A. Books.
B. Research articles.
1. V.Souček: The minimum existence of a functional, CMUC,11,2,1970,205-225.
2. V.Souček: The nonexistence of minimal surfaces on nonconvex domains, Com.Math.Univ.Carolinae,12,4,1971,723-735.
3. J.Souček, V.Souček: Morse-Sard theorem for real-analytic functions, Com.Math.Univ.Carolinae,13,1,1972,45-51.
4. S. Fučík, J.Nečas, J.Souček, V.Souček: Strengtheninh upper bound for the number of the critical levels of nonlinear functionals, Com.Math.Univ.Carolinae, 13, 2, 1972, 297-310.
5. S. Fučík, J.Nečas, J.Souček, V.Souček: Upper bound for the number of critical levels for nonlinear operators in Banach spaces of the type of second order nonlinear partial differential operators, Jour.Funct.Analysis,11,3,1972,314-333.
6. S. Fučík, J.Nečas, J.Souček, V.Souček: Upper bound for the numbers of eigenvalues for nonlinear operators, Ann.Sc.Norm.Sup.Pisa,27,1,1973,53-71.
7. S. Fučík, J.Nečas, J.Souček, V.Souček: New infinite dimensional version of Morse-Sard theorem, Boll.Un.Math.Ital.,6,4,1972,317-322.
8. S. Fučík, M.Kučera, J.Souček, V.Souček: Topics on nonlinear analysis, Proc. of the Summer school on nonlinear analysis, Hidensee, 197.
9. S. Fučík, J.Nečas, J.Souček, V.Souček: Note to nonlinear spectral theory: Application to the nonlinear integral equations of the Lichtenstein type, Math.Nachrichten,58,1973,257-267.
10. V.Souček: Théoreme de Morse-Sard sur un ensemble analytique, Séminaire d'etude de géometrie analytique, 1973-1974, Paris, 1-11.
11. S. Fučík, M.Kučera, J.Nečas, J.Souček, V.Souček: Morse-Sard theorem in infinite dimensional Banach spaces and investigation of the set of all critical levels, Čas.pěst.matematiky,99,1974,217-243.
12. S. Fučík, J.Nečas, J.Souček, V.Souček: Krasnoselskii's main bifurcation theorem, Arch.Rat.Mech. and Anal.,54,1974,328-339.
13. J.Souček, V.Souček: On the spectrum of a nonlinear operator, Czech.Math.Jour.,24,1974,614-663.
14. J.Souček, V.Souček: Time-space duality and the Salam-Weinberg model, Proc. 8th Winter School on Abstract Anal., Špindl. mlyn 1980,161-167.
15. J.Souček, V.Souček: Towards to subquantum theory, Proc 8th Winter School on Abstract Anal., špindl. mlyn 1980, 168-172.
16. V.Souček: Analysis in complex quaternions and its connections with math. physics, Proc.9th Winter School on Abstract Analysis, 1981,168-172.
17. V.Janiš, J.Souček, V.Souček: Feynman path integral as spectral decomposition, Proc.9th Winter School on Abstract Analysis, Srni 1981, 158-161.
18. V.Janiš, J.Souček, V.Souček: Manifestly covariant quantization technique equivalent to quantum field theory, Proc.9th Winter School on Abstract Anal., Srni 1981, 162-167.
19. J.Souček, V.Souček: The time-space structure of the Salam-Weinberg model, Quantum chromodynamics, Proc. Hadron structure 80, Smolenice 1980, Phys. and Applic., vol.7,Bratislava 1982,261-266.
20. V.Souček: Complex quaternions, their connection to twistor theory, Czech.J.Phys. B32,1982,688-691.
21. V.Souček: The conformal group action on P1(CH), Twistor Newsletters, Oxford,12,1982,25-29.
22. V.Souček: Boundary-value type and initial-value type integral formulas for massless fields, Twistor Newsletters, Oxford,14,1982,17-19.
23. V.Souček: Complex-quaternionic analysis applied to spin-1/2 massless fields, Complex Variables,1,1983,327-346.
24. V.Souček: Holomorphicity in quaternionic analysis, in Seminario di variabili complesse, Bologna Istituto di Geometria, Univ. di Bologna, 1982, 147-153.
25. V.Souček: Complex quaternionic analysis, connection to mathematical physics, in Seminario di variabili complesse, Bologna Istituto di Geometria, Univ. di Bologna, 1982, 154-161.
26. V.Souček: Cauchy integral formula, in Seminario di variabili complesse, Bologna Istituto di Geometria, Univ. di Bologna, 1982, 162-171.
27. V.Janiš, J.Souček, V.Souček: Operator formalism equivalent to the Feynman quantization technique, Jour.Math.Physics,24,4,1983,834-838.
28. V.Bartík, A.V.Ferreira, M.Markl, V.Souček: Index and Cauchy integral formula in complex quaternionic analysis, Simon Stevin,59,3,1985,321-330.
29. V.Souček: H-valued differential forms on H, Proc. of the 11th Winter School on Abstract Analysis 1983, Suppl. ai Rendiconti del Circolo matematico di Palermo, ser.II,3,1984,293-300.
30. J.Bureš, V.Souček: Generalized hypercomplex analysis and its integral formulas, Complex Variables: Theory and Application,1985,5,53-70.
31. J.Bureš, V.Souček: Generalized Cauchy-Riemann equations on manifolds, Proc. of the 12th Winter School on Abstract Analysis 1984, Suppl ai Rendiconti del Circolo matematico di Palermo, ser.II,6,1984,31-42.
32. J.Bureš, V.Souček: Integral formulae for spinor fields, Proc. of the 13th Winter School on Abstract Analysis 1985, Suppl. ai Rendiconti del Circolo matematico di Palermo, ser.II,9,1985,37-42.
33. J.Bureš, V.Souček: Regular spinor valued mappings, Seminarii di Geometria, Bologna 1984, ed. S.Coen, Bologna 1986, 7-22.
34. M.Dodson, V.Souček: Leray residue applied to solutions of the Laplace and wave equations, Seminarii di Geometria,Bologna 1984, ed. S.Coen, Bologna 1986, 93-107.
35. F.Sommen, V.Souček: Hypercomplex differential forms applied to the de Rham and the Dolbeault complex, Seminarii di Geometria, Bologna 1984, ed. S.Coen, Bologna 1986, 177-192.
36. V.Souček: Generalized Cauchy-Riemann equations on manifolds, Proc. of the Workshop Clifford algebra and their applications in mathematical physics, eds. J.Chisholm, A.Common, D.Riedel Publ. Comp., 1986, 219-227.
37. M.Dodson, A.Silva, V.Souček: A note on Whittaker's cardinal series in harmonic analysis, Proc.Edinb.Math.Soc.,1986,29,349-357.
38. J.Bureš, V.Souček: The Penrose transform and Clifford analysis, Proc. Winter School "Geometry and Physics", Srni 1990, Suppl. ai Rend. del Circolo Matematico di Palermo, ser.II, 26, 1991, 97-104.
39. R. Delanghe, V. Souček: On the structure of spinor-valued differential forms, Complex Variables, 18, 1992, 223-236.
40. R.Delanghe, F.Sommen, V.Souček: Explicit relization of spinor spaces and its application to Clifford analysis, Applicable Analysis 45, 1992, 95-116.
41. R.Delanghe, F.Sommen, V.Souček: Residues in Clifford analysis, in H.Begehr, A.Jeffrey (Eds.): Partial differential equations with complex analysis, Pitman Research Notes in Math. 262, 1992, 61-92.
42. F.Sommen, V.Souček: Monogenic differential forms, Complex Variables, Theory and Appl., 19, 1992, 81-90.
43. J.Bureš, V.Souček: The Penrose transform for Dirac equation, in Proc. of the Winter School "Geometry and Physics", Srní, 1991, Suppl. ai Rend.Circ.Mat.Palermo, II, 30, 1993, 183-193.
44. V.Souček: Monogenic forms on manifolds, in Z.Oziewicz et al. (Eds.): Spinors, Twistors, Clifford Algebras and Quantum Deformations, Klu\-wer, 1993, 159-166.
45. V.Souček: Clifford analysis for higher spins, in F.Brackx, R.Delanghe, H.Serras: Clifford Algebras and their Applications in Mathematical Physics, Proc. of the Third Conference held at Deinze, Belgium 1993, 223-232.
46. J.Bureš, V.Souček: The Penrose transform on isotropic Grassmannians, in S.Gindikin, P.Michor (Eds.): 75 years of Radon transform, Int. Press, 1994, 81-104.
47. V.Souček: Residues for monogenic forms on Riemannian manifolds, in Proc. of the Winter School "Geometry and Physics", Srní, 1993, Suppl. ai Rend.Circ.Mat.Palermo, II, 37, 1994, 233-242.
48. C.Klimčík, A.Pompoš, V.Souček: Grading of spinor bundles and gravitating matter in non-commutative geometry, Lett. Math. Phys., 30, 1994, 259-266.
49. J.Bureš, V.Souček: The inverse Penrose transform for the Dirac and complex Laplace equations, F.Noruget et al. (Eds.): Géométrie complexe, Proc. of the Conference on Complex Geometry, Paris, 1992 Herman, 1996, 3-22.
50. V.Souček: Higher spin and conformal invariants in Clifford analysis, in Proc. of Symposium "Analytical and numerical methods in Clifford analysis, Seiffen, 1996, 175-186.
51. A.Čap, J.Slovák, V.Souček: Invariant operators on manifolds with AHS structures, I. Invariant differentiation, Acta Mat.Univ.Comenianae, 66, 1997, 33-69.
52. A.Čap, J.Slovák, V.Souček: Invariant operators on manifolds with AHS structures, II., Vienna, 1994, Acta Mat.Univ.Comenianae, 66, 1997, 203-220.
53. V.Souček: Monogenic forms and the BGG resolution,, in: Dirac operators in Analysis, Addison Wesley Longman, Edinburgh, 1998, 152-169.
54. J.Bureš, V.Souček: Eigenvalues of conformally invariant operators on spheres, in Proc. of the Winter School "Geometry and Physics", Srní, 1998, Suppl. ai Rend.Circ.Mat.Palermo, II, 1999, 109-122.
55. J.Bureš, S.Ofman, V.Souček: Integral transforms for divisors of P_n(C) and solutions of partial differential systems, Czech. Math. Jour. 50, 125, 2000, 763-790.
56. V.Souček: Clifford analysis as a study of invariant operators, in Kluwer Academic Publisher, Dordrecht, 2001, 323-339.
57. V. Souček: Invariant operators and Clifford analysis, Adv.Appl.Cliff.Algebras, 11(S1), 2001, 37-52.\end
58. J. Bureš, F. Sommen, P. Van Lancker, V. Souček: Rarita-Schwinger type operators in Cliffor analysis, Jour. Funct. Analysis, 185, 2001, 425-455.
59. J.Slovák, V.Souček: Invariant operators of the first order on manifolds with a given parabolic structure, in Société Mathématique de France, Paris, 2001, 251-276.
60. A.Čap, J.Slovák, V.Souček: Bernstein-Gelfand-Gelfand sequences, Ann.Math., 154, 2001, 97-113
61. J. Bureš, F. Sommen, P. Van Lancker, V. Souček: Symmetric analogues of Rarita-Schwinger equations, Ann. Global Anal.and Geometry, 21, 2002, 215-240.
62. L. Krump, V.Souček: Hasse diagrams for parabolic geometries, in Proc. of the 22nd Winter School „Geometry and Physics“, Srn\'{\i}, 2002, Suppl. Ai Rend. Circ. Mat. Palermo, II, 71, 2003, 133-141.
63. D. Calderbank, T. Diemmer, V. Souček: Ricci-corrected derivatives and invariant differential operators, Diff.Geom.Appl., 23, 2, 2005,149-175.
B. Preprints.
F. Colombo, V. Souček, D. Struppa: Invariant operators for several Fueter operators, preprint, accepted to Jour. Geom. Phys.
A. Čap, V. Souček: Sumcomplexes in curved BGG sequences, preprint
M. Eastwood, P. Somberg, V. Souček: The uniqueness of the Joseph ideal for the classical groups, preprint
J. Bureš, V. Souček: Complexes of invariant differential operators in several quaternionic variables, accepted to Complex Variables: Theory and Applications. ps