Use Of Ellipses In Quotes

Like many people whose lives had formed around a particularly painful incident, she had grown used to providing ellipses around the event of her brother's death to keep conversations comfortable. At some point the subconscious logic of this had spread to the rest of her life so that she rarely talked about things she had been deeply affected by. It wasn't hard to do.

The mathematical order is beautiful precisely because it has no effect on the real world. Life isn't going to be easier, nor is anyone going to make a fortune, just because they know something about prime numbers. Of course, lots of mathematical discoveries have practical applications, no matter how esoteric they may seem. Research on ellipses made it possible to determine the orbits of the planets, and Einstein used non-Euclidean geometry to describe the form of the universe. Even prime numbers were used during the war to create codes—to cite a regrettable example. But those things aren't the goal of mathematics. The only goal is to discover the truth.

Godwin and Shepard (1979) pointed out a decade ago that policy scientists were doing the equivalent of “Forcing Squares, Triangles and Ellipses into a Circular Paradigm” by using the commons-dilemma model without serious attention to whether or not the variables in the empirical world conformed to the theoretical model.

I gave him my best cryptic smile. He grimaced. “What have you found out?” he asked. “I’m not at liberty to tell you that.” Not with the Pack suspect. He leaned forward more, letting the moonlight fall on his face. His gaze was direct and difficult to hold. Our stares locked and I gritted my teeth. Five seconds into the conversation and he was already giving me the alpha-stare. If he started clicking his teeth, I’d have to make a run for it. Or introduce him to my sword. “You will tell me what you know now,” he said. “Or?" He said nothing, so I elaborated. “See, this kind of threat usually has an ‘or’ attached to it. Or an ‘and.’ ‘Tell me and I’ll allow you to live’ or something like that.” His eyes ignited with gold. His gaze was unbearable now. “I can make you beg to tell me everything you know,” he said and his voice was a low growl. It sent icy fingers of terror down my spine. I gripped Slayer’s hilt until it hurt. The golden eyes were burning into my soul. “I don’t know,” I heard my own voice say, “you look kinda out of shape to me. How long has it been since you took care of your own dirty work?” His right hand twitched. Muscles boiled under the taut skin and fur burst, sheathing the arm. Claws slid from thickened fingers. The hand snapped inhumanly fast. I weaved back and it fanned my face, leaving no scars. A strand of hair fell onto my left cheek, severed from my braid. The claws retracted. “I think I still remember how,” he said. A spark of magic ran from my fingers into Slayer’s hilt and burst into the blade, coating the smooth metal in a milky-white glow. Not that the glow actually did anything useful, but it looked bloody impressive. “Any time you want to dance,” I said. He smiled, slow and lazy. “Not laughing anymore, little girl?” He was impressive, I’d give him that. I turned the blade, warming up my wrist. The saber drew a tight glowing ellipse in the air, flinging tiny drops of luminescence on the dirty floor. One of them fell close to the Beast Lord’s foot and he moved away. “I wonder if all this changing has made you sluggish.” “Bring your pig-sticker and we’ll find out.

Until the coming of quantum mechanics, nothing happened to modify in any degree what is the essential purport of the first two laws of motion, namely this: that the laws of dynamics are to be stated in terms of accelerations. In this respect, Copernicus and Kepler are still to be classed with the ancients; they sought laws stating the shapes of the orbits of the heavenly bodies. Newton made it clear that laws stated in this form could never be more than approximate. The planets do not move in exact ellipses, because of the perturbations caused by the attractions of other planets. Nor is the orbit of a planet ever exactly repeated, for the same reason. But the law of gravitation, which dealt with accelerations, was very simple, and was thought to be quite exact until two hundred years after Newton's time. When it was amended by Einstein, it still remained a law dealing with accelerations. It is true that the conservation of energy is a law dealing with velocities, not accelerations. But in calculations which use this law it is still accelerations that have to be employed.

23 Emotions people feel, but can’t explain 1.    Sonder: The realization that each passerby has a life as vivid and complex as your own. 2.    Opia: The ambiguous intensity of Looking someone in the eye, which can feel simultaneously invasive and vulnerable. 3.    Monachopsis: The subtle but persistent feeling of being out of place. 4.    Énouement: The bittersweetness of having arrived in the future, seeing how things turn out, but not being able to tell your past self. 5.    Vellichor: The strange wistfulness of used bookshops. 6.    Rubatosis: The unsettling awareness of your own heartbeat. 7.    Kenopsia: The eerie, forlorn atmosphere of a place that is usually bustling with people but is now abandoned and quiet. 8.    Mauerbauertraurigkeit: The inexplicable urge to push people away, even close friends who you really like. 9.    Jouska: A hypothetical conversation that you compulsively play out in your head. 10.    Chrysalism: The amniotic tranquility of being indoors during a thunderstorm. 11.    Vemödalen: The frustration of photographic something amazing when thousands of identical photos already exist. 12.    Anecdoche: A conversation in which everyone is talking, but nobody is listening 13.    Ellipsism: A sadness that you’ll never be able to know how history will turn out. 14.    Kuebiko: A state of exhaustion inspired by acts of senseless violence. 15.    Lachesism: The desire to be struck by disaster – to survive a plane crash, or to lose everything in a fire. 16.    Exulansis: The tendency to give up trying to talk about an experience because people are unable to relate to it. 17.    Adronitis: Frustration with how long it takes to get to know someone. 18.    Rückkehrunruhe: The feeling of returning home after an immersive trip only to find it fading rapidly from your awareness. 19.    Nodus Tollens: The realization that the plot of your life doesn’t make sense to you anymore. 20.    Onism: The frustration of being stuck in just one body, that inhabits only one place at a time. 21.    Liberosis: The desire to care less about things. 22.    Altschmerz: Weariness with the same old issues that you’ve always had – the same boring flaws and anxieties that you’ve been gnawing on for years. 23.    Occhiolism: The awareness of the smallness of your perspective. John Koenig, The Dictionary of Obscure Sorrows (Simon & Schuster, November 16, 2021)

As an anology, consider the word structure. In bacteria, the gene is embedded in the genome in precisely that format, structure, with no breaks, stuffers, interpositions, or interruptions. In the human genome, in contrast, the word is interrupted by intermediate stretches of DNA: s...tru...ct...ur...e. The long stretches of DNA marked by the ellipses (...) do not contain any protein-encoding information. When such an interrupted gene is used to generate a message-i.e., when DNA is used to build RNA-the stuffer frragments are excised from the RNA message, and the RNA is stitched together again with the intervening pieces removed: s...tru...ct...ur...e became simplified to structure. Roberts and Sharp later coined a phrase for the process: gene splicing or RNA splicing (since the RNA message of the gene was "spliced" to removed the stuffer fragments). At first, this split structure of genes seemed puzzling: Why would an animal genome waste such long stretches of DNA splitting genes into bits and pieces, only to stitch them back into a continuous message? But the inner logic of split genes soon became evident: by splitting genes into modules, a cell could generate bewildering combinations of messages out of a single gene. The word s...tru...c...t...ur...e can be spliced to yield cure and true and so forth, thereby creating vast numbers of variant messages-called isoforms-out of a single gene. From g...e...n...om...e you can use splicing to generate gene, gnome, and om. And modular genes also had an evolutionary advantage: the individual modules from different genes could be mixed and matched to build entirely new kinds of genes (c...om...e...t). Wally Gilbert, the Harvard geneticist, created a new word for these modules; he called them exons. The inbetween stuffer fragments were termed introns.

Similarly, we look for echoes from the tenth and eleventh dimension. Perhaps evidence for string theory is hidden all around us, but we have to listen for its echoes, rather than try to observe it directly. For example, one possible signal from hyperspace is the existence of dark matter. Until recently, it was widely believed that the universe is mainly made of atoms. Astronomers have been shocked to find that only 4.9 percent of the universe is made of atoms like hydrogen and helium. Actually, most of the universe is hidden from us, in the form of dark matter and dark energy. (We recall that dark matter and dark energy are two distinct things. Twenty-six point eight percent of the universe is made of dark matter, which is invisible matter that surrounds the galaxies and keep them from flying apart. And 68.3 percent of the universe is made of dark energy, which is even more mysterious, the energy of empty space that is driving the galaxies apart.) Perhaps evidence for the theory of everything lies hidden in this invisible universe. Search for Dark Matter Dark matter is strange, it is invisible, yet it holds the Milky Way galaxy together. But since it has weight and no charge, if you tried to hold dark matter in your hand it would sift through your fingers as if they weren’t there. It would fall right through the floor, through the core of the Earth, and then to the other side of the Earth, where gravity would eventually cause it to reverse course and fall back to your location. It would then oscillate between you and the other side of the planet, as if the Earth weren’t there. As strange as dark matter is, we know it must exist. If we analyze the spin of the Milky Way galaxy and use Newton’s laws, we find that there is not enough mass to counteract the centrifugal force. Given the amount of mass we see, the galaxies in the universe should be unstable and they should fly apart, but they have been stable for billions of years. So we have two choices: either Newton’s equations are incorrect when applied to galaxies, or else there is an unseen object that is keeping the galaxies intact. (We recall that the planet Neptune was found in the same way, by postulating a new planet that explained Uranus’s deviations from a perfect ellipse.) At present, one leading candidate for dark matter is called the weakly interacting massive particles (WIMPs). Among them, one likely possibility is the photino, the supersymmetric partner of the photon. The photino is stable, has mass, is invisible, and has no charge, which fits precisely the characteristics of dark matter. Physicists believe the Earth moves in an invisible wind of dark matter that is probably passing through your body right now. If a photino collides with a proton, it may cause the proton to shatter into a shower of subatomic particles that can then be detected.

For example, in his log entry for October 12, 1492, Columbus wrote, “I warned my men to take nothing from the people without giving something in exchange”36—a passage left out by both Koning and Zinn. But Zinn’s most crucial omissions are in the passage from Columbus’s log that he quotes in the very first paragraph of his People’s History. There he uses ellipses to cover up the fact that he has left out enough of Columbus’s words to deceive his readers about what the discoverer of America actually meant. The omission right before “They would make fine servants” is particularly dishonest. Here’s the nub of what Zinn left out: “I saw some who bore marks of wounds on their bodies, and I made signs to them to ask how this came about, and they indicated to me that people came from other islands, which are near, and wished to capture them, and they defended themselves. And I believed and still believe that they come here from the mainland to take them for slaves.

Joining the world of shapes to the world of numbers in this way represented a break with the past. New geometries always begin when someone changes a fundamental rule. Suppose space can be curved instead of flat, a geometer says, and the result is a weird curved parody of Euclid that provides precisely the right framework for the general theory of relativity. Suppose space can have four dimensions, or five, or six. Suppose the number expressing dimension can be a fraction. Suppose shapes can be twisted, stretched, knotted. Or, now, suppose shapes are defined, not by solving an equation once, but by iterating it in a feedback loop. Julia, Fatou, Hubbard, Barnsley, Mandelbrot-these mathematicians changed the rules about how to make geometrical shapes. The Euclidean and Cartesian methods of turning equations into curves are familiar to anyone who has studied high school geometry or found a point on a map using two coordinates. Standard geometry takes an equation and asks for the set of numbers that satisfy it. The solutions to an equation like x^2 + y^2 = 1, then, form a shape, in this case a circle. Other simple equations produce other pictures, the ellipses, parabolas, and hyperbolas of conic sections or even the more complicated shapes produced by differential equations in phase space. But when a geometer iterates an equation instead of solving it, the equation becomes a process instead of a description, dynamic instead of static. When a number goes into the equation, a new number comes out; the new number goes in, and so on, points hopping from place to place. A point is plotted not when it satisfies the equation but when it produces a certain kind of behavior. One behavior might be a steady state. Another might be a convergence to a periodic repetition of states. Another might be an out-of-control race to infinity.

WITH EACH KISS   Here in each other’s arms neither of us are very opt for the use of words as both of us know that there are only so many things that can be said. This veracious and solicitous gaze that she gives to me coruscates round the ocular corona of her delicate and divine features of which she does commend to me within her voluptuous embrace. The creamy eglantine, sanguine, and fuchsia of her vivifying kiss enfolds a sedative ellipse over mine that turns me into vapor. More to me than any other part of her that is absolutely diamond it is her ardent and decided kiss that is most dear to me. The dangling kinks in her hair slide gently down the sides of my face, she avidly making me the counterpoint to her sensual exigency. With each kiss she disarms me and heals me of my heartsick love. With each kiss I am where the veil between here and heaven has broken.

Using ellipses, starting sentences with the words or, and, or but—these style choices are ok and make you look human. (I’ve used them several times throughout this book.)

Stellar orbits in galaxies, on a time scale of some 200 million years, take on a three-dimensional character instead of making perfect ellipses. Three-dimensional orbits are as hard to visualize when the orbits are real as when they are imaginary constructions in phase space. So Henon used a technique comparable to the making of Poincare maps. He imagined a flat sheet placed upright on one side of the galaxy so that every orbit would sweep through it, as horses on a race track sweep across the finish line. Then he would mark the point where the orbit crossed this plane and trace the movement of the point from orbit to orbit.