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Journal articles on the topic 'Mixed Order'

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Published: 9 March 2023

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1

Džurina, Jozef, and Viktor Pirč. "Oscillation of unstable second order neutral differential equations with mixed argument." Mathematica Bohemica 130, no. 3 (2005): 323–33. http://dx.doi.org/10.21136/mb.2005.134096.

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2

Fečkan, Michal, and JinRong Wang. "Mixed Order Fractional Differential Equations." Mathematics 5, no. 4 (November 7, 2017): 61. http://dx.doi.org/10.3390/math5040061.

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3

Gershman, Alex B., and Hagit Messer. "Robust mixed-order root-music." Circuits Systems and Signal Processing 19, no. 5 (September 2000): 451–66. http://dx.doi.org/10.1007/bf01196158.

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4

CAREY, G. F., and W. F. SPOTZ. "Higher-order compact mixed methods." Communications in Numerical Methods in Engineering 13, no. 7 (July 1997): 553–64. http://dx.doi.org/10.1002/(sici)1099-0887(199707)13:7<553::aid-cnm80>3.0.co;2-o.

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5

Dorjgotov, Enkh-Amgalan, Achintya K. Bhowmik, and Philip J. Bos. "High tunability mixed order photonic crystal." Applied Physics Letters 96, no. 16 (April 19, 2010): 163507. http://dx.doi.org/10.1063/1.3368125.

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6

Bokov, A. A. "Compositional order-disorder in mixed ferroelectrics." Ferroelectrics 183, no. 1 (July 1996): 65–73. http://dx.doi.org/10.1080/00150199608224092.

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7

Baran, Ilya, Johannes Schmid, Thomas Siegrist, Markus Gross, and Robert W. Sumner. "Mixed-order compositing for 3D paintings." ACM Transactions on Graphics 30, no. 6 (December 2011): 1–6. http://dx.doi.org/10.1145/2070781.2024166.

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8

Lie, S., A. R. Leyman, and Y. H. Chew. "Fourth-Order and Weighted Mixed Order Direction-of-Arrival Estimators." IEEE Signal Processing Letters 13, no. 11 (November 2006): 691–94. http://dx.doi.org/10.1109/lsp.2006.879456.

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9

UYEMATSU, Tomohiko, and Tetsunao MATSUTA. "Second-Order Intrinsic Randomness for Correlated Non-Mixed and Mixed Sources." IEICE Transactions on Fundamentals of Electronics, Communications and Computer Sciences E100.A, no. 12 (2017): 2615–28. http://dx.doi.org/10.1587/transfun.e100.a.2615.

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10

Zhou, Yewang. "Study on the Mixed Prediction Method of Order Quantity Based on Grey Neural Network." International Journal of Computer and Communication Engineering 4, no. 1 (2015): 18–21. http://dx.doi.org/10.7763/ijcce.2015.v4.375.

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11

Davidson, D. B. "An evaluation of mixed-order versus full-order vector finite elements." IEEE Transactions on Antennas and Propagation 51, no. 9 (September 2003): 2430–41. http://dx.doi.org/10.1109/tap.2003.816350.

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12

Netz, T., A. Düster, and S. Hartmann. "High-order finite elements compared to low-order mixed element formulations." ZAMM - Journal of Applied Mathematics and Mechanics / Zeitschrift für Angewandte Mathematik und Mechanik 93, no. 2-3 (September 24, 2012): 163–76. http://dx.doi.org/10.1002/zamm.201200040.

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13

Ge, Yan, Pan Peng, and Haiping Lu. "Mixed-order spectral clustering for complex networks." Pattern Recognition 117 (September 2021): 107964. http://dx.doi.org/10.1016/j.patcog.2021.107964.

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14

DONG CHUAN-HUA. "HIGHER ORDER SQUEEZING OF MIXED SUPERPOSITION STATES." Acta Physica Sinica 41, no. 3 (1992): 428. http://dx.doi.org/10.7498/aps.41.428.

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15

Semenchuk, A., and R. Zatorsky. "The Fourth Order Mixed Periodic Recurrence Fractions." Journal of Vasyl Stefanyk Precarpathian National University 2, no. 4 (December 24, 2015): 93–104. http://dx.doi.org/10.15330/jpnu.2.4.93-104.

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16

Kaleeswari, B. Selvarajand S. "Certain Third Order Mixed Neutral Difference Equations." IOSR Journal of Mathematics 13, no. 02 (March 2017): 68–75. http://dx.doi.org/10.9790/5728-1302026875.

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17

Asorey, Manuel, Paolo Facchi, and Giuseppe Marmo. "Topological Order, Mixed States and Open Systems." Open Systems & Information Dynamics 26, no. 03 (September 2019): 1950012. http://dx.doi.org/10.1142/s1230161219500124.

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The role of mixed states in topological quantum matter is less known than that of pure quantum states. Generalisations of topological phases appearing in pure states have received attention in the literature only quite recently. In particular, it is still unclear whether the generalisation of the Aharonov–Anandan phase for mixed states due to Uhlmann plays any physical role in the behaviour of the quantum systems. We analyse, from a general viewpoint, topological phases of mixed states and the robustness of their invariance. In particular, we analyse the role of these phases in the behaviour of systems with periodic symmetry and their evolution under the influence of an environment preserving its crystalline symmetries.
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18

Perry, Michael D., and John K. Crane. "High-order harmonic emission from mixed fields." Physical Review A 48, no. 6 (December 1, 1993): R4051—R4054. http://dx.doi.org/10.1103/physreva.48.r4051.

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19

Bussmann-Holder, A., R. Khasanov, A. Shengelaya, A. Maisuradze, F. La Mattina, H. Keller, and K. A. Müller. "Mixed order parameter symmetries in cuprate superconductors." Europhysics Letters (EPL) 77, no. 2 (January 2007): 27002. http://dx.doi.org/10.1209/0295-5075/77/27002.

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20

FRIEDEN, JOYCE. "Stem Cell Executive Order Gets Mixed Reaction." Internal Medicine News 42, no. 7 (April 2009): 36. http://dx.doi.org/10.1016/s1097-8690(09)70262-8.

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21

Fan, Ronghong, Yanru Liu, and Shuo Zhang. "Mixed Schemes for Fourth-Order DIV Equations." Computational Methods in Applied Mathematics 19, no. 2 (April 1, 2019): 341–57. http://dx.doi.org/10.1515/cmam-2018-0003.

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AbstractIn this paper, stable mixed formulations are designed and analyzed for the quad div problems under two frameworks presented in [23] and [22], respectively. Analogue discretizations are given with respect to the mixed formulation, and optimal convergence rates are observed, which confirm the theoretical analysis.
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22

Chen, Benito, and Francisco Solis. "Explicit mixed finite order Runge–Kutta methods." Applied Numerical Mathematics 44, no. 1-2 (January 2003): 21–30. http://dx.doi.org/10.1016/s0168-9274(02)00146-0.

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23

Sergeeva, G. G. "Superconducting long-range order in mixed state." Physica C: Superconductivity 235-240 (December 1994): 1949–50. http://dx.doi.org/10.1016/0921-4534(94)92196-2.

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24

Bairamov, Ismihan, and Safar Parsi. "Order statistics from mixed exchangeable random variables." Journal of Computational and Applied Mathematics 235, no. 16 (June 2011): 4629–38. http://dx.doi.org/10.1016/j.cam.2010.04.030.

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25

Wang, Long, and Jianlong Chen. "Mixed-type reverse-order laws of and." Applied Mathematics and Computation 222 (October 2013): 42–52. http://dx.doi.org/10.1016/j.amc.2013.07.013.

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26

Nomura, Ryo, and Te Sun Han. "Second-Order Slepian-Wolf Coding Theorems for Non-Mixed and Mixed Sources." IEEE Transactions on Information Theory 60, no. 9 (September 2014): 5553–72. http://dx.doi.org/10.1109/tit.2014.2339231.

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27

Aguila-Camacho, N., J. Gallegos, and M. A. Duarte-Mermoud. "Analysis of fractional order error models in adaptive systems: Mixed order cases." Fractional Calculus and Applied Analysis 22, no. 4 (August 27, 2019): 1113–32. http://dx.doi.org/10.1515/fca-2019-0058.

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Abstract This paper presents the properties of two fractional order error models (FOEM) that arise in the analysis of fractional order adaptive systems (FOAS). Cases where the fractional order is the same for every equation in these two FOEM were analyzed in a previous work, obtaining useful results. However, those cases where the fractional orders are different in the equations of FOEM (mixed order cases) have not been addressed before. This paper treats the analysis of some of these mixed order cases, proving boundedness of all the signals and convergence to zero of the mean value of the squared norm of the output error. A model reference adaptive control (MRAC) scheme for an integer order plant using fractional adaptive laws for estimating the controller parameters is presented at the end of the paper, which shows the applicability and importance of the proposed results.
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28

Sunta, C. M., W. E. F. Ayta, J. F. D. Chubaci, and S. Watanabe. "General order and mixed order fits of thermoluminescence glow curves—a comparison." Radiation Measurements 35, no. 1 (January 2002): 47–57. http://dx.doi.org/10.1016/s1350-4487(01)00257-8.

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29

García, Nicolás A., Raleigh L. Davis, So Youn Kim, Paul M. Chaikin, Richard A. Register, and Daniel A. Vega. "Mixed-morphology and mixed-orientation block copolymer bilayers." RSC Adv. 4, no. 72 (2014): 38412–17. http://dx.doi.org/10.1039/c4ra06764a.

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30

Duarte-Mermud, Manuel A., Libel Bárzaga, and Gustavo Ceballos-Benavides. "Mixed Fractional Order Adaptive Control: Theory and Applications." IFAC-PapersOnLine 53, no. 2 (2020): 1543–48. http://dx.doi.org/10.1016/j.ifacol.2020.12.2016.

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31

Dinčić, Nebojša Č., Dragan S. Djordjević, and Dijana Mosić. "Mixed-type reverse order law and its equivalents." Studia Mathematica 204, no. 2 (2011): 123–36. http://dx.doi.org/10.4064/sm204-2-2.

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32

Verma, Khushboo, Pankaj Mathur, and T. R. Gulati. "Mixed Type Higher Order Symmetric Duality Over Cones." International Journal of Modeling and Optimization 7, no. 2 (April 2017): 78–84. http://dx.doi.org/10.7763/ijmo.2017.v7.563.

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33

Gulati, Tilak Raj, and Shiv Kumar Gupta. "NONDIFFERENTIABLE SECOND-ORDER MINIMAX MIXED INTEGER SYMMETRIC DUALITY." Journal of the Korean Mathematical Society 48, no. 1 (January 1, 2011): 13–21. http://dx.doi.org/10.4134/jkms.2011.48.1.013.

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34

Abul-Magd, A. Y., and M. H. Simbel. "High-order level-spacing distributions for mixed systems." Physical Review E 62, no. 4 (October 1, 2000): 4792–98. http://dx.doi.org/10.1103/physreve.62.4792.

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35

ALLISON, JOHN B., MARTIN R. BRETON, and D. BRETT RIDGFXY. "Robust performance using fixed order mixed-norm control." International Journal of Systems Science 28, no. 2 (February 1997): 189–99. http://dx.doi.org/10.1080/00207729708929378.

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36

O'Shaughnessy, Ben, and Dimitrios Vavylonis. "Interfacial Reactions: Mixed Order Kinetics and Segregation Effects." Physical Review Letters 84, no. 14 (April 3, 2000): 3193–96. http://dx.doi.org/10.1103/physrevlett.84.3193.

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37

Sreekantan, Ramesh. "Higher order modular forms and mixed Hodge theory." Acta Arithmetica 139, no. 4 (2009): 321–40. http://dx.doi.org/10.4064/aa139-4-2.

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38

KITIS, G., C. FURETTA, and V. PAGONIS. "MIXED-ORDER KINETICS MODEL FOR OPTICALLY STIMULATED LUMINESCENCE." Modern Physics Letters B 23, no. 27 (October 30, 2009): 3191–207. http://dx.doi.org/10.1142/s0217984909021351.

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The theory of mixed-order kinetics is well-established for the description of single thermoluminescence (TL) glow-peaks. The main advantage of mixed-order kinetics relative to the more widely used general-order kinetic theory is that the former is physically meaningful whereas the latter is entirely empirical. In the case of optically stimulated luminescence (OSL) either non-first-order or second-order kinetics are studied using the empirical general-order kinetics theory. In the present work, expressions for mixed-order kinetics are derived for OSL curves. A peak shape parameter for linear modulation OSL is developed and special mixed-order expressions are derived for use in the computerized OSL curve deconvolution analysis.
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39

Beer, Jamie, Roxanne Dobish, and Carole Chambers. "Physician order entry: a mixed blessing to pharmacy?" Journal of Oncology Pharmacy Practice 8, no. 4 (December 2002): 119–26. http://dx.doi.org/10.1191/1078155202jp099oa.

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40

Alert, Ricard, Pietro Tierno, and Jaume Casademunt. "Mixed-order phase transition in a colloidal crystal." Proceedings of the National Academy of Sciences 114, no. 49 (November 20, 2017): 12906–9. http://dx.doi.org/10.1073/pnas.1712584114.

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Mixed-order phase transitions display a discontinuity in the order parameter like first-order transitions yet feature critical behavior like second-order transitions. Such transitions have been predicted for a broad range of equilibrium and nonequilibrium systems, but their experimental observation has remained elusive. Here, we analytically predict and experimentally realize a mixed-order equilibrium phase transition. Specifically, a discontinuous solid–solid transition in a 2D crystal of paramagnetic colloidal particles is induced by a magnetic field H. At the transition field Hs, the energy landscape of the system becomes completely flat, which causes diverging fluctuations and correlation length ξ∝|H2−Hs2|−1/2. Mean-field critical exponents are predicted, since the upper critical dimension of the transition is du=2. Our colloidal system provides an experimental test bed to probe the unconventional properties of mixed-order phase transitions.
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41

Geymonat, Giuseppe, and Vanda Valente. "A Noncontrollability Result for Systems of Mixed Order." SIAM Journal on Control and Optimization 39, no. 3 (January 2000): 661–72. http://dx.doi.org/10.1137/s0363012998348322.

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42

Kozhevnikov, Alexander. "Parameter-ellipticity for mixed-order elliptic boundary problems." Comptes Rendus de l'Académie des Sciences - Series I - Mathematics 324, no. 12 (June 1997): 1361–66. http://dx.doi.org/10.1016/s0764-4442(97)83575-6.

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43

Wang, Minghui, Musheng Wei, and Zhigang Jia. "Mixed-type reverse order law of (AB)(13)." Linear Algebra and its Applications 430, no. 5-6 (March 2009): 1691–99. http://dx.doi.org/10.1016/j.laa.2008.07.022.

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44

de Mello, E. V. L. "Mixed complex order parameter in high-Tc superconductors." Physica C: Superconductivity 341-348 (November 2000): 1701–2. http://dx.doi.org/10.1016/s0921-4534(00)00944-8.

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45

O'Donovan, C., and J. P. Carbotte. "Mixed order parameter symmetry in the BCS model." Physica C: Superconductivity 252, no. 1-2 (October 1995): 87–99. http://dx.doi.org/10.1016/0921-4534(95)00451-3.

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46

Došlý, Ondřej, and Daniel Marek. "Even-order linear dynamic equations with mixed derivatives." Computers & Mathematics with Applications 53, no. 7 (April 2007): 1140–52. http://dx.doi.org/10.1016/j.camwa.2006.12.011.

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47

Lee, Chen-Nong, and Chun-Ming Chang. "High-order mixed-mode OTA-C universal filter." AEU - International Journal of Electronics and Communications 63, no. 6 (June 2009): 517–21. http://dx.doi.org/10.1016/j.aeue.2008.04.004.

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48

Pan, Yu, Sheng-Ping Guo, Bin-Wen Liu, Huai-Guo Xue, and Guo-Cong Guo. "Second-order nonlinear optical crystals with mixed anions." Coordination Chemistry Reviews 374 (November 2018): 464–96. http://dx.doi.org/10.1016/j.ccr.2018.07.013.

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49

Liu, Pengfei, Liang Xiao, and Liancun Xiu. "Mixed Higher Order Variational Model for Image Recovery." Mathematical Problems in Engineering 2014 (2014): 1–15. http://dx.doi.org/10.1155/2014/924686.

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A novel mixed higher order regularizer involving the first and second degree image derivatives is proposed in this paper. Using spectral decomposition, we reformulate the new regularizer as a weightedL1-L2mixed norm of image derivatives. Due to the equivalent formulation of the proposed regularizer, an efficient fast projected gradient algorithm combined with monotone fast iterative shrinkage thresholding, called, FPG-MFISTA, is designed to solve the resulting variational image recovery problems under majorization-minimization framework. Finally, we demonstrate the effectiveness of the proposed regularization scheme by the experimental comparisons with total variation (TV) scheme, nonlocal TV scheme, and current second degree methods. Specifically, the proposed approach achieves better results than related state-of-the-art methods in terms of peak signal to ratio (PSNR) and restoration quality.
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50

Koné, Siaka, and Manfred Móller. "Mixed Order Systems of Ordinary Linear Differential Equations." Rocky Mountain Journal of Mathematics 36, no. 3 (June 2006): 957–80. http://dx.doi.org/10.1216/rmjm/1181069439.

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