Prompt: create a painting in pastels with an Intricate detailes during sunrises on rose garden sketch ink drawing By Jamie Heiden, Paul Klee, Karol Bak, extremely detailed, high definition, crisp quality, ultra detailed background, vivid color
Prompt: Create full size image , Nordic blonde woman, long hair, dark blue eyes, hippy style, blue chiffon dress and scarves, dancing with her eyes closed in bliss, you can see her black stiletto shoes, 16K concept art with elements of demonic imagery and occult symbols. over-detailed colored portrait of Epic-styled NORDIC blonde woman, drop dead gorgeous, long stylish chiffon blazer, you can see her perfect legs and her black stiletto shoes, as she plays an upright piano, the piano is covered in tight colourful swirls and spirals , in a double exposure, with gothic New York City, , . Watercolor drawing with elements of doodle art, in full Colour, stunning transparent gradients and a characteristic over-detailed texture, coarse large and sharp impasto strokes, metallic ink shadows and filled in details, swirls and spirals all around she is surrounded by a pack of puppies, fluffy brown French bull dogs, they’re dancing, wearing human clothes, they’re adorable puppy’s .
Prompt: Fractals. Warm colours. Style Flora Bowley and Vincent van Gogh,8k, dynamic lighting.
watercolor patchwork and thick fractals by Picasso and Caspar David Friedrich and Daniel Merriam and Van Gogh
Prompt: Teenage boy wearing a loose button down shirt with the top two buttons undone and khaki shorts standing in front of a giant wave on a beach. Boy’s hair is made of water splashing down his face reaching his shoulder. Boy is not wearing shoes. HIs eyes are glowing green.
Prompt: A wizard reading a book with mystical symbols flying out of the book, in a mystical magical winter forest with fireflies and magical creatures, near a campfire, a beautiful three-story wooden tower is visible in the distance, in the moonlight clearly worked out details, clearly drawn hands, clearly drawn face, super crisp quality, ultra-confusing, ultra-clear image, ultra-high definition, ultra-pronounced detail
Prompt: A sea-turtle rises from oceanic depths in golden hour, breaking the surface with its head at the very center of an elliptical wooden yoke floating upon the vast open sea. From a neuronally-mediated probabilistic spatio-temporal past the echo of the original words being spoken in Pali, long-unheard by mortal beings:
“Monks, suppose that this great earth were totally covered with water, and a man were to toss a yoke with a single hole there. A wind from the east would push it west; a wind from the west would push it east. A wind from the north would push it south; a wind from the south would push it north. And suppose a blind sea turtle were there. It would come to the surface once every one hundred years. Now what do you think? Would that blind sea turtle, coming to the surface once every one hundred years, stick his neck into the yoke with a single hole?” “It would be a sheer coincidence, lord, that the blind sea turtle, coming to the surface once every one hundred years, would stick his neck into the yoke with a single hole.” “It’s likewise a sheer coincidence that one obtains the human state. It’s likewise a sheer coincidence that a Tathāgata, worthy & rightly self-awakened, arises in the world. It’s likewise a sheer coincidence that a Dhamma & Vinaya expounded by a Tathāgata appears in the world. Now, this human state has been obtained. A Tathāgata, worthy & rightly self-awakened, has arisen in the world. A Dhamma & Vinaya expounded by a Tathāgata appears in the world. “Therefore your duty is the contemplation, ‘This is stress … This is the origination of stress … This is the cessation of stress.’ Your duty is the contemplation, ‘This is the path of practice leading to the cessation of stress.’”
Prompt: Euler's identity is a fundamental mathematical equation that connects the constants e, π, 1, 0, and the imaginary unit. Although, there is no direct topological version of Euler's identity, there is the Euler characteristic, which is a topological invariant that describes a topological space's shape or structure regardless of the way it is bent. The Euler characteristic is commonly denoted by χ and is defined as the alternating sum of the numbers of vertices, edges, and faces in a polyhedral surface. While it is not an identity in the same form as Euler's equation, the Euler characteristic is a significant topological invariant that captures essential topological information about a space.
Said Euler characteristic is a topological invariant that has various properties and applications in algebraic topology and polyhedral combinatorics. It is related to the Betti numbers and can be viewed as a generalization of cardinality for topological spaces. The Euler characteristic behaves well with respect to many basic operations on topological spaces, such as homotopy invariance, additivity under disjoint union, and a version of the inclusion–exclusion principle for certain cases. Thus, while there is no direct topological version of Euler's identity in the form of an equation like e^(i*pi) + 1 = 0, the concept of the Euler characteristic serves as a fundamental topological invariant with wide-ranging applications in mathematics and topology.
Prompt: In a vast expanse of mathematical wonder, there exists a captivating machine—a Storytelling Machine. Picture it as a device weaving tales from the essence of numbers and symbols, its gears both forming and traversing intricate mathematical patterns. Within this machine reside characters, each governed by its unique set of rules dictating their interactions. Imagine figures, each with its own distinct shape and color, representing these characters, gathering around the machine, ready to contribute to the unfolding narrative.
Now, envision a special version of this machine—the Monster Storyteller. Its structure is adorned with intricate mathematical symbols and diagrams, reminiscent of ancient runes etched onto its surface. This extraordinary creation delves into the realm of mathematical marvels known as vertex algebras. Here, instead of characters, it hosts mathematical entities called "vertex operators," depicted as dynamic shapes pulsating with energy, each with its own distinct behavior. These operators too - much like characters in a story - follow precise rules governing their interactions within the mathematical narrative.
At the core of the Monster Storyteller lies a connection to an enigmatic group—the Monster group. Visualize this group as a vast, intricate tapestry, stretching across the mathematical landscape, its threads weaving together in mesmerizing patterns. Just as the Monster Storyteller weaves its tales, the Monster group reveals symmetries and patterns beyond comprehension, depicted as interlocking shapes and symbols, forming an elaborate web of mathematical beauty.
Prompt: The concept of a simplicial symmetric sphere spectrum into simple terms:
Spheres of differing dimensions. A 0-sphere is just two points, a 1-sphere is a circle, a 2-sphere is the surface of a ball, and so on.
A “spectrum” is like a sequence of these spheres, where each sphere is connected to the next one in a way that helps us study shapes and spaces in a stable manner.
The “sphere spectrum” is a particular sequence that starts with the 0-sphere, and includes all higher-dimensional spheres.
The "symmetric" part means we're keeping track of how these spheres can be rearranged or swapped around; important because it allows us to do more operations with our spectrum.
“Simplicial” refers to a way of building complex shapes from simple pieces, like Legos. Meaning that we're using a particular mathematical structure to describe how our spheres connect.
Thus a “simplicial symmetric sphere spectrum” is a sequence of spheres of increasing dimensions, built such that we can swap them around and perform various operations on them; this structure is useful for studying shapes and spaces in a way that's more flexible and powerful than just looking at individual spheres.
Thus the “simplicial symmetric sphere spectrum” is a powerful mathematical concept that bridges the gap between geometry and abstract algebra. It's a sequence of spheres of increasing dimensions, connected in a way that allows mathematicians to perform complex operations across dimensions. This is crucial in topology, the study of shapes and spaces. The "symmetric" aspect allows for rearrangements of spheres, enabling operations like addition and multiplication of entire spaces. The "simplicial" component allows building complex shapes from simple elements – the “Lego block” approach, making the concept computationally manageable, and also connecting it to fields like computer graphics and data science. Thus mathematicians gain insights into the very fabric of reality as we u
Prompt: An interior design illustration of an airy library with a bent wood rocking chair, potted plants, a Swedish woven rug on the floor. Matisse, Cressida Campbell, David Hockney.
Prompt: A color pencil sketch of a sophisticatedly drawn sad and broken Aphrodite with flowing blonde hair, Hyper-realistic reflections in the eyes framed by delicate white against a hyper-realistically.She is sitting down elegantly, with details that reflect advanced rendering techniques that push the drawing's realism even further
Prompt: Young boy standing on a giant book raising his hands in front of him. His hair is blue and purple and is splayed out behind his head. In one of his hands he holds a ball of fire Andy in the other is a shard of blue ice. Is eyes are glowing red. Yellow light radiated from the giant book.
Prompt: NYC open layout loft studio, floor to ceiling arch windows, stained and rough brick walls, male artist in paint-stained white coveralls, shovel, mid-air throwing cobalt blue paint onto an extra large canvas, varied sizes of black circles, metallic gold on canvas edges, paint splatters in colors of blue, lavender, teal and orange, hyper realistic, highly detailed, cinematic, dramatic lighting, masterpiece digital painting by David Lebovitz and Jeremy Mann, 8k resolution, lora:epinoiseoffset_v2:0.35
Prompt: Create an image of a flamenco dancer performing on a wooden floor, her gown illuminated by light rays that pass through its fabric, creating a mesmerizing effect. Sparkling particles float around her as she dances gracefully, a rose elegantly held between her teeth. Her hair is styled in a sleek bun, adding to her sophisticated appearance. The background is dark, emphasizing the dancer's movements and the dramatic lighting, capturing her elegant moves and beautiful posture.
Dream Level: is increased each time when you "Go Deeper" into the dream. Each new level is harder to achieve and
takes more iterations than the one before.
Rare Deep Dream: is any dream which went deeper than level 6.
Deep Dream
You cannot go deeper into someone else's dream. You must create your own.
Deep Dream
Currently going deeper is available only for Deep Dreams.
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