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blow-up
blow-up [blow- 1.] 1. = blow-out 1.1809 W. Gell Let. 22 Jan. in C. K. Sharpe Lett. (1888) I. 355 There won't be any quarrel, so you need not fear. The only chance is Keppel making a blow up when she abuses me. 1813 Ld. Castlereagh Let. in Sir R. Wilson Diary (1861) II. 201 W. and he must not have an...
Oxford English Dictionary
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Blow-Up (1966) | The Criterion Collection
Blow-Up is a seductive immersion into creative passion, and a brilliant film by one of cinema's greatest artists. In 1966, Michelangelo Antonioni transplanted his existentialist ennui to the streets of swinging London for this international sensation, the Italian filmmaker's first English-language feature. A countercultural masterpiece ...
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Blow-Up (soundtrack)
Blow-Up is a soundtrack album by Herbie Hancock featuring music composed for Michelangelo Antonioni's film Blow-Up.
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Blow-up Definition & Meaning - Merriam-Webster
The meaning of BLOWUP is a blowing up. How to use blowup in a sentence.
www.merriam-webster.com
Blow-Up movie review & film summary (1966) | Roger Ebert
Michelangelo Antonioni's "Blow-Up" opened in America two months before I became a film critic, and colored my first years on the job with its lingering influence. It was the opening salvo of the emerging "film generation," which quickly lined up outside "Bonnie and Clyde," "Weekend" (1968), "The Battle of Algiers," "Easy Rider" and "Five Easy Pieces." It was the highest-grossing art film to ...
www.rogerebert.com
Balloon Blow-up Science Experiment
It makes a great experiment for young children because the set-up is simple and it only takes a few minutes to get to the exciting finale. In addition to a video demonstration and detailed printable instructions, we also have the scientific explanation of how this simple chemical reaction works making it perfect for older scientists too.
coolscienceexperimentshq.com
blow-up
blow-upn enlargement (of a photograph) (照片)放大 Do a blow-up of this corner of the negative. 把底片的这一角放大.
牛津英汉双解词典
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Blow-Up (DJs)
Blow-Up is a DJ duo from California. In 2003, under the name Blow-Up, they wrote, produced, performed & recorded their debut American LP Exploding Plastic Pleasure.
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The Blow-Up
The Blow-Up is a live album by the American band Television, released as The Blow Up on cassette in 1982. It was reissued in 1990 and again in 1999. ROIR allegedly acquired the recording from the fan who had bootlegged the band's shows; The Blow-Up'''s sound quality is typical of a bootlegged recording
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Blow-Up Algebra definition Suppose $R$ is a ring and $I$ is an ideal of that ring, then the blow-up algebra of $I$ in $R$, as defined in Eisenbud, is: $B_IR := R \oplus I \oplus I^2 \oplus \dots \cong R[tI]$ Why is...
I'm not sure what Eisenbud's definition of "$R[tI]$" is but it seems like he's trying to suggest this picture: $\\{p(t)\in R[t]\mid p_0\in R, p_i\in I^i\text{ for } i> 0\\}$ That is, the natural grading on the algebra with the (external) direct sums of powers of $I$ reflects that the multiplication ...
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Blow-up lemma
The blow-up lemma, proved by János Komlós, Gábor N. The first proof of the blow-up lemma also used a similar argument.
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Reference that the blow-up of a smooth variety along a smooth subvariety is smooth. Accoding to this post: > The blow-up of a non-singular variety along a non-singular subvariety is well-known to be non-singular Is ...
This is **Theorem II 8.24** in Hartshorne's _Algebraic Geometry_.
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Blow-up and Other Stories
Blow-Up and Other Stories is a collection of short stories, selected from the short fiction of the Argentinian author Julio Cortázar. Distances
The Idol of the Cyclades
Letter to a Young Lady in Paris
A Yellow Flower
Two
Continuity of Parks
The Night Face Up
Bestiary
The Gates of Heaven
Blow-Up
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en.wikipedia.org
Blow-up and singularities in Hartshorne, Section 4 we have the description of the blow-up of $y^2=x^2(x+1)$ at the origin, that curve have two singularities at $(0,0)$ and $(0,-2/3)$. But the equations of the blow-u...
It does not sound to me that $(0,-2/3)$ is even on the curve -- if $x=0$ then clearly there is only one $y$ on the curve, namely $y = \pm \sqrt{0(0+1)} = 0$. Similarly, if $y = -2/3$, the equation $x^2(x+1) = 4/9$ defines at most 3 real solutions for $x$, none of which is 0
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blow-up and embedding Let $P$ be the weighted projective space $\mathbb{P}(1,1,2,2,2)$, let $\hat{P}\to P$ be the blow-up along the singular locus $\\{x_0=x_1=0\\}$ in $P$. Using the line bundle $\mathcal{O}(2)$, one...
Indeed, the blowup of the singular quadric embeds into the blowup $X$ of the projective space, that can be alternatively described as $$ X = \mathbb{P}_{\mathbb{P}^2}(\mathcal{O} \oplus \mathcal{O} \oplus \mathcal{O} \oplus \mathcal{O}(-1)). $$
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