Relevant bibliographies by topics / Quaziregular degenerate differential equation

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  1. Journal articles
  2. Dissertations / Theses
  3. Books
  4. Book chapters
  5. Conference papers
  6. Reports

Academic literature on the topic 'Quaziregular degenerate differential equation'

Author: Grafiati
Published: 4 June 2021
Last updated: 15 February 2022

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Journal articles on the topic "Quaziregular degenerate differential equation"

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Bass, Richard F., Krzysztof Burdzy, and Zhen-Qing Chen. "Pathwise uniqueness for a degenerate stochastic differential equation." Annals of Probability 35, no. 6 (2007): 2385–418. http://dx.doi.org/10.1214/009117907000000033.

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Cao, Hai Tao, and Xing Ye Yue. "Homogenization of a nonlinear degenerate parabolic differential equation." Acta Mathematica Sinica, English Series 29, no. 7 (2013): 1429–36. http://dx.doi.org/10.1007/s10114-013-2133-0.

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Pyo, Sung-Soo, Taekyun Kim, and Seog-Hoon Rim. "Degenerate Daehee Numbers of the Third Kind." Mathematics 6, no. 11 (2018): 239. http://dx.doi.org/10.3390/math6110239.

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In this paper, we define new Daehee numbers, the degenerate Daehee numbers of the third kind, using the degenerate log function as generating function. We obtain some identities for the degenerate Daehee numbers of the third kind associated with the Daehee, degenerate Daehee, and degenerate Daehee numbers of the second kind. In addition, we derive a differential equation associated with the degenerate log function. We deduce some identities from the differential equation.
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Wong, M. W. "Weyl transforms and a degenerate elliptic partial differential equation." Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences 461, no. 2064 (2005): 3863–70. http://dx.doi.org/10.1098/rspa.2005.1560.

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We give a formula for the inverse of a degenerate elliptic partial differential operator P on related to the Heisenberg group. The formula is in terms of pseudo-differential operators of the Weyl type, i.e. Weyl transforms. The technique is to use the Fourier–Wigner transforms of Hermite functions, which form an orthonormal basis for . Using the formula for the inverse, we give an estimate for the L p norm of the solution u of the partial differential equation Pu = f on in terms of the L 2 norm of f , 2≤ p ≤∞.
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Akhtyamov, A. M. "Degenerate Boundary Conditions for a Third-Order Differential Equation." Differential Equations 54, no. 4 (2018): 419–26. http://dx.doi.org/10.1134/s0012266118040018.

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Macionis, J. "Solvability of a degenerate differential equation with spectral parameter." Lithuanian Mathematical Journal 25, no. 2 (1986): 162–65. http://dx.doi.org/10.1007/bf00966182.

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Rutkas, A. G., and I. G. Khudoshin. "Global solvability of one degenerate semilinear differential operator equation." Nonlinear Oscillations 7, no. 3 (2004): 403–17. http://dx.doi.org/10.1007/s11072-005-0020-z.

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Bandaliyev, R. A., I. G. Mamedov, A. B. Abdullayeva, and K. H. Safarova. "Optimal Control Problem for a Degenerate Fractional Differential Equation." Lobachevskii Journal of Mathematics 42, no. 6 (2021): 1239–47. http://dx.doi.org/10.1134/s1995080221060056.

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Amar, Micol, Daniele Andreucci, Roberto Gianni, and Claudia Timofte. "A degenerate pseudo-parabolic equation with memory." Communications in Applied and Industrial Mathematics 10, no. 1 (2019): 71–77. http://dx.doi.org/10.2478/caim-2019-0013.

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Abstract We prove the existence and uniqueness for a degenerate pseudo-parabolic problem with memory. This kind of problem arises in the study of the homogenization of some differential systems involving the Laplace-Beltrami operator and describes the effective behaviour of the electrical conduction in some composite materials.
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Tepoyan, L. P. "DEGENERATE FIRST ORDER DIFFERENTIAL-OPERATOR EQUATIONS." Proceedings of the YSU A: Physical and Mathematical Sciences 53, no. 3 (250) (2019): 163–69. http://dx.doi.org/10.46991/pysu:a/2019.53.3.163.

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We consider boundary value problem for degenerate first order differentialoperator equation $Lu \mathclose{\equiv} t^{\alpha} u^{\prime} \mathclose{-} P u \mathclose{=} f $, $ u(0) \mathclose{-} \mu u(b) \mathclose{=} 0 $, where $ t \mathclose{\in} (0,b) $, $ a \mathclose{\geq} 0 $, $ P: H \mathclose{\rightarrow} H $ is linear operator in separable Hilbert space $ H $, $ f \mathclose{\in} L_{2, \beta} ((0,b),H) $, $ \mu \mathclose{\in} \mathbb{C} $. We prove that under some conditions on the operator $ P $ and number $ \mu $ the boundary value problem has unique generalized solution $ u \mathc
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Dissertations / Theses on the topic "Quaziregular degenerate differential equation"

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Čakaitė, Inga. "Dalinių išvestinių sistemos su kvazireguliariuoju išsigimimu sprendimas." Master's thesis, Lithuanian Academic Libraries Network (LABT), 2006. http://vddb.library.lt/obj/LT-eLABa-0001:E.02~2006~D_20060609_122917-49917.

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The system of the four partial fluxions of the primary row of differential equations the row of which dwindles at the points of plane has been analysed. The systems of the expressions of families of the detached solutions have been derived by converging degree rows at the environment of malformation rows through the technique of summation of degree rows. The solutions at the malformation points are particular for having degree particularities. Still, the particularities depend on the other to variables, in conformity to which there are no system malformation weigh. The effect is not evident in
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Boiger, Wolfgang Josef. "Stabilised finite element approximation for degenerate convex minimisation problems." Doctoral thesis, Humboldt-Universität zu Berlin, Mathematisch-Naturwissenschaftliche Fakultät II, 2013. http://dx.doi.org/10.18452/16790.

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Infimalfolgen nichtkonvexer Variationsprobleme haben aufgrund feiner Oszillationen häufig keinen starken Grenzwert in Sobolevräumen. Diese Oszillationen haben eine physikalische Bedeutung; Finite-Element-Approximationen können sie jedoch im Allgemeinen nicht auflösen. Relaxationsmethoden ersetzen die nichtkonvexe Energie durch ihre (semi)konvexe Hülle. Das entstehende makroskopische Modell ist degeneriert: es ist nicht strikt konvex und hat eventuell mehrere Minimalstellen. Die fehlende Kontrolle der primalen Variablen führt zu Schwierigkeiten bei der a priori und a posteriori Fehlerschätz
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Books on the topic "Quaziregular degenerate differential equation"

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Degenerate Nonlinear Diffusion Equations. Springer, 2012.

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Book chapters on the topic "Quaziregular degenerate differential equation"

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Arrieta, José M., Rosa Pardo, and Aníbal Rodríguez-Bernal. "A Degenerate Parabolic Logistic Equation." In Advances in Differential Equations and Applications. Springer International Publishing, 2014. http://dx.doi.org/10.1007/978-3-319-06953-1_1.

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Rodrigues, José Francisco, and Hugo Tavares. "Increasing Powers in a Degenerate Parabolic Logistic Equation." In Partial Differential Equations: Theory, Control and Approximation. Springer Berlin Heidelberg, 2014. http://dx.doi.org/10.1007/978-3-642-41401-5_15.

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Nirenberg, Louis. "Uniqueness in the Cauchy Problem for a Degenerate Elliptic Second Order Equation." In Differential Geometry and Complex Analysis. Springer Berlin Heidelberg, 1985. http://dx.doi.org/10.1007/978-3-642-69828-6_16.

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Albano, Paolo. "Some Remarks on the Dirichlet Problem for the Degenerate Eikonal Equation." In Trends in Control Theory and Partial Differential Equations. Springer International Publishing, 2019. http://dx.doi.org/10.1007/978-3-030-17949-6_1.

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Khapalov, Alexander Y. "Controllability of the Semilinear Reaction–Diffusion Equation with a Degenerate Actuator." In Mobile Point Sensors and Actuators in the Controllability Theory of Partial Differential Equations. Springer International Publishing, 2017. http://dx.doi.org/10.1007/978-3-319-60414-5_6.

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Khapalov, Alexander Y. "Controllability of the Semilinear Heat Equation with a Sublinear Term and a Degenerate Actuator." In Mobile Point Sensors and Actuators in the Controllability Theory of Partial Differential Equations. Springer International Publishing, 2017. http://dx.doi.org/10.1007/978-3-319-60414-5_5.

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"Chapter 20. Solving The Beltrami Equation: Degenerate Elliptic Case." In Elliptic Partial Differential Equations and Quasiconformal Mappings in the Plane (PMS-48). Princeton University Press, 2008. http://dx.doi.org/10.1515/9781400830114.527.

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Conference papers on the topic "Quaziregular degenerate differential equation"

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Yuldashev, Tursun K. "On a Volterra type fractional integro-differential equation with degenerate kernel." In INTERNATIONAL UZBEKISTAN-MALAYSIA CONFERENCE ON “COMPUTATIONAL MODELS AND TECHNOLOGIES (CMT2020)”: CMT2020. AIP Publishing, 2021. http://dx.doi.org/10.1063/5.0057135.

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Butuzov, Valentin Fedorovich. "Singularly perturbed ODEs with multiple roots of the degenerate equation." In International Conference "Optimal Control and Differential Games" dedicated to the 110th anniversary of L. S. Pontryagin. Steklov Mathematical Institute, 2018. http://dx.doi.org/10.4213/proc22964.

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Venkataraman, P. "Approximate Analytical Solution for Laminar Flow Over a Backward Step." In ASME 2015 International Design Engineering Technical Conferences and Computers and Information in Engineering Conference. American Society of Mechanical Engineers, 2015. http://dx.doi.org/10.1115/detc2015-46177.

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Analytical solution of Navier-Stokes equations are extremely difficult and rare. It is one of the unsolved Clay Millennium problems in mathematics. Many solutions that exist are examples of degenerate cases where the nonlinearity is controlled. In this paper we explore the application of Bézier functions to solve the two-dimensional laminar fluid flow over a backward step. The Bézier functions provide a mesh free alternative to domain discretization methods that are currently used to solve such problems. The Navier-Stokes equation are handled directly without transformation and the setup is di
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Reports on the topic "Quaziregular degenerate differential equation"

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Fujisaki, Masatoshi. Normed Bellman Equation with Degenerate Diffusion Coefficients and Its Application to Differential Equations. Defense Technical Information Center, 1987. http://dx.doi.org/10.21236/ada190319.

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Journal articles
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