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Journal articles on the topic 'Stationary points'

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Published: 4 June 2021
Last updated: 25 July 2025

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1

Colley, Susan Jane. "Enumerating stationary multiple-points." Advances in Mathematics 66, no. 2 (1987): 149–70. http://dx.doi.org/10.1016/0001-8708(87)90033-8.

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2

van der Laan, Gerard. "Stationary points and equilibria." Journal of Fixed Point Theory and Applications 6, no. 2 (2009): 179–205. http://dx.doi.org/10.1007/s11784-009-0126-5.

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3

Kassay, Gábor, József Kolumbán, and Zsolt Páles. "On Nash stationary points." Publicationes Mathematicae Debrecen 54, no. 3-4 (1999): 267–79. http://dx.doi.org/10.5486/pmd.1999.1902.

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4

Colley, Susan Jane. "Stationary points of plane forms." Proceedings of the American Mathematical Society 95, no. 3 (1985): 341. http://dx.doi.org/10.1090/s0002-9939-1985-0806067-2.

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5

Runde, M. "Mass Transport in Stationary Contact Points." IEEE Transactions on Components, Hybrids, and Manufacturing Technology 10, no. 1 (1987): 89–99. http://dx.doi.org/10.1109/tchmt.1987.1134705.

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6

Banerjee, Ajit, Noah Adams, Jack Simons, and Ron Shepard. "Search for stationary points on surfaces." Journal of Physical Chemistry 89, no. 1 (1985): 52–57. http://dx.doi.org/10.1021/j100247a015.

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7

Hornung, Peter. "Stationary points of nonlinear plate theories." Journal of Functional Analysis 273, no. 3 (2017): 946–83. http://dx.doi.org/10.1016/j.jfa.2017.04.010.

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8

Blatt, Simon, and Philipp Reiter. "Stationary points of O’Hara’s knot energies." Manuscripta Mathematica 140, no. 1-2 (2012): 29–50. http://dx.doi.org/10.1007/s00229-011-0528-8.

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9

Golab, Joseph T., Danny L. Yeager, and Poul Jørgensen. "Proper characterization of MCSCF stationary points." International Journal of Quantum Chemistry 24, S17 (2009): 645. http://dx.doi.org/10.1002/qua.560240869.

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10

Deléamont, P. Y., and D. La Vecchia. "Semiparametric segment M-estimation for locally stationary diffusions." Biometrika 106, no. 4 (2019): 941–56. http://dx.doi.org/10.1093/biomet/asz042.

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Summary We develop and implement a novel M-estimation method for locally stationary diffusions observed at discrete time-points. We give sufficient conditions for the local stationarity of general time-inhomogeneous diffusions. Then we focus on locally stationary diffusions with time-varying parameters, for which we define our M-estimators and derive their limit theory.
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11

Chairis, Giovanni, and Ade Maulana. "Analisis Perancangan Dan Implementasi Sistem Informasi Stationary Berbasis Web Pada PT. Indako Trading Coy." Journal Information System Development (ISD) 7, no. 2 (2022): 78. http://dx.doi.org/10.19166/isd.v7i2.564.

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PT. Indako Trading Coy is a company engaged in the automotive sector, which in carrying out business processes must use ATK. The company has problems in the procurement process and ATK requests where the process is still done manually and offline. Data collection in this research can be done by using interview techniques, literature study, observation, problem analysis and questionnaires to several users related to the system, then the author designs a Web-based stationary information system. From the results of the implementation of the information system, it can be proven that the procuremen
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12

Siudem, Grzegorz, and Grzegorz Świątek. "Diagonal stationary points of the bethe functional." Discrete & Continuous Dynamical Systems - A 37, no. 5 (2017): 2717–43. http://dx.doi.org/10.3934/dcds.2017117.

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13

Bland, J. A. "Stationary points in the (c, m) plane." International Journal of Mathematical Education in Science and Technology 17, no. 1 (1986): 25–29. http://dx.doi.org/10.1080/0020739860170102.

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14

Soskin, Marat S., Vladimir Denisenko, and Isaac Freund. "Optical polarization singularities and elliptic stationary points." Optics Letters 28, no. 16 (2003): 1475. http://dx.doi.org/10.1364/ol.28.001475.

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15

Horrace, William C., and Ian A. Wright. "Stationary Points for Parametric Stochastic Frontier Models." Journal of Business & Economic Statistics 38, no. 3 (2019): 516–26. http://dx.doi.org/10.1080/07350015.2018.1526088.

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16

Khait, Yu G., and Yu V. Puzanov. "Search for stationary points on multidimensional surfaces." Journal of Molecular Structure: THEOCHEM 398-399 (June 1997): 101–9. http://dx.doi.org/10.1016/s0166-1280(97)00036-5.

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17

Zhou, Jingfang, Evan C. Sherbrooke, and Nicholas M. Patrikalakis. "Computation of stationary points of distance functions." Engineering with Computers 9, no. 4 (1993): 231–46. http://dx.doi.org/10.1007/bf01201903.

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18

Carmon, Yair, John C. Duchi, Oliver Hinder, and Aaron Sidford. "Lower bounds for finding stationary points I." Mathematical Programming 184, no. 1-2 (2019): 71–120. http://dx.doi.org/10.1007/s10107-019-01406-y.

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19

Jongen, H. Th, D. Klatte, and K. Tammer. "Implicit functions and sensitivity of stationary points." Mathematical Programming 49, no. 1-3 (1990): 123–38. http://dx.doi.org/10.1007/bf01588782.

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20

Kahn, M. S., K. R. Rao, and Y. J. Cho. "Common stationary points for set-valued mappings." International Journal of Mathematics and Mathematical Sciences 16, no. 4 (1993): 733–36. http://dx.doi.org/10.1155/s0161171293000912.

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21

Arroyo, J., O. J. Garay, and J. J. Mencía. "Unit speed stationary points of the acceleration." Journal of Mathematical Physics 49, no. 1 (2008): 013508. http://dx.doi.org/10.1063/1.2830433.

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22

Bazhenov, L. G. "Finding the stationary points of semiregular functions." Cybernetics and Systems Analysis 27, no. 4 (1992): 568–73. http://dx.doi.org/10.1007/bf01130368.

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23

Sadun, Lorenzo, and Jan Segert. "Stationary points of the Yang-Mills action." Communications on Pure and Applied Mathematics 45, no. 4 (1992): 461–84. http://dx.doi.org/10.1002/cpa.3160450405.

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24

Wu, Wenying, and Dingtao Peng. "Optimality Conditions for Group Sparse Constrained Optimization Problems." Mathematics 9, no. 1 (2021): 84. http://dx.doi.org/10.3390/math9010084.

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In this paper, optimality conditions for the group sparse constrained optimization (GSCO) problems are studied. Firstly, the equivalent characterizations of Bouligand tangent cone, Clarke tangent cone and their corresponding normal cones of the group sparse set are derived. Secondly, by using tangent cones and normal cones, four types of stationary points for GSCO problems are given: TB-stationary point, NB-stationary point, TC-stationary point and NC-stationary point, which are used to characterize first-order optimality conditions for GSCO problems. Furthermore, both the relationship among t
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25

Di Biagio, Lorenzo. "The first derivative test and the classification of stationary points." Mathematical Gazette 108, no. 573 (2024): 407–18. http://dx.doi.org/10.1017/mag.2024.109.

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Given a real differentiable function f we say that a point x0 is a stationary point of f if f′ (x0) = 0.In any standard single-variable calculus class, students learn how to determine the nature of a stationary point by checking the sign of f(x) in intervals to the left and to the right of the stationary point. In doing so, they are performing the first derivative test.
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26

Kok, Schalk, and Carl Sandrock. "Locating and Characterizing the Stationary Points of the Extended Rosenbrock Function." Evolutionary Computation 17, no. 3 (2009): 437–53. http://dx.doi.org/10.1162/evco.2009.17.3.437.

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Two variants of the extended Rosenbrock function are analyzed in order to find the stationary points. The first variant is shown to possess a single stationary point, the global minimum. The second variant has numerous stationary points for high dimensionality. A previously proposed method is shown to be numerically intractable, requiring arbitrary precision computation in many cases to enumerate candidate solutions. Instead, a standard Newtonian method with multi-start is applied to locate stationary points. The relative magnitude of the negative and positive eigenvalues of the Hessian is als
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27

Wales, David J. "Locating stationary points for clusters in cartesian coordinates." Journal of the Chemical Society, Faraday Transactions 89, no. 9 (1993): 1305. http://dx.doi.org/10.1039/ft9938901305.

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28

Pang, Jong-Shi, Meisam Razaviyayn, and Alberth Alvarado. "Computing B-Stationary Points of Nonsmooth DC Programs." Mathematics of Operations Research 42, no. 1 (2017): 95–118. http://dx.doi.org/10.1287/moor.2016.0795.

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29

Dorogovtsev, Andrey A., Georgii V. Riabov, and Björn Schmalfuß. "Stationary points in coalescing stochastic flows on R." Stochastic Processes and their Applications 130, no. 8 (2020): 4910–26. http://dx.doi.org/10.1016/j.spa.2020.02.005.

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30

Lovetskiy, Konstantin, Leonid Sevastianov, and Nikolai Nikolaev. "Regularized Computation of Oscillatory Integrals with Stationary Points." Procedia Computer Science 108 (2017): 998–1007. http://dx.doi.org/10.1016/j.procs.2017.05.028.

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31

Guddat, J., H. Th Jongen, and J. Rueckmann. "On stability and stationary points in nonlinear optimization." Journal of the Australian Mathematical Society. Series B. Applied Mathematics 28, no. 1 (1986): 36–56. http://dx.doi.org/10.1017/s033427000000518x.

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This paper presents three theorems concerning stability and stationary points of the constrained minimization problem:In summary, we provethat, given the Mangasarian-Fromovitz constraint qualification (MFCQ), the feasible setM[H, G] is a topological manifold with boundary, with specified dimension; (ℬ) a compact feasible setM[H, G] is stable (perturbations ofHandGproduce homeomorphic feasible sets) if and only if MFCQ holds;under a stability condition, two lower level sets offwith a Kuhn-Tucker point between them are homotopically related by attachment of ak-cell (kbeing the stationary index i
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32

Meester, Ronald. "Extremal points of infinite clusters in stationary percolation." Statistics & Probability Letters 42, no. 4 (1999): 361–65. http://dx.doi.org/10.1016/s0167-7152(98)00229-6.

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33

El-Issa, B. D., and R. N. Budeir. "Stationary points on the aminomethanol potential energy surface." Theoretica Chimica Acta 78, no. 4 (1991): 211–30. http://dx.doi.org/10.1007/bf01112845.

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34

Mascarenhas, Walter F. "Newton’s iterates can converge to non-stationary points." Mathematical Programming 112, no. 2 (2006): 327–34. http://dx.doi.org/10.1007/s10107-006-0019-y.

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35

Ackermann, Stefan, and Wolfgang Kliesch. "Computation of stationary points via a homotopy method." Theoretical Chemistry Accounts: Theory, Computation, and Modeling (Theoretica Chimica Acta) 99, no. 4 (1998): 255–64. http://dx.doi.org/10.1007/s002140050334.

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36

Lovetskiy, K. P., L. A. Sevastianov, D. S. Kulyabov, and N. E. Nikolaev. "Regularized computation of oscillatory integrals with stationary points." Journal of Computational Science 26 (May 2018): 22–27. http://dx.doi.org/10.1016/j.jocs.2018.03.001.

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37

Davey, K. R. "Field optimization using the calculus of stationary points." IEEE Transactions on Magnetics 35, no. 3 (1999): 1718–21. http://dx.doi.org/10.1109/20.767359.

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38

Schäffler, Stefan. "Classification of Critical Stationary Points in Unconstrained Optimization." SIAM Journal on Optimization 2, no. 1 (1992): 1–6. http://dx.doi.org/10.1137/0802001.

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39

Wales, David J., and Jonathan P. K. Doye. "Stationary points and dynamics in high-dimensional systems." Journal of Chemical Physics 119, no. 23 (2003): 12409–16. http://dx.doi.org/10.1063/1.1625644.

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40

Hara, Tamio. "Oriented {$Z\sb 4$} actions without stationary points." Publications of the Research Institute for Mathematical Sciences 30, no. 2 (1994): 233–48. http://dx.doi.org/10.2977/prims/1195166131.

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41

Uko, L. U. "On the computation of linearly constrained stationary points." Journal of Optimization Theory and Applications 81, no. 2 (1994): 407–20. http://dx.doi.org/10.1007/bf02191672.

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42

dos Santos Leite, Jefferson Cruz, João de Deus Mendes da Silva, Moiseis dos Santos Cecconello, and Rodney Carlos Bassanezi. "Stationary points: two-dimensional p-fuzzy dynamical systems." Computational and Applied Mathematics 37, no. 5 (2018): 6448–82. http://dx.doi.org/10.1007/s40314-018-0701-8.

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43

Červinka, Michal, Jiří V. Outrata, and Miroslav Pištěk. "On Stability of M-stationary Points in MPCCs." Set-Valued and Variational Analysis 22, no. 3 (2014): 575–95. http://dx.doi.org/10.1007/s11228-014-0278-3.

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44

Olikier, Guillaume, and Irène Waldspurger. "Projected Gradient Descent Accumulates at Bouligand Stationary Points." SIAM Journal on Optimization 35, no. 2 (2025): 1004–29. https://doi.org/10.1137/24m1692782.

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45

Liu, Zeqing, and Shin Min Kang. "Common stationary points of multivalued mappings on bounded metric spaces." International Journal of Mathematics and Mathematical Sciences 24, no. 11 (2000): 773–79. http://dx.doi.org/10.1155/s0161171200004427.

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Necessary and sufficient conditions for the existence of common stationary points of two multivalued mappings and common stationary point theorems for multivalued mappings on bounded metric spaces are given. Our results extend the theorems due to Fisher in 1979, 1980, and 1983 and Ohta and Nikaido in 1994.
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46

Baidya, Ranjai, and Sang-Woong Lee. "Addressing the Non-Stationarity and Complexity of Time Series Data for Long-Term Forecasts." Applied Sciences 14, no. 11 (2024): 4436. http://dx.doi.org/10.3390/app14114436.

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Real-life time series datasets exhibit complications that hinder the study of time series forecasting (TSF). These datasets inherently exhibit non-stationarity as their distributions vary over time. Furthermore, the intricate inter- and intra-series relationships among data points pose challenges for modeling. Many existing TSF models overlook one or both of these issues, resulting in inaccurate forecasts. This study proposes a novel TSF model designed to address the challenges posed by real-life data, delivering accurate forecasts in both multivariate and univariate settings. First, we propos
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47

A. Ansari, Abdullah, Ashraf Ali, Kumari Shalini, and Mehtab Alam. "Heterogeneous primaries in CR4BP." International Journal of Advanced Astronomy 7, no. 2 (2019): 49. http://dx.doi.org/10.14419/ijaa.v7i2.29648.

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This paper investigates the motion of the massless body moving under the influence of the gravitational forces of the three equal heterogeneous oblate spheroids placed at Lagrangian configuration. After determining the equations of motion and the Jacobian constant of the massless body, we have illustrated the numerical work (Stationary points, zero-velocity curves, regions of motion, Poincare surfaces of section and basins of attraction). And then we have checked the linear stability of the stationary points and found that all the stationary points are unstable.
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48

Le Boudec, Jean-Yves. "The stationary behaviour of fluid limits of reversible processes is concentrated on stationary points." Networks & Heterogeneous Media 8, no. 2 (2013): 529–40. http://dx.doi.org/10.3934/nhm.2013.8.529.

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49

Siddiqui, A. M., Ahsan Walait, T. Haroon, and Hameed Ashraf. "On the study of stationary points and uniform thickness of PTT fluid film on a vertically upward moving belt." Canadian Journal of Physics 94, no. 10 (2016): 982–91. http://dx.doi.org/10.1139/cjp-2014-0591.

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This paper investigates the thin film flow of Phan-Thien Tanner (PTT) fluid on a vertically moving belt. Three different models, namely, the upper convected Maxwell model (UCM), linear version of Phan-Thien Tanner model (LPTT), and exponential version of Phan-Thien Tanner model (EPTT), are taken into consideration. Exact expressions for velocity profiles, flow rates, average velocities, film thicknesses, shear stresses, and normal stresses are obtained. Special consideration is given to the predictions of stationary points in withdrawal of these fluids from the belt. It is observed that the st
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50

Hansen, Bradley M. S., and Smadar Naoz. "The stationary points of the hierarchical three-body problem." Monthly Notices of the Royal Astronomical Society 499, no. 2 (2020): 1682–700. http://dx.doi.org/10.1093/mnras/staa2602.

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ABSTRACT We study the stationary points of the hierarchical three body problem in the planetary limit (m1, m2 ≪ m0) at both the quadrupole and octupole orders. We demonstrate that the extension to octupole order preserves the principal stationary points of the quadrupole solution in the limit of small outer eccentricity e2 but that new families of stable fixed points occur in both prograde and retrograde cases. The most important new equilibria are those that branch off from the quadrupolar solutions and extend to large e2. The apsidal alignment of these families is a function of mass and inne
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