Results 11 to 20 of about 1,744,678 (288)
A universal quantum circuit design for periodical functions
New Journal of Physics, 2021 We propose a universal quantum circuit design that can estimate any arbitrary one-dimensional periodic functions based on the corresponding Fourier expansion.
Junxu Li, Sabre Kais
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Physical Review Research, 2021 Within a Dirac model in 1+1 dimensions, a prototypical model to describe low-energy physics for a wide class of lattice models, we propose a field-theoretical version for the representation of Wannier functions, the Zak-Berry connection, and the ...
Kiryl Piasotski +5 more
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EliMAC: Speeding Up LightMAC by around 20%
IACR Transactions on Symmetric Cryptology, 2023 Universal hash functions play a prominent role in the design of message authentication codes and the like. Whereas it is known how to build highly efficient sequential universal hash functions, parallel non-algebraic universal hash function designs are ...
Christoph Dobraunig +2 more
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On universal primitive functions [PDF]
Proceedings of the American Mathematical Society, 1994 This paper generalizes Marcinkiewicz’s universal primitive on pointwise a.e. convergence directly to higher-dimensional spaces. It is also proved that the set of all universal primitive functions with respect to some given nonzero null sequence is residual and, hence, dense in the Banach space C ( I
Gan, Xiao-Xiong, Stromberg, Karl R.
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Fundamenta Mathematicae, 2014 A function of two variables F(x,y)is universal iff for every other function G(x,y) there exists functions h(x) and k(y) with G(x,y) = F(h(x),k(y)) Sierpinski showed that assuming the continuum hypothesis there exists a Borel function F(x,y) which is universal. Assuming Martin's Axiom there is a universal function of Baire class 2.
Larson, Paul B. +3 more
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Machine learning universal bosonic functionals [PDF]
Physical Review Research, 2021 13 pages, 6 figures; close to the published ...
Jonathan Schmidt +2 more
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Universal functions for taylor shifts [PDF]
, 1996 In this paper a new sort of operators, the Taylor shifts, is introduced. They appear as a generalization of weighted backward shifts on the spaces of entire functions and of holomorphic functions in the unit disk.
Bernal González, Luis
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On universal numberings of generalized computable families
Вестник КазНУ. Серия математика, механика, информатика, 2022 The paper investigates the existence of universal generalized computable numberings of different families of sets and total functions. It was known that for every set A such that ∅ 0 ≤T A, a finite family S of A-c.e.
A. A. Issakhov +2 more
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Universal radial limits of meromorphic functions in the unit disk
Comptes Rendus. Mathématique, 2022 We consider the space of meromorphic functions in the unit disk $\mathbb{D}$ and show that there exists a dense $G_{\delta }$-subset of functions having universal radial limits.
Meyrath, Thierry
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Generating functions for the universal Hall-Littlewood $P$- and $Q$-functions [PDF]
, 2018 Recently, P. Pragacz described the ordinary Hall-Littlewood $P$-polynomials by means of push-forwards (Gysin maps) from flag bundles in the ordinary cohomology theory. Together with L.
Nakagawa, Masaki, Naruse, Hiroshi
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