Efficient Search for Optimal Diffusion Layers of Generalized Feistel Networks

The Feistel construction is one of the most studied ways of building block ciphers. Several generalizations were then proposed in the literature, leading to the Generalized Feistel Network, where the round function first applies a classical Feistel operation in parallel on an even number of blocks, and then a permutation is applied to this set of blocks. In 2010 at FSE, Suzaki and Minematsu studied the diffusion of such construction, raising the question of how many rounds are required so that each block of the ciphertext depends on all blocks of the plaintext. They thus gave some optimal permutations, with respect to this diffusion criteria, for a Generalized Feistel Network consisting of 2 to 16 blocks, as well as giving a good candidate for 32 blocks. Later at FSE’19, Cauchois et al. went further and were able to propose optimal even-odd permutations for up to 26 blocks.In this paper, we complete the literature by building optimal even-odd permutations for 28, 30, 32, 36 blocks which to the best of our knowledge were unknown until now. The main idea behind our constructions and impossibility proof is a new characterization of the total diffusion of a permutation after a given number of rounds. In fact, we propose an efficient algorithm based on this new characterization which constructs all optimal even-odd permutations for the 28, 30, 32, 36 blocks cases and proves a better lower bound for the 34, 38, 40 and 42 blocks cases. In particular, we improve the 32 blocks case by exhibiting optimal even-odd permutations with diffusion round of 9. The existence of such a permutation was an open problem for almost 10 years and the best known permutation in the literature had a diffusion round of 10. Moreover, our characterization can be implemented very efficiently and allows us to easily re-find all optimal even-odd permutations for up to 26 blocks with a basic exhaustive search

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Adjustable Tensegrity Robot Based on Assur Graph Principle

Volume 10: Mechanical Systems and Control, Parts A and B ◽

10.1115/imece2009-11301 ◽

2009 ◽

Cited By ~ 3

Author(s):

Offer Shai ◽

Itay Tehori ◽

Avner Bronfeld ◽

Michael Slavutin ◽

Uri Ben-Hanan

Keyword(s):

Control System ◽

Projective Geometry ◽

Efficient Algorithm ◽

Degrees Of Freedom ◽

Theoretical Foundation ◽

Main Idea ◽

Output Data ◽

Promising Application ◽

External Loads

The paper introduces a tensegrity robot consisting of cables and actuators. Although this robot has zero degrees of freedom, it is both mobile, and capable of sustaining massive external loads. This outcome is achieved by constantly maintaining the configuration of the robot at a singular position. The underlying theoretical foundation of this work is originated from the concept of Assur Trusses (also known as Assur Groups), which are long known in the field of kinematics. During the last three years, the latter concept has been reformulated by mathematicians from rigidity theory community, and new theorems and algorithms have been developed. Since the topology of the robot is an Assur Truss, the work reported in the paper relies on Assur Trusses theorems that have been developed this year resulting in an efficient algorithm to constantly keep the robot at the singular position. In order to get an efficient characterization of the desired configurations, known techniques from projective geometry were employed. The main idea of the control system of the device, that was also mathematically proved, is that changing the length of only one element, causes the robot to be at the singular position. Therefore, the system measures the force in only one cable, and its length is modified accordingly by the control system. The topology of the device is an Assur Truss — a 3D triad, but the principles introduced in the paper are applicable to any robot whose topology is an Assur Truss, such as: tetrad, pentad, double triad and so forth. The paper includes several photos of the device and the output data of the control system indicating its promising application.

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Compact Differences of Composition Operators on Bergman Spaces Induced by Doubling Weights

Journal of Geometric Analysis ◽

10.1007/s12220-021-00724-y ◽

2021 ◽

Author(s):

Bin Liu ◽

Jouni Rättyä ◽

Fanglei Wu

Keyword(s):

Bergman Space ◽

Open Problem ◽

Lebesgue Space ◽

Composition Operators ◽

Bergman Spaces ◽

Weighted Bergman Space ◽

Carleson Measures ◽

Doubling Weights ◽

The Way

AbstractBounded and compact differences of two composition operators acting from the weighted Bergman space $$A^p_\omega $$ A ω p to the Lebesgue space $$L^q_\nu $$ L ν q , where $$0<q<p<\infty $$ 0 < q < p < ∞ and $$\omega $$ ω belongs to the class "Equation missing" of radial weights satisfying two-sided doubling conditions, are characterized. On the way to the proofs a new description of q-Carleson measures for $$A^p_\omega $$ A ω p , with $$p>q$$ p > q and "Equation missing", involving pseudohyperbolic discs is established. This last-mentioned result generalizes the well-known characterization of q-Carleson measures for the classical weighted Bergman space $$A^p_\alpha $$ A α p with $$-1<\alpha <\infty $$ - 1 < α < ∞ to the setting of doubling weights. The case "Equation missing" is also briefly discussed and an open problem concerning this case is posed.

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Characterization of complex (B + C) diffusion layers formed on chromium and nickel-based low-carbon steel

Applied Surface Science ◽

10.1016/s0169-4332(02)00940-6 ◽

2002 ◽

Vol 202 (3-4) ◽

pp. 252-260 ◽

Cited By ~ 46

Author(s):

A Pertek ◽

M Kulka

Keyword(s):

Carbon Steel ◽

Low Carbon Steel ◽

Low Carbon ◽

Diffusion Layers

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Polynomial Mixing of the Edge-Flip Markov Chain for Unbiased Dyadic Tilings

Combinatorics Probability Computing ◽

10.1017/s0963548318000470 ◽

2018 ◽

Vol 28 (3) ◽

pp. 365-387

Author(s):

S. CANNON ◽

D. A. LEVIN ◽

A. STAUFFER

Keyword(s):

Markov Chain ◽

Relaxation Time ◽

Lower Bound ◽

Upper Bound ◽

Open Problem ◽

Mixing Time ◽

Perpendicular Bisector ◽

Unit Square

We give the first polynomial upper bound on the mixing time of the edge-flip Markov chain for unbiased dyadic tilings, resolving an open problem originally posed by Janson, Randall and Spencer in 2002 [14]. A dyadic tiling of size n is a tiling of the unit square by n non-overlapping dyadic rectangles, each of area 1/n, where a dyadic rectangle is any rectangle that can be written in the form [a2−s, (a + 1)2−s] × [b2−t, (b + 1)2−t] for a, b, s, t ∈ ℤ⩾ 0. The edge-flip Markov chain selects a random edge of the tiling and replaces it with its perpendicular bisector if doing so yields a valid dyadic tiling. Specifically, we show that the relaxation time of the edge-flip Markov chain for dyadic tilings is at most O(n4.09), which implies that the mixing time is at most O(n5.09). We complement this by showing that the relaxation time is at least Ω(n1.38), improving upon the previously best lower bound of Ω(n log n) coming from the diameter of the chain.

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FINITELY SUBSEQUENTIAL TRANSDUCERS

International Journal of Foundations of Computer Science ◽

10.1142/s0129054103002126 ◽

2003 ◽

Vol 14 (06) ◽

pp. 983-994 ◽

Cited By ~ 9

Author(s):

CYRIL ALLAUZEN ◽

MEHRYAR MOHRI

Keyword(s):

Speech Recognition ◽

Finite Number ◽

Efficient Algorithm ◽

Experimental Results ◽

Theoretical Formulation ◽

Large Vocabulary ◽

Finite State Transducers ◽

Finite State ◽

Large Vocabulary Speech Recognition

Finitely subsequential transducers are efficient finite-state transducers with a finite number of final outputs and are used in a variety of applications. Not all transducers admit equivalent finitely subsequential transducers however. We briefly describe an existing generalized determinization algorithm for finitely subsequential transducers and give the first characterization of finitely subsequentiable transducers, transducers that admit equivalent finitely subsequential transducers. Our characterization shows the existence of an efficient algorithm for testing finite subsequentiability. We have fully implemented the generalized determinization algorithm and the algorithm for testing finite subsequentiability. We report experimental results showing that these algorithms are practical in large-vocabulary speech recognition applications. The theoretical formulation of our results is the equivalence of the following three properties for finite-state transducers: determinizability in the sense of the generalized algorithm, finite subsequentiability, and the twins property.

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PERMUTATIONS OF THE INTEGERS INDUCE ONLY THE TRIVIAL AUTOMORPHISM OF THE TURING DEGREES

Bulletin of Symbolic Logic ◽

10.1017/bsl.2018.15 ◽

2018 ◽

Vol 24 (2) ◽

pp. 165-174

Author(s):

BJØRN KJOS-HANSSEN

Keyword(s):

Open Problem ◽

Main Idea ◽

Computability Theory ◽

Turing Degrees ◽

Nontrivial Automorphism

AbstractIs there a nontrivial automorphism of the Turing degrees? It is a major open problem of computability theory. Past results have limited how nontrivial automorphisms could possibly be. Here we consider instead how an automorphism might be induced by a function on reals, or even by a function on integers. We show that a permutation of ω cannot induce any nontrivial automorphism of the Turing degrees of members of 2ω, and in fact any permutation that induces the trivial automorphism must be computable.A main idea of the proof is to consider the members of 2ω to be probabilities, and use statistics: from random outcomes from a distribution we can compute that distribution, but not much more.

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New Results on Degree Sequences of Uniform Hypergraphs

The Electronic Journal of Combinatorics ◽

10.37236/3414 ◽

2013 ◽

Vol 20 (4) ◽

Cited By ~ 9

Author(s):

Sarah Behrens ◽

Catherine Erbes ◽

Michael Ferrara ◽

Stephen G. Hartke ◽

Benjamin Reiniger ◽

...

Keyword(s):

Efficient Algorithm ◽

Necessary Conditions ◽

Degree Sequence ◽

Sufficient Conditions ◽

Degree Sequences ◽

Uniform Hypergraph ◽

Graphic Sequence ◽

Uniform Hypergraphs ◽

Open Question

A sequence of nonnegative integers is $k$-graphic if it is the degree sequence of a $k$-uniform hypergraph. The only known characterization of $k$-graphic sequences is due to Dewdney in 1975. As this characterization does not yield an efficient algorithm, it is a fundamental open question to determine a more practical characterization. While several necessary conditions appear in the literature, there are few conditions that imply a sequence is $k$-graphic. In light of this, we present sharp sufficient conditions for $k$-graphicality based on a sequence's length and degree sum.Kocay and Li gave a family of edge exchanges (an extension of 2-switches) that could be used to transform one realization of a 3-graphic sequence into any other realization. We extend their result to $k$-graphic sequences for all $k \geq 3$. Finally we give several applications of edge exchanges in hypergraphs, including generalizing a result of Busch et al. on packing graphic sequences.

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Regiodivergent Biocatalytic Hydroxylation of L-Glutamine Facilitated by Characterization of Non-Heme Dioxygenases from Non-Ribosomal Peptide Biosyntheses

10.26434/chemrxiv.14206172.v1 ◽

2021 ◽

Author(s):

Hans Renata ◽

Emily Shimizu ◽

Christian Zwick

Keyword(s):

Amino Acid ◽

Building Block ◽

Solid Phase ◽

Functional Characterization ◽

Free Standing ◽

Substrate Specificities ◽

Total Turnover

We report the functional characterization of two iron- and a-ketoglutarate-dependent dioxygenases that are capable of hydroxylating free-standing glutamine at its C3 and C4 position respectively. In particular, the C4 hydroxylase, Q4Ox, catalyzes the reaction with approximately 4,300 total turnover numbers, facilitating synthesis of a solid-phase compatible building block and stereochemical elucidation at the C4 position of the hydroxylated product. This work will enable the development of novel synthetic strategies to prepare useful glutamine derivatives and stimulate further discoveries of new amino acid hydroxylases with distinct substrate specificities.<br>

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