An¯lisis I

1. M.D. Acosta y R. Payá, Numerical radius attaining operators, Extracta Mathematicae 2 (1987), 74-76.

2. M.D. Acosta y R. Payá, Norm attaining and numerical radius attaining operators, Revista Matemática de la Universidad Complutense de Madrid,
Vol. 2, Número suplementario (1989), 19-25.

3.M.D. Acosta y R. Payá, Denseness of operators whose second adjoints attain their numerical radii, Proc. Amer. Math. Soc. 105 (1989), 97-101.

4. M.D. Acosta, CL-spaces and numerical radius attaining operators, Extracta Math. 5 (1990), 138-140.

5. M.D. Acosta, Denseness of numerical radius attaining operators. Renorming and embedding results, Indiana Univ. Math. J. 40 (1991), 903-914.

6. M.D. Acosta, F. Aguirre y R. Payá, A space by W. Gowers and new results on norm and numerical radius attaining operators, Acta Universitatis Carolinae, Math. et Phys. 33 (1992), 5-13.

7. M.D. Acosta, Every real Banach space can be renormed to satisfy the denseness of numerical radius attaining operators, Israel J. Math. 81 (1993), 273-280.

8. M.D. Acosta y R. Payá, Numerical radius attaining operators and the Radon-Nikodym property, Bull. London Math. Soc. 25 (1993), 67-73.

9. M.D. Acosta, An inequality for norm of operators, Extracta Math. 10 (1995), 115-118.

10. M.D. Acosta, F. Aguirre y R. Payá, A new sufficient condition for the denseness of norm attaining operators, Rocky Mountain J. Math. 26 (1996), 407-418.

11. M.D. Acosta, F. Aguirre y R. Payá, There is no bilinear Bishop-Phelps theorem, Israel J. Math. 93 (1996), 221-227.

12. M.D. Acosta y M. Ruiz Galán, New characterizations of the reflexivity in terms of the set of norm attaining functionals, Canad. Math. Bull. 41 (1998), 279-289.

13. M.D. Acosta y M. Ruiz Galán, Norm attaining operators and reflexivity, Rend. Circ. Mat. Palermo (2) 56 (1998), 171-177.

14. M.D. Acosta, On multilinear mappings attaining their norms, Studia Mathematica 131 (1998), 155-165.

15. M.D. Acosta y M. Ruiz Galán, A version of James' Theorem for numerical radius, Bull. London Math. Soc. 31 (1999), 67-74.

16. M.D. Acosta, Denseness of norm attaining operators into strictly convex spaces, Proc. Roy. Soc. Edinburgh Series A 129 (1999), 1107-1114.

17. M.D. Acosta, Norm attaining operators into L_1(mu), Contemp. Math., Vol. 232, Amer. Math Soc., Providence, Rhode Island, 1999, pp. 1-11.

18. M.D. Acosta y M. Ruiz Galán, Reflexive spaces and numerical radius attaining operators, Extracta Math. 15 (2000), 247-255.

19. M.D. Acosta, J. Becerra Guerrero y M. Ruiz Galán, Norm attaining operators and James' Theorem, Recent progress in functional analysis (Valencia, 2000),
Biersted, Bonet, Maestre and Schmets (Eds.), North. Holland Math. Stud., 189, North-Holland, Amsterdam, 2001, pp. 215-224.

20. M.D. Acosta y A. Peralta, An alternative Dunford Pettis property for JB*-triples, Quarterly J. Math. 52 (2001), 391-401.

21. M.D. Acosta, J. Becerra Guerrero y M. Ruiz Galán, Dual spaces generated by the interior of the set of norm attaining functionals, Studia Math. 149 (2002), 175-183.

22. M.D. Acosta y C. Ruiz Bermejo, Norm attaining operators on some classical Banach spaces, Math. Nachr. 235 (2002), 17-27.

23. M.D. Acosta, J. Becerra Guerrero y M. Ruiz Galán, Numerical radius attaining polynomials, Quarterly J. Math. 54 (2003), 1-10.

24. M.D. Acosta, J. Becerra Guerrero y M. Ruiz Galán, Functions attaining the supremum and isomorphic properties of a Banach space, J. Korean Math. Soc. 41 (2004), 21-38.

25. M.D. Acosta, J. Becerra Guerrero y M. Ruiz Galán, James type results for polynomials and symmetric multilinear forms, Ark. Mat. 42 (2004), 1-11.

26. M.D. Acosta, J. Alaminos, D. García y M. Maestre, On holomorphic functions attaining their norms, J. Math. Anal. Appl. 297 (2004), 625-644.

27. M.D. Acosta y A. Peralta, The alternative Dunford-Pettis property for subspaces of the compact operators, Positivity 10 (2005), 51-63.

28. M.D. Acosta, Boundaries for spaces of holomorphic functions on C(K), Publ. Res. Inst. Math. Sci. 42 (2006), 27-44.

29. M.D. Acosta, D. García y M. Maestre, A multilinear Lindenstrauss theorem, J. Funct. Anal. 235 (2006), 122-136.

30. M.D. Acosta y V. Montesinos, On norm attaining functionals, Acta Universitatis Carolinae, Math. et Phys. 47 (2006), 5-24.

31. M.D. Acosta y V. Montesinos, Solution to a problem of Namioka on norm attaining functionals, Math. Z. 256 (2007), 295-300.

32. M.D. Acosta y M.L. Lourenco, Shilov boundary for holomorphic functions on some classical Banach spaces, Studia Math. 179 (2007), 27-39.

33. M.D. Acosta, L.A. de Moraes y L. Romero Grados, On boundaries on the predual of the Lorentz space, J. Math. Anal. Appl. 336 (2007), 470-479.

34. M.D. Acosta, A. Aizpuru, R.M. Aron y F.J. García Pacheco, Functionals that do not attain their norm, Bull. Belg. Math. Soc. Simon Stevin 14 (2007), 407-418.

35. M.D. Acosta y S. G. Kim, Denseness of holomorphic functions attaining their numerical radii, Israel J. Math. 161 (2007), 373-386.

36. M.D. Acosta y A. Kaminska, Weak neighborhoods and the Daugavet property of the interpolation spaces L^1 + L^\infty and L^1\cap L^\infty, Indiana Univ. Math. J. 57 (2008), 77-96.

37. M.D. Acosta, R.M. Aron, D. García y M. Maestre, The Bishop-Phelps-Bollobás Theorem for operators, J. Func. Anal. 254 (2008), 2780-2799.

38. M.D. Acosta y A. Kaminska, Norm attaining operators between Marcinkiewicz and Lorentz spaces, Bull. London Math. Soc. 40 (2008), 581-592.

39. M.D. Acosta y S.G. Kim, Numerical boundaries for some classical Banach spaces, J. Math. Anal. Appl. 350 (2009), 694-707.

40. M.D. Acosta y J. Becerra Guerrero, Slices in the unit ball of the symmetric tensor product C(K) and L_1 (mu), Ark. Mat. 47 (2009), 1-12.

41. M.D. Acosta, Norm attaining operators into Lorentz sequence spaces, Proc. Roy. Soc. Edinburgh Series A 139 (2009), 225-235.

42. M.D. Acosta, R. Aron y L. Moraes, Boundaries for spaces of holomorphic functions on M-ideals in their biduals, Indiana Univ. Math. J. 58 (2009), 2575-2595.

43. M.D. Acosta y J. Becerra Guerrero, Weakly open sets in the unit ball of some Banach spaces and the centralizer, J. Funct. Anal. 259 (2010), 842-856.

44. M.D. Acosta, J. Alaminos, D. García y M. Maestre, A variational approach to norm attainment of some operators and polynomials, Acta Math. Sinica 26, (12), (2010), 2259-2268.

45. M.D. Acosta y V. Kadets, A characterization of reflexive spaces, Math. Ann. 349 (2011), 577-588.

46. M.D. Acosta y J. Becerra Guerrero, Roughness of the norm in spaces of N-homogeneous polynomials, J. Convex Anal. 18 (2011), 513-528.

47. M.D. Acosta, J. Becerra Guerrero y A. Rodríguez-Palacios, Weakly open sets in the unit ball of the projective tensor product of Banach spaces, J. Math. Anal. Appl. 383 (2011), 461-473.

48. M.D. Acosta, A. Kaminska y M. Mastylo, The Daugavet property and weak neighborhoods in Banach lattices, J. Convex Anal. 19 (2012), 875-912.

49. M.D. Acosta, J. Becerra-Guerrero, D. García y M. Maestre, The Bishop-Phelps-Bollobás Theorem for bilinear forms, Trans. Amer. Math. Soc. 365 (2013), 5911-5932.

50. M.D. Acosta, P. Galindo y L. Moraes, Tauberian Polynomials, J. Math. Anal. Appl. 409 (2014), 880-889.

51. M.D. Acosta, J. Becerra-Guerrero, M. Ciesielski, Y.S. Choi, S.K. Kim, H.J. Lee, L. Lourenço y M. Martín, The Bishop-Phelps-Bollobás property for operators between spaces of continuous functions, Nonlinear Anal. 95 (2014), 323-332.

52. M.D. Acosta, J. Becerra-Guerrero, D. García, Sun Kwang Kim y M. Maestre, Bishop-Phelps-Bollobás property for certain spaces of operators, J. Math. Anal. Appl. 414 (2014), 532-545.

53. M.D. Acosta, P. Galindo y L. Lourenço, Boundaries for Algebras of Analytic Functions on Function Module Banach Spaces, Math. Nach 287 (2014), 729-736.

54. M.D. Acosta, J. Becerra-Guerrero, Yun Sung Choi, Domingo García, Sun Kwang Kim, Han Ju Lee y Manuel Maestre, The Bishop-Phelps-Bollobás property for bilinear forms and polynomials, J. Math. Soc. Japan. 66 (3) (2014), 957-979.

55. M.D. Acosta, J. Becerra-Guerrero, Domingo García, Sun Kwang Kim y Manuel Maestre, The Bishop-Phelps-Bollobás property: a finite dimensional approach, Publ. Res. I. Math. Sci. 51 (2015), 173-190.

56. M.D. Acosta, J. Becerra-Guerrero y Ginés López-Pérez, Stability results of diameter two properties, J. Convex Anal. 22 (1) (2015), 1-17.

57. M.D. Acosta, A. Kaminska y M. Mastylo, The Daugavet property in rearrangement invariant spaces, Trans. Amer. Math. Soc., 367 (2015), 4061-4078.

58. M.D. Acosta, The Bishop-Phelps-Bollobás property for operators on C(K), Banach J. Math. Anal. 10 (2) (2016), 307-319.

59. M.D. Acosta, Domingo García, Sun Kwang Kim y Manuel Maestre, The Bishop-Phelps-Bollobás property for operators from c_0 into some Banach spaces, J. Math. Anal. Appl. 445 (2017), 1188-1199.

60. M.D. Acosta, R.M. Aron y F.J. García Pacheco, The approximate hyperplane series and related properties, Banach J. Math. Anal. 11 (2) (2017), 295-310.

61. M.D. Acosta, M. Fakhar y M. Soleimani-Mourchehkhorti, The Bishop-Phelps-Bollobás property for numerical radius of operators on L_1(mu), J. Math. Anal. Appl. 458 (2018), 925-936.