то веки он наложил на зверя гнет, а сам перестал быть зверем. Это потому, что еды мало было. Теперча еды хватит на всех, и зверя можно ослобонить и присоединить к человеку.
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11:39 pm aculeata
[Link] | Вот и небо -- что скажешь, куда предрассветней -- Потянувши за угол, сорвешь бахрому Черных листьев, спадающих с угольных веток, Горизонт просит тьмы, но довольно ему.
Тьма поедет кататься на черных колесах, Черный гроб обволакивать черной каймой, Тени женщин расхристанных простоволосых, Только знающих плакать, вести за собой;
Время выйти навстречу, как к старому другу, В черных каплях росы, от волненья дрожа, Из-под крышки ползущую честную руку С благодарностью черной рукою пожать,
И тогда все случится, как в детстве мечталось: Горизонт с полыхающей раной в боку Развернется ежом, презирающим жалость, Смоет кровью позор по дороге к щенку.
Tags: drovorub
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12:28 am oort
[Link] |
Andy Giorbino - Anmut und Würde (1983) https://www.youtube.com/watch?v=FghD3GA9ee8
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12:15 am oort
[Link] |
The Third Bardo - I'm Five Years Ahead of My Time https://www.youtube.com/watch?v=Fx2WwXo3hKM
60's Garage Psych from New York City, NY (1967)
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12:09 am oort
[Link] |
Running A Train On Rita - The Queafles (1964) [TBWCS] https://www.youtube.com/watch?v=uOLoHZYKq64
I Wanna Eat That Ass (rare 1980's psychedelic funk vinyl) https://www.youtube.com/watch?v=CUkizrR5aAU
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12:07 am oort
[Link] |
Eden´s Children - Sure looks real (1968) (US, RARE Psychedelic Rock, Boston Scene) https://www.youtube.com/watch?v=-ySmptCxk2Y
01 Sure looks real 02 Toasted 03 Spirit call 04 Come when i call 05 Awakening 06 The clock’s imagination 07 Things gone wrong 08 Wings 09 Call it design 10 Invitation 11 Echoes
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11:57 pm oort
[Link] | очень нравятся каналы с АИ хитами
I Think I Just Shit In My Pants (rare 1960's soul vinyl) https://www.youtube.com/watch?v=rP_yWoH_Nxs
Liquid Poo-Poo - Hookah Harry (1977) https://www.youtube.com/watch?v=EVN9J3f2eaI
и самое любимое
Daydreamin' (About Taking a Huge Dump, Then Getting up To Piss on the Dump To Cut It in Half) https://www.youtube.com/watch?v=17toLteDPNk
Rodney Munch - It's Time To Take a Shit on the Company’s Dime (FULL SONG) https://www.youtube.com/watch?v=7zTei5RMhQ8
Fuggin' Gabagool - Paulie and Paula Goombah (1955) https://youtu.be/AsFfosXQmPA?si=St0EArt_kHwb4TkB
First Date Farts (Don't Shit, Don't Shit, Don't Shit) https://www.youtube.com/watch?v=XWhCmFieqc4
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11:55 pm oort
[Link] |
Billy Boy- The Novells https://www.youtube.com/watch?v=noQ_RlGyLdg
Unidentified group probably from Minnesota, USA. Apart from a certain Steve Johnson, I don't know the names of the members. This music is a strange cover of that of Graeme Allwright (who is French). This version was released in 1967 on the Westchester label with the B-side "Go Now". More information about them will be welcome. It's a recording that I made alone like a grown-up with my first vinyl ^^ that I received.
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07:57 pm oort
[Link] | https://arxiv.org/abs/2312.12084v3
Differentiability of Adelic Volumes and Equidistribution on Quasi-Projective Varieties Debam Biswas
Differentiability of geometric and arithmetic volumes of Hermitian line-bundles leads to the proof of equidistribution results on projective varieties using the variational principle. In this article, we work in the setting of adelic divisors on quasi-projective varieties recently introduced by Xinyi Yuan and Shou-Wu Zhang to show that their geometric and arithmetic adelic volume functions are differentiable on the big cone. We introduce the notions of positive intersection products and show that the differentials are realised as positive intersection products against integrable divisors at big points. We show an analogue of the Fujita Approximation for restricted volumes of adelic divisors in the geometric setting using a construction similar to those of positive intersections and as an application of our differentiability result we derive a slightly weaker quasi-projective analogue of the equidistribution theorem of Berman and Boucksom which generalises the equidistribution obtained by Yuan and Zhang for arithmetically nef adelic divisors on quasi-projective varieties.
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02:30 am oort
[Link] | BOUNDS FOR GRADIENT TRAJECTORIES AND GEODESIC DIAMETER OF REAL ALGEBRAIC SETS D. D'ACUNTO and K. KURDYKA
Let $M\subset \mathbb{R}^n$ be a connected component of an algebraic set $\varphi^{-1}(0)$, where $\varphi$ is a polynomial of degree $d$. Assume that $M$ is contained in a ball of radius $r$. We prove that the geodesic diameter of $M$ is bounded by $2r\nu(n)d(4d-5)^{n-2}$, where $\nu(n)=2{\Gamma({1}/{2})\Gamma(({n+1})/{2})}{\Gamma({n}/{2})}^{-1}$. This estimate is based on the bound $r\nu(n)d(4d-5)^{n-2}$ for the length of the gradient trajectories of a linear projection restricted to $M$.
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туда же много интересного про "управляемую трансверсальность" и оценку диаметра в терминах степени тут
https://projecteuclid.org/journals/journal-of-differential-geometry/volume-44/issue-4/Symplectic-submanifolds-and-almost-complex-geometry/10.4310/jdg/1214459407.full
Symplectic submanifolds and almost-complex geometry S. K. Donaldson
Tags: links, m
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01:46 am oort
[Link] | узнал из подкаста про духа эмануэля и шико шавьера, самого великого бразильца всех времен по мнению бразильцев https://en.wikipedia.org/wiki/Chico_Xavier
On October 3, 2012, the SBT television TV show O Maior Brasileiro de Todos os Tempos named Chico Xavier "The Greatest Brazilian of all time", based on a viewer-supported survey.
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01:06 am oort
[Link] | https://www.youtube.com/@PARANORMALCORTES/videos
кстати хороший бразильский канал c отрывками из подкаст с интервью про паранормальные явления теории заговора и все такое кто такое любят
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01:02 am oort
[Link] |
Seu Zé Pilintra....Sua morada https://pt.wikipedia.org/wiki/Z%C3%A9_Pelintra
https://www.youtube.com/watch?v=yChTUOMxppQ https://www.youtube.com/shorts/ebcfhq83Zrk
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12:57 am oort
[Link] |
Pois É, Seu Zé Luiz Américo - Pois É, Seu Zé (1973) https://youtu.be/5N-BkpefQPE?si=GcuylDrbm96FdOMh
Gonzaguinha - Pois É, Seu Zé https://youtu.be/iK9tg1TriMs?si=FF2om7ThcmbPQves
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11:50 pm oort
[Link] |
Lana Del Rey - Elvis https://youtu.be/8kZaj6341Mw?si=fteBCIKNTnM4POaC
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11:46 pm oort
[Link] |
Só Que Deram Zero Pro Bedeu (Bedeu) · Claudya https://youtu.be/Z_L8Yz2xEeI?si=ZBiwiUemwr_Twt67
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11:40 pm oort
[Link] |
Pois É, Seu Zé · Claudya 1973 https://youtu.be/LePPuOExBhA?si=euYNEFln1Vc7h65Q
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11:30 pm oort
[Link] |
Carlos Perón - Nothing Is True; Everything Is Permitted (1984) https://www.youtube.com/watch?v=7E5cBcHuz5w
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11:25 pm oort
[Link] |
The Vampires' Sound Incorporation - Psychedelic Dance Party (1969) https://youtu.be/tPzfMCz2so4?si=xwOJuVTTwBtef9Mv
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09:41 pm oort
[Link] | https://arxiv.org/abs/1106.5244
Equidistribution of zeros of holomorphic sections in the non compact setting Tien-Cuong Dinh, George Marinescu, Viktoria Schmidt Journal of Statistical Physics, 2012
We consider N-tensor powers of a positive Hermitian line bundle L over a non-compact complex manifold X. In the compact case, B. Shiffman and S. Zelditch proved that the zeros of random sections become asymptotically uniformly distributed with respect to the natural measure coming from the curvature of L, as N tends to infinity. Under certain boundedness assumptions on the curvature of the canonical line bundle of X and on the Chern form of L we prove a non-compact version of this result. We give various applications, including the limiting distribution of zeros of cusp forms with respect to the principal congruence subgroups of SL2(Z) and to the hyperbolic measure, the higher dimensional case of arithmetic quotients and the case of orthogonal polynomials with weights at infinity. We also give estimates for the speed of convergence of the currents of integration on the zero-divisors.
Tags: links, m
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