Fermat quintic threefold

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1. In mathematics, a Fermat quintic threefold is a special quintic threefold, in other words a degree 5, dimension 3 hypersurface in 4-dimensional complex projective space, given by the equation .^[1]
2. After a general overview, we focus on the Fermat quintic threefold X, namely the hypersurface in four-dimensional projective space with equation x^5+y^5+z^5+u^5+v^5=0.^[2]
3. AB - We study the deformation theory of lines on the Fermat quintic threefold.^[3]
4. Damiano Testa Conics on the Fermat quintic threefold Background Often it is easier to study homogeneous polynomials.^[4]
5. Working with homogeneous polynomials we remove 0 from their vanishing set; Damiano Testa Conics on the Fermat quintic threefold Background Often it is easier to study homogeneous polynomials.^[4]
6. Damiano Testa Conics on the Fermat quintic threefold Background We are therefore naturally led to consider the projective space Pn over k, whose k-points are Pn(k) := k n+1 (cid:16) k .^[4]
7. Damiano Testa Conics on the Fermat quintic threefold Rational curves To study a variety we are going to search for parameterized curves inside it.^[4]
8. As an application, we study the quantum Fermat quintic threefold which is the quintic threefold in a quantum projective space.^[5]
9. Introduction We look at the Fermat quintic polynomial in ve variables G(x1, . . .^[6]
10. Mirror symmetry conjecture for Fermat quintic threefold Q is the begin- ning of the subject now called the Mirror Symmetry.^[6]
11. Namely, the B model of the Fermat quintic threefold is shown to be equivalent to the A model of its mirror, and hence establishes the mirror symmetry as a true duality.^[7]
12. The mathematical proof of the CDGP Conjecture was termed the Mirror theorem for the Fermat quintic threefold.^[7]
13. Therefore, we can phrase the Mirror theorem for the Fermat quintic in the following form.^[7]
14. The simplest is the Fermat quintic threefold in P4, dened by the equation 0 + x5 x5 1 + x5 2 + x5 3 + x5 4 = 0.^[8]
15. Section 2.2 illustrates this with the prime example of a compact Calabi-Yau manifold, the Fermat quintic.^[9]
16. Yu-Hsiang Liu: Donaldson-Thomas theory for quantum Fermat quintic threefolds is an interesting preprint I would like to read more carefully.^[10]

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• ID : Q5444380

Spacy 패턴 목록

• [{'LOWER': 'fermat'}, {'LOWER': 'quintic'}]
• [{'LOWER': 'fermat'}, {'LOWER': 'quintic'}, {'LEMMA': 'threefold'}]