22 research outputs found
Nonlinear optical properties in a quantum well with the hyperbolic confinement potential
We have performed theoretical calculation of the nonlinear optical properties
in a quantum well (QW) with the hyperbolic confinement potential. Calculation
results reveal that the transition energy, oscillator strength, second-order
nonlinear optical rectification (OR), geometric factor and nonlinear optical
absorption (OA) are strongly affected by the parameters () of
the hyperbolic confinement potential. And an increment of the parameter
reduces all these physical quantities, while an increment of the
parameter enhances them, but not for geometric factor. In addition, it
is found that one can control the optical properties of QW by tuning these
parameters.Comment: 16pages,6 figures,Accepted for publication in Physica
A Practical Method to Recover Exact Superpoly in Cube Attack
Cube attack is an important cryptanalytic technique against symmetric cryptosystems, especially for stream ciphers. The key step in cube attack is recovering superpoly. However, when cube size is large, the large time complexity of recovering the exact algebraic normal form (ANF) of superpoly confines cube attack. At CRYPTO 2017, Todo et al. applied conventional bit-based division property (CBDP) into cube attack which could exploit large cube sizes. However, CBDP based cube attacks cannot ensure that the superpoly of a cube is non-constant. Hence the key recovery attack may be just a distinguisher. Moreover, CBDP based cube attacks can only recover partial ANF coefficients of superpoly. The time complexity of recovering the reminding ANF coefficients is very large, because it has to query the encryption oracle and sum over the cube set. To overcome these limits, in this paper, we propose a practical method to recover the ANF coefficients of superpoly. This new method is developed based on bit-based division property using three subsets (BDPT) proposed by Todo at FSE 2016. We apply this new method to reduced-round Trivium. To be specific, the time complexity of recovering the superpoly of 832-round Trivium at CRYPTO 2017 is reduced from to practical, and the time complexity of recovering the superpoly of 839-round Trivium at CRYPTO 2018 is reduced from to practical. Then, we propose a theoretical attack which can recover the superpoly of Trivium up to 842 round. As far as we know, this is the first time that the superpoly can be recovered for Trivium up to 842 rounds
Nonlinear optical properties of a three-dimensional anisotropic quantum dot
The linear and nonlinear optical properties in a three-dimensional
anisotropic quantum dot subjected to a uniform magnetic field directed with
respect to the axis have been investigated within the compact-density
matrix formalism and the iterative method. The dependence of the linear and
nonlinear optical properties on characteristic frequency of the parabolic
potential, on the magnetic field and on the incident optical intensity is
detailedly studied. Moreover, take into account the position-dependent
effective mass, the dependence of the linear and nonlinear optical properties
on the dot radius is investigated. The results show that the optical absorption
coefficients (ACs) and refractive index (RI) changes of the anisotropic quantum
dot (QD) have strongly affected by these factors, and the position effect also
plays an important role in the optical ACs and RI changes of the anisotropic
QD.Comment: 12pages 8 figures, accpeted for publication in solid state
communication
MILP Method of Searching Integral Distinguishers Based on Division Property Using Three Subsets
Division property is a generalized integral property proposed by Todo at EUROCRYPT 2015, and then conventional bit-based division property (CBDP) and bit-based division property using three subsets (BDPT) were proposed by Todo and Morii at FSE 2016. The huge time and memory complexity that once restricted the applications of CBDP have been solved by Xiang et al. at ASIACRYPT 2016. They extended Mixed Integer Linear Programming (MILP) method to search integral distinguishers based on CBDP. BDPT can find more accurate integral distinguishers than CBDP, but it can not be modeled efficiently. Thus it cannot be applied to block ciphers with block size larger than 32 bits. In this paper, we focus on the feasibility of applying MILP-aided method to search integral distinguishers based on BDPT. We firstly study how to get the BDPT propagation rules of an S-box. Based on that we can efficiently describe the BDPT propagation of cipher which has S-box. Moreover, we propose a technique called ``fast propagation , which can translate BDPT into CBDP, then the balanced bits based on BDPT can be presented. Together with the propagation properties of BDPT, we can use MILP method based on CBDP to search integral distinguishers based on BDPT. In order to prove the efficiency of our method, we search integral distinguishers on SIMON, SIMECK, PRESENT, RECTANGLE, LBlock, and TWINE. For SIMON64, PRESENT, and RECTANGLE, we find more balanced bits than the previous longest distinguishers. For LBlock, we find a 17-round integral distinguisher which is one more round than the previous longest integral distinguisher, and a better 16-round integral distinguisher with less active bits can be obtain. For other ciphers, our results are in accordance with the previous longest distinguishers
New method for combining Matsui’s bounding conditions with sequential encoding method
As the first generic method for finding the optimal differential and linear characteristics, Matsui\u27s branch and bound search algorithm has played an important role in evaluating the security of symmetric ciphers. By combining Matsui\u27s bounding conditions with automatic search models, search efficiency can be improved. In this paper, by studying the properties of Matsui\u27s bounding conditions, we give the general form of bounding conditions that can eliminate all the impossible solutions determined by Matsui\u27s bounding conditions. Then, a new method of combining bounding conditions with sequential encoding method is proposed. With the help of some small size Mixed Integer Linear Programming (MILP) models, we can use fewer variables and clauses to build Satisfiability Problem (SAT) models. As applications, we use our new method to search for the optimal differential and linear characteristics of some SPN, Feistel, and ARX block ciphers. The number of variables and clauses and the solving time of the SAT models are decreased significantly. In addition, we find some new differential and linear characteristics covering more rounds
New Methods for Bounding the Length of Impossible Differentials of SPN Block Ciphers
Impossible differential (ID) cryptanalysis is one of the most important cryptanalytic approaches for block ciphers. How to evaluate the security of Substitution-Permutation Network (SPN) block ciphers against ID is a valuable problem. In this paper, a series of methods for bounding the length of IDs of SPN block ciphers are proposed. From the perspective of overall structure, we propose a general framework and three implementation strategies. The three implementation strategies are compared and analyzed in terms of efficiency and accuracy. From the perspective of implementation technologies, we give the methods for determining representative set, partition table and ladder and integrating them into searching models. Moreover, the rotation-equivalence ID sets of ciphers are explored to reduce the number of models need to be considered. Thus, the ID bounds of SPN block ciphers can be effectively evaluated. As applications, we show that 9-round PRESENT, 8-round GIFT-64, 12-round GIFT-128, 5-round AES, 6-round Rijndael-160, 7-round Rijndael-192, 7-round Rijndael-224, 7-round Rijndael-256 and 10-round Midori64 do not have any ID under the sole assumption that the round keys are uniformly random. The results of PRESENT, GIFT-128, Rijndael-160, Rijndael-192, Rijndael-224, Rijndael-256 and Midori64 are obtained for the first time. Moreover, the ID bounds of AES, Rijndael-160, Rijndael-192, Rijndael-224 and Rijndael-256 are infimum
CYCLOPYGID TRILOBITES FROM THE ORDOVICIAN OF NORTHEASTERN TARIM, XINJIANG, NORTHWEST CHINA
Volume: 16Start Page: 593End Page: 62
Exploring Secret Keys in Searching Integral Distinguishers Based on Division Property
Division property proposed by Todo at EUROCRYPT 2015 is a generalized integral property. Then, conventional bit-based division property (CBDP) and bitbased division property using three subsets (BDPT) were proposed by Todo and Morii at FSE 2016. At ASIACRYPT 2016, Xiang et al. extended Mixed Integer Linear Programming (MILP) method to search integral distinguishers based on CBDP. And at ASIACRYPT 2019, Wang et al. proposed an MILP-aided method of searching integral distinguishers based on BDPT. Although BDPT is powerful in searching integral distinguishers, the accuracy is not perfect.For block cipher SPECK32, as the block size is only 32 bits, we can experimentally observe the behaviors of all the plaintexts under a fixed key. By testing 210 random secret keys, we experimentally find a better integral distinguisher of 6-round SPECK32 with 30 active bits. But this experimental integral distinguisher cannot be proved by existing methods. So there still exists a gap between the proved distinguisher and the experimental one.To fill the gap, we explore secret keys in searching integral distinguishers based on BDPT. We put forward a situation where “Xor with The Secret Key” operation can be bypassed. Based on the new BDPT propagation rule, an improved automatic algorithm of searching integral distinguishers is proposed. For SPECK32, our improved algorithm can find the 6-round integral distinguisher with 230 chosen plaintexts. The gap between the proved distinguisher and the experimental one is filled. Moreover, we apply this improved method to search the integral distinguishers of SPECK, KATAN/KTANTAN, SIMON, SIMECK, SIMON(102), PRESENT and RECTANGLE block ciphers. The integral distinguishers found by our improved method are better than or consistent with the previous longest distinguishers
Advancements in engineered mesenchymal stem cell exosomes for chronic lung disease treatment
Abstract Chronic lung diseases include an array of conditions that impact airways and lung structures, leading to considerable societal burdens. Mesenchymal stem cells (MSCs) and their exosomes (MSC-exos) can be used for cell therapy and exhibit a diverse spectrum of anti-inflammatory, antifibrotic, and immunomodulatory properties. Engineered MSC-exos possesses enhanced capabilities for targeted drug delivery, resulting in more potent targeting effects. Through various engineering modifications, these exosomes can exert many biological effects, resulting in specific therapeutic outcomes for many diseases. Moreover, engineered stem cell exosomes may exhibit an increased capacity to traverse physiological barriers and infiltrate protected lesions, thereby exerting their therapeutic effects. These characteristics render them a promising therapeutic agent for chronic pulmonary diseases. This article discusses and reviews the strategies and mechanisms of engineered MSC-exos in the treatment of chronic respiratory diseases based on many studies to provide new solutions for these diseases