[1] S. Banach, Th´eorie des Op´erations Lin´eaires, Monograf. Mat. 1, Warszawa, 1932; reprint,
Chelsea, New York, 1963.
[2] M. Cambern, Reflexive spaces with the Banach-Stone property, Rev. Roumaine Math.
Pures Appl., 23 (1978), no. 7, 1005–1010.
[3] R. J. Fleming and J. E. Jamison, Hermitian operators on C(X, E) and the Banach-Stone
Theorem, Math. Z., 170 (1980) 77–84.
[4] I. Gelfand and A. Kolmogoroff, On rings of continuous functions on topological spaces,
Dokl. Akad. Nauk. SSSR (C. R. Acad. Sci. USSR), 22 (1939) 11–15.
[5] O. Hatori, K. Kawamura and S. Oi, Hermitian operators and isometries on injective tensor
products of uniform algebras and C ∗ -algebras., J. Math. Anal. Appl., 472 (2019), no. 1,
827–841.
[6] J.-S. Jeang and N.-C. Wong On the Banach-Stone problem, Studia Math., 155 (2003),
95–105.
[7] M. Jerison, The space of bounded maps into a Banach space, Ann. of Math, 52(1950),
309–327.
[8] R. V. Kadison, Isometries of operator algebras, Ann. of Math., 54 (1951), 325–338.
[9] R. V. Kadison, A generalized Schwarz inequality and algebraic invariants for operator
algebras, Ann. of Math. (2), 56 (1952), 494–503.
[10] I. Kaplansky, Lattices of continuous functions, Bull. Amer. Math. Soc., 53 (1947) 617–623.
[11] K. S. Lau, A representation theorem for isometries of C(X, E), Pacific J. Math, 60 (1975),
229–233.
[12] G. Lumer, Isometries of Orlicz spaces, Bull. Amer. Math. Soc., 68 (1962) 28–30.
[13] G. Lumer, On the isometries of reflexive Orlicz spaces, Ann. Inst. Fourier (Grenoble), 13
(1963) 99–109.
[14] S. Oi, Jordan ∗-homomorphisms on the spaces of continuous maps taking values in C ∗ algebras, Studia Math., 269 (2023), no.1, 107–119.
[15] E. Størmer, On the Jordan structure of C ∗ -algebras, Trans. Amer. Math. Soc., 120 (1965),
438–447.
[16] M. H. Stone, Applications of the theory of Boolean rings to general topology, Trans. Amer.
Math. Soc., 41 (1937), 375–481.
...