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Management & Gramothan, Jaipur

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Research Publication

 

  1. Kumawat, P. (2020). Some Bianchi type IX dust fluid tilted cosmological models with bulk viscosity in general relativity. Journal of Rajasthan academy of physical sciences, 19 (Jan. -June), 1-12.
  2. Srivastava,A, Mukherjee, R. & Singhal, V.K. (2020) 8. Certain properties of generalized Mittag – Leffler function. GIS Science journal. 7(7), 608-613.
  3. Jain, D., & Bhargava, A. (2020) On Certain Fractional Kinetic Equations involving Laguerre Polynomials, Advances in Mathematics: Scientific Journal, 9(9), 7075–7084.
  4. Saxena, A., Sharma, A., & Shekhawat, S. (2020). Parameter extraction of solar cell using intelligent grey wolf optimizer, Evolutionary Intelligence, 1-17.
  5. Shukla, A., Shekhawat, S., & Modi, K. (2020). Generalized Fractional Calculus Operators Involving Multivariable Aleph Function. International Journal of Mathematics Trends and Technology, 66 (9), 132-138.
  6. Saxena, A., Shekhawat, S., Sharma, A., Sharma, H., & Kumar, R. (2020). Chaotic step length artificial bee colony algorithms for protein structure prediction. Journal of Interdisciplinary Mathematics23(2), 617-629.
  7. Shekhawat, S., & Saxena, A. (2020). Development and applications of an intelligent crow search algorithm based on opposition-based learning. ISA transactions99, 210-230.
  8. Gupta, S., Singh, J.,& Kumar, D.,  (2020), Analytical study for MHD flow of Williamson nanofluid with the effects of variable thickness, nonlinear thermal radiation and improved Fourier’s and Fick’s Laws, SN Applied Sciences, 2 (2), 1-12.
  9. Choudhary, S. (2020). On Some Image Formulas for Generalized Lommel Wright Function Involving A General Class of Polynomials. Electronic Journal of Mathematical Analysis and Applications, 8(2), 128-139.
  10. Singhal, V. K. (2019). Large Deflection of A Circular Plate and H {bar}-Function. SKIT Research Journal ,9 (2), 102-104.
  11. Choudhary, S. (2019). On Certain Fractional Calculus Results Involving Srivastava Polynomial and Generalized Struve Function. IJRAR, 6(1).
  12. Singh, J., Kumar, D., & Gupta, S. (2019), An efficient analytical technique for fractional partial differential equations occurring in ion acoustic waves in plasma, Journal of Ocean Engineering and Science, 4 (2), 85-99.
  13. Gupta, S., Singh, J., & Kumar, D., (2019), Magnetohydrodynamic three-dimensional boundary layer flow and heat transfer of water-driven copper and alumina nanoparticles induced by convective conditions, International journal of Modern physics B, 33,
  14. Gupta, S., Singh, J., & Kumar, D., & Gupta, S., (2019). Impact of generalized Fourier’s law and Fick’s law for MHD flow of Ag‒H2O and TiO2‒H2O nanomaterials, Multidiscipline modelling in Materials and structures, 15, 1075-1099.
  15. Singhal, V. K. (2019). Large Deflection of A Circular Plate and H {bar}-Function. SKIT Research Journal ,9 (2), 102-104.
  16. Choudhary, S. (2018). A modified homotopy analysis method to solve fractional telegraph equation. SKIT Research Journal, 8(1).
  17. Shekhawat, S., & Bhatter, S. (2018). A Study of Unified Integrals Involving the Generalized Legendre's Associated Function, the generalized Polynomial Set and H-Function with Applications, SKIT Research Journal, 8(1), 62-70.
  18. Saxena, A., Shekhawat, S., & Kumar, R. (2018). Application and development of enhanced chaotic grasshopper optimization algorithms. Modelling and Simulation in Engineering2018 Article ID 4945157, 14 pages https://doi.org/10.1155/2018/4945157.
  19. Sharma, K., & Gupta, S., (2018). Radiation effects on MHD boundary layer flow and heat transfer along a stretching cylinder with variable thermal conductivity in a porous medium, Journal of Porous Media, 21(3) 763-779.
  20. Singh, J., Kumar, D., & Gupta, S. (2018). MHD mixed convective stagnation point flow and heat transfer of an incompressible nanofluid over an inclined stretching sheet with chemical reaction and radiation, International Journal of Heat and Mass Transfer, 118 (3), 378-387.
  21. Gupta, S., & Gupta, S., (2018). MHD three-dimensional flow of Oldroyd-B nanofluid over a bidirectional stretching sheet: DTM-Padé Solution, Nonlinear Engineering, 8 (1), 744-754.
  22. Singhal, V. K. (2018) 7. Generalized Fractional Integral Formulas Associated with the Srivastava -Tomovski Mittag-Leffler Function and the Srivastava Polynomials. Journal of Fractional Calculus and Applications. 9 (2), 49-55.
  23. Bhargava, A., Srivastava, A., & Mukherjee, R. (2017). On Generalized Fractional Integration of Aleph (ℵ) function. International Journal of Applied and Computational Mathematics, 3(1), 233-241.
  24. Bhargava, A., Srivastava, A., & Mukherjee, R. (2017). On a mathematical model involving I-function for studying the effect of environmental pollution. Proceedings of the National Academy of Sciences, India Section A: Physical Sciences, 87(1), 19-21.
  25. Sharma, S. C. & Vijay, V. (2017). Replenishment Policy for Deteriorating Inventory System with Power Demand and Backlogging. JNANABHA, 47(1), 7-16.
  26. Jangid, N. K. (2017). On Sequence of Functions Involving I-Function. An International
  27. Journal of Engineering, Science, Humanities and Management, 7(2), 75-78.
  28. Saxena, A., & Shekhawat, S. (2017). Ambient air quality classification by grey wolf optimizer-based support vector machine. Journal of environmental and public health2017.
  29. Sharma, K., & Gupta, S., (2017). Viscous Dissipation and Thermal Radiation effects in MHD flow of Jeffrey Nanofluid through Impermeable Surface with Heat Generation/ Absorption, Nonlinear Engineering, 6 (2), 153-166.
  30. Sharma, K., & Gupta, S., (2017), Mixed Convective MHD Flow and Heat Transfer of Uniformly Conducting Nanofluid past an Inclined Cylinder in Presence of Thermal Radiation, Journal of Nanofluids, Vol.6 (6), 1031-1045.
  31. Sharma, K., & Gupta, S., (2017), Numerical simulation for magnetohydrodynamic three-dimensional flow of Casson nanofluid with convective boundary conditions and thermal radiation, Engineering Computations, 34 (5), 2698-2722.
  32. Gupta, S., & Singhal, V. K. (2016). ADMP: A Maple Programming Language for Symbolic Computation to Nonlinear Quadratic Riccati Differential Equation. SKIT Research Journal ,6 (2), 75-78.
  33. Singhal, V. K., & Mukherjee, R. (2016) 12. On Certain Integral Transforms Involving Hypergeometric Functions and Struve Function. Kyungpook Mathematical Journal56(4), 1169-1177.
  34. Singhal, V. K. (2016). Multiple WEK Fractional Integral of H-Function Pertaining to Srivastava Polynomials. SKIT Research Journal, 6 (1), 68-70.
  35. Sharma, K., & Gupta, S., (2016), Analytical Study of MHD Boundary Layer Flow and Heat Transfer towards a Porous Exponentially Stretching Sheet in Presence of Thermal Radiation, International Journal of Applied Mathematics and Mechanics, 4 (2), 1-13.
  36. Sharma, K., & Gupta, S., (2016), Homotopy analysis solution to thermal radiation effects on MHD boundary layer flow and heat transfer towards an inclined plate with convective boundary conditions, International Journal of Applied and Computational Mathematics, 6 (2), 1-20.
  37. Saxena A., Saini, D., Shekhawat, S. (2016). Neural Network Design by Taguchi Method, SKIT Research Journal, 6 (2), 132-135.
  38. Gupta, V. G., & Jangid, N. K. (2016). An Exponential Fourier Series for I-Function of Several Complex Variables. International Journal of Science and Research (IJSR).5(2),251-253.
  39. Bhargava, A., Srivastava, A., & Mukherjee, R. (2016). Some Finite Integrals Involving Srivastava's Polynomials and the Aleph Function. Kyungpook Mathematical Journal, 56(2), 465-471.
  40. Sharma, S. C. & Vijay, V. (2016). An Inventory Model for Perishable Items with Inventory Dependent Demand Rate, Backlogging and Shortages in A Cycle Time. Proceedings of 65th IRF International Conference, 60-63.
  41. Sharma, S. C. & Vijay, V. (2016, 8). Optimum Order Quantity for Deteriorating Items in Largest Lifetime with Permissible Delay Period. International Journal of Mathematics and Computer Applications Research, 6(4), 33-40.
  42. Bhargava, A., Srivastava, A., & Mukherjee, R. (2015). On generalized fractional integration of I-function.  J. Appl. Math. Ecol. Econ, 3(2), 51-59.
  43. Bhargava, A., Srivastava, A., & Mukherjee, R. (2015). On N-Fractional Calculus Pertaining to I-Function. International Bulletin of Mathematical Research, 2(1), 87-92.
  44. Bhargava, A., Srivastava, A., & Mukherjee, R. (2015). Some Integrals involving, I-function and Wright’s Generalized Hypergeometric Function. Caspian Journal of Applied Mathematics, Ecology & Economics, 3(1), 3-11.
  45. Sharma, S. C. & Vijay, V. (2015) Costing for an EOQ Model for Deteriorating Items with Stock Dependent Demand Rate. Journal of Indian Academy of Mathematics, 37(2), 189-199.
  46. Sharma, S. C. & Vijay, V. (2015, 1). An EOQ Model for Deteriorating Items with Price Dependent Demand, Varying Holding Cost and Shortages under Trade Credit. International Journal of Science and Research, 4(1), 1440-1446.
  47. Bali, R., & Kumawat, P. (2015). R. S. Bianchi type II tilted bulk viscous fluid model in general relativity. The journal of physics Photon (USA), Vol 110, 220-227. 
  48. Bali, R., & Kumawat, P. (2015). R. S. Bianchi type II tilted barotropic fluid cosmological model with heat conduction in general relativity. Gravitational and Cosmology, Vol 21 No 1, 76-81. 
  49. Gupta, V. G., & Jangid, N. K. (2015). Integrals Involving the Product of the Multivariable I-function, General Sequence of Functions, and a General Class of Polynomials. International Journal of Mathematics and Computer Applications Research (IJMCAR), 5(5), 49-56.
  50. Gupta, V. G., & Jangid, N. K. (2015). On Certain Unified Fractional Derivatives Pertaining to Product of -Function and Generalized Multivariable Polynomials. Jñānābha, 45, 199-208.
  51. Singh, J., Kumar, D., & Gupta, S. (2015), Numerical study for systems of fractional differential equations via Laplace transform, Journal of Egyptian Mathematical society, 23 (2), 256-262.
  52. Singh, J., Kumar, D., & Gupta, S. (2015), Analytical Solution of convection-diffusion problems by combining by Laplace Transform method and Homotopy Perturbation method, Alexandria Engineering Journal, 54 (1), 645-651.
  53. Singhal, V. K. (2015). Fractional Calculus Operator Associated with Wright's Function. SKIT Research Journal, 5 (1), 79-81.
  54. Singhal, V. K. (2015). Saigo fractional integral associated with wright’s function. Acta Ciencia Indica, 49 (1), 61-66.
  55. Singhal, V. K. (2015). Applications of The Fractional Calculus Pertaining to Multivariable H-Function. SKIT Research Journal, 5 (2), 73-75.
  56. Singhal, V. K. (2014). Generalized Fractional Integral Associated with H-function. International Journal of Computational Science and Mathematics, 6 (1), 21-28.
  57. Jangid, N. K. (2014). Double Inequalities for the I-function. An International Journal of Engineering, Science, Humanities and Management, 4(2), 95-97.
  58. Garg Harshita, & Jangid, N. K. (2014). A Study of Composition Formula for Unified Fractional Integral Operators Involving the -Function as Kernel. ISST Journal of Mathematics & Computing system, 5(1), 1-6.
  59. Gupta, V. G., & Jangid, N. K. (2014). A Unified Approach to Fractional Calculus Pertaining to Aleph ()-Functions, International Journal of Mathematics and Computer Applications Research (IJMCAR), 4(4), 21-32.
  60. Gupta, V. G., & Jangid, N. K. (2014). On Certain Inequalities Pertaining to I-function. International Journal of Science and Research (IJSR), 3(12), 1-7.
  61. Bhargava, A., Srivastava, A., & Mukherjee, R. (2014). Integrals Pertaining To I-Functions. International Journal of Applied Mathematics and Statistical Sciences, 3(1), 1-8.
  62. Bhargava, A., Srivastava, A., & Mukherjee, R. (2014). On a General Class of Multiple Eulerian Integrals. IJLTEMAS, 3(8), 57-64.
  63. Srivastava, A., Mukherjee, R., & Bhargava, A. (2014). A Unified Approach to Fractional Calculus Pertaining To I-Functions. International Journal of Mathematics and Computer Applications Research, 4(1), 31-42.
  64. Vijay, V. (2014, 10). Inventory Model for deteriorating Items with Inventory dependent demand Rate and Shortages. SKIT, Research Journal, 4(2), 91-94.
  65. Gupta, V. G., & Jangid, N. K. (2013). Some New Properties of Generalized Polynomials and -Function Associated with Feynman Integrals. Global Journal of Science Frontier Research: F Mathematics and Decision Sciences, 13(2), Version 1.0, 54-63.
  66. Gupta, V. G., & Jangid, N. K. (2013). Some New Properties of Generalized Hypergeometric Functions of One Variable Associated with Feynman Integrals, International Journal of Mathematical Archive 4(3), 155-163.
  67. Gupta, V. G., & Jangid, N. K. (2013). Some Results on Homogeneous Generalized Hypergeometric Function and-Function, Jñānābha, 43, 97-106.
  68. Choudhary, S. (2013). On solution of fractional free electron laser equation. SKIT Research Journal, 3.
  69. Garg, M. and Choudhary, S. (2013). Solution of space-time fractional Fokker-Planck equation by Homotopy analysis method. Aryabhatta Journal of Mathematics & Informatics, 5(2).
  70. Gupta V.G., & Gupta S. (2013), Homotopy perturbation transform method for solving nonlinear wave-like equation with variable coefficients, Journal of Information and Computing, 8(3), 163-172.
  71. Gupta V.G., & Gupta S. (2013), Analytical solution of singular fourth order parabolic partial differential equations of variable coefficients by using homotopy perturbation transform method, Journal of Applied Mathematics, and informatics, 33 (1), 165 - 177.
  72. Singh, J., Kumar, D., & Gupta, S. (2013), Applications of He’s homotopy perturbation method for solving nonlinear wave like equations of variable coefficients, International Journal of Applied Mathematics and Mechanics, 1 (1) 65-79.
  73. Kumawat, P. (2012). L. S. Bianchi Type V Cosmological Model with Heat Conduction in General Relativity. Proc. Computatia, pp 81-85.
  74. Kumawat,P.(2012). LRS Bianchi type II tilted stiff fluid cosmological model with heat conduction in general relativity. SKIT Research Journal,2,175-177.
  75. Gupta, V. G., & Jangid, N. K. (2012). Some Integrals Involving Generalized Polynomial and the Generalized H-functions. International Journal of Mathematical Archive-3(12), 4972-4979.
  76. Gupta V.G., & Gupta S. (2012), Application of homotopy perturbation transform method to linear and non-linear space-time fractional reaction-diffusion equations, The Journal of Mathematics and Computer Science, 5(1), 40-52.
  77. Singh, J., Kumar, D., Sushila and Gupta, S. (2012), Homotopy Analysis Sumudu Transform Method for Nonlinear Equations", International Journal of Industrial Mathematics 4(4),1- 13.
  78. Gupta V.G., & Gupta S. (2012), Application of homotopy analysis method for solving nonlinear Cauchy problem”, Surveys in Mathematics and Its Applications 7(1) 105 – 116.
  79. Gupta V.G., & Gupta S. (2012), Application of homotopy analysis transform method for solving various nonlinear partial differential equations, World Applied Science Journal 18, 1839-1846.
  80. Mukherjee, R., & Srivastava, A. (2011). Uniformly Starlike and Uniformly Convexity Properties Pertaining to Certain Special Functions. Global Journal of Science Frontier Research, 11(7), 25-32.
  81. Chaurasia, V. B. L., & Srivastava, A. (2011). A Class of Convolution Integral Equations and Special Functions. Global Journal of Science Frontier Research, 11(7), 33-40.
  82. Bali, R., Kumawat, P., & Sharma, S. (2011). Bianchi Type V Cosmological Model with Heat Conduction in General Relativity. J. of Physical Sciences Ultra Scientist, Vol 23 (1) M, 67-70. 
  83. Bali, R., Kumawat, P., & Sharma, S. (2011). Tilted Bianchi Type V Barotropic fluid Cosmological Model with Variable Bulk Viscosity in General Relativity. International Journal of Modern Physics A, Vol 26 No 24, 4299-4310.
  84. Choudhary, S. (2011). Homotopy analysis method for solving space fractional telegraph equation, SKIT Research Journal, Vol 1, Maiden issue.
  85. Garg, M., Choudhary, S. & Purohit M. (2011). On Mittag-Leffler type generalization of double zeta function. Journal of Raj. Acad. of Phy. Sci., 10(3), 255-268.
  86. Srivastava, H. M., Garg, M., & Choudhary, S. (2011). Some new families of generalized Euler and Genocchi polynomials. Taiwanese Journal of Mathematics, 15(1), 283-305. DOI: 11650/twjm/1500406175
  87. Shekhawat, S. (2011). Certain Triple Integral Relations Involving Multivariable H-function, SKIT Research Journal, Vol. 6 (2), 28-33.
  88. BHATTER, S. & SHEKHAWAT, S. (2011). A Study of generalized fractional derivative operator involving Multivariable H-function and general class of Multivariable Polynomials. Journal of the applied Mathematics, Statistics and Informatics (JAMSI)7, 1-15.
  89. Bhatter, S., & Shekhawat, S. (2010). Multidimensional fractional integral operators involving general class of polynomial and H function. Global J. Sci. Frontier research10, 50-56.
  90. Bhatter, S., & Shekhawat, S. (2010) The General Eulerian Integral, Journal of Math. Analysis, Vol. 4, 393-402.
  91. Srivastava, H.M., Garg, M. & Choudhary, S. (2010). A new generalization of the Bernoulli and related polynomials. Russian Journal of Mathematical Physics,17, 251–261. https://doi.org/10.1134/S1061920810020093.
  92. Bali, R. & Kumawat, P. (2010). Bianchi Type I Tilted Cosmological Model for Barotropic Perfect Fluid Distribution with Heat Conduction in General Relativity. Brajilian Journal of Phy., Vol .40 No 3, 261-266.
  93. Bali, R., Kumawat, P., & Sharma, S. (2010). Bianchi Type I Stiff Fluid Tilted Cosmological Model with Bulk Viscosity in General Relativity. Fizika-B, Vol 19, 91-102.

 

  1. Bali, R., & Kumawat, P. (2010). Some Bianchi Type IX Stiff Fluid Tilted Cosmological Model with bulk Viscosity in General Relativity. Electronic Journal of Theoretical Physics, Vol 7 No 24, 1-12.
  2. Chaurasia, V. B. L., & Srivastava, A. (2010). Application of Fractional Derivative Operator in the Derivation of Bilateral Expansions Concerning Certain Special Functions. Ganita Sandesh, 24(1), 87-94.
  3. Vijay V., Sharma A. K., Aggarwal, N. K. & Sharma, R. (2009, 6). Optimum Ordering Interval with Selling Price Dependent Demand Rate for Items with Random Deterioration and Shortages. International Transactions in Mathematical Sciences and Computer, 2(1), 47-59.
  4. Bali, R., & Kumawat, P. (2009). Bianchi Type I Bulk Viscous Fluid Tilted Cosmological Model Filled with Disordered Radiation and Heat Conduction. Fizika –B, Vol 18,19-34.
  5. Garg, M., Choudhary, S., & Nadarajah, S. (2009). On the product of triangular random variables. Applicationes Mathematicae, 36, 419-439.
  6. Garg, M., Choudhary, S., & Kalla, S. L. (2009). On the sum of two triangular random variables. International journal of optimization: theory, methods and applications, 1(3), 279-290.
  7. Bali, R. & Kumawat, P. (2009). Bianchi Type IX Tilted Cosmological Model for Barotropic Perfect Fluid Distribution with Heat Conduction in General Relativity. Nat. Acad. of Sci, India, sect. A, Vol 79 pt II, 215-219.
  8. Jain, R., Bhatter, S., & Shekhawat, S. (2009). Fourier Series for Generalized Mellin Barnes Type Contour Integrals with Applications, Acta Mathematica Cinieca, XXXV M, 3 1033.
  9. Bhatter, S., & Shekhawat, S. (2009). Certain Multiplication Formulae for Multivariable H-Function, Raj. Acad. Phy. Sci., Vol.8, No. 2, (2009) 211-218.
  10. Gupta, K. C., Bhatter, S. & Shekhawat, S. (2009). On A Basic Integral Involving the H-Function of Two Variables, Raj. Acad. Phy. Sci., Vol.8 (4), 485-488.
  11. Chaurasia, V. B. L., & Srivastava, A. (2008). Large Deflection of a circular Plate Under Non-Uniform Load Involving Certain Special Functions. Acta Ciencia Indica, 34(2), 595-602
  12. Chaurasia, V. B. L., & Srivastava, A. (2008). Uniformly starlike and uniformly convex functions pertaining to special functions.  Ineq. Pure Appl. Math, 9(1), 1-6.
  13. Bali, R., & Kumawat, P. (2008). Bulk Viscous L. R. S. Bianchi Type V Tilted Stiff Fluid Cosmological Model In general Relativity. Lett. B, Vol 665 pp 332-337.
  14. Bali, R. & Kumawat, P. (2008). Bianchi Type I magnetized tilied imperfect barotropic fluid cosmological model in general relativity. Gravitation and cosmology, Vol 14 (4), 347-354.
  15. Gupta, V. G., & Jangid, N. K. (2008). The Integration of Certain Products Involving H-Function with General Polynomials and Integral Function of Two Complex Variables. Jñānābha, 38, 125-134.
  16. Rao A., Singhvi N. & Choudhary S. (2008). Fractional extension of the lauwerier formulation of the temperature field problem in oil strata, Ganita sandesh, 22, 803-815.
  17. Chaurasia, V. B. L., & Srivastava, A. (April 2007). A unified approach to fractional calculus pertaining to H-functions. Soochow Journal of Mathematics, 33(2), 211-221.
  18. Chaurasia, V. B. L., & Srivastava, A. (2006). Two-dimensional generalized Weyl fractional calculus pertaining to two-dimensional H-transforms. Tamkang Journal of Mathematics, 37(3), 237-249.
  19. Mukherjee, R. & Goyal, S. P. (2004). A class of convolution integral equations involving product of generalized polynomial set, general class of polynomials and Fox's H-function, Bulletin of Calcutta Mathematical Society, 96(4), 265-272.
  20. Mukherjee, R. & Goyal, S. P. (2004). A multiple integral involving general class of polynomials generalized polynomial set. Konhauser biorthogonal polynomials and the multivariable H-function with applications. Jñānābha, 47 (3), 1-10.
  21. Mukherjee, R. & Goyal, S. P. (2004). On the Laplace transform and the generalized Weyl fractional integral operator involving the H-function, KYUNGPOOK Mathematical Journal, 44, 481-493.
  22. Chaurasia, V. B. L., & Srivastava, A. (2002). The integration of certain products pertaining to the H-function with general polynomials. JNANABHA, 31/32, 51-57.
  23. Mukherjee, R. (2002). Integrals involving Fox's H-function, Acta Ciencia Indica, 28 (1), 1-4.
  24. Mukherjee, R. & Goyal, S. P. (2002). Inversion of an integral involving a product of general class of polynomials generalized set and Fox's H-function as kernel, Journal of Rajasthan Academy of Physical Sciences, 1(3), 189-198.
  25. Mukherjee, R., Gupta, K.C., & Goyal, S. P. (2002). Some results on generalized Voigt functions. ANZIAM, 44, 299-303.
  26. Mukherjee, R. & Goyal, S. P. (1999). Generalization of the Voigt functions through generalized Lauricella function, Ganita Sandesh, 13 (1), 31- 41.
  27. Mukherjee, R. & Goyal, S. P. (1999). On partly bilateral and partly unilateral representation for the generalized Voigt functions, Ganita Sandesh, 13 (2), 33-42.

 

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