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References
J.Aczél, Lectures on functional equations and their applications, New York, 1966.
J.A. Baker, D'Alembert's functional equation in Banach algebras, Acta Sci. Math. Szeged,32(1971), 225–234.
J.A. Baker and K.R. Davidson, Cosine, exponential and quadratic functions, Glasnik Mat. 16(36) (1981), 269–274.
A.B. Buche, On the cosine-sine operator functional equations, Aequ.Math. 6 (1971), 231–234.
R. Chandler and H. Singh, On the measurability and continuity properties of the cosine operator, Indian J.pure appl. Math. 12(1) (1981), 81–83.
A.Cauchy, Oeuvres complètes, IIe series, T.III, Paris (1897), 98–103 and 220–229.
A.Devinatz, A note on semigroups of unbounded selfadjoint operators, Proc.Amer. Math.Soc.5(a954), 101–102.
H.O. Fattorini, Uniformly bounded cosine functions in Hilbert spaces, Indiana Univ. Math. J. 20(1970),411–425.
G. Faulkner and R.W. Shonkwiler, Cosine representations of Abelian *-semigroups and generalized cosine operator functions, Can.J.Math., 30(1978), 474–482.
E. Giusti, Funzioni coseno periodiche, Boll.Unione Mat.Ital.22 (1967), 478–485.
J.A. Goldstein, On the convergence and approximation of cosine functions, Aequ.Math. 10(1974), 201–205.
E. Hille and R.S. Phillips, Functional analysis and semigroups, Amer.Math.Soc. Providence, R.I. 1957.
Pl.Kannappan, The functional equation f(xy)+f(xy−1) = 2f(x)f(y) for groups, Proc. Amer. Math. Soc. 19(a968), 69–74.
J. Kisynski, On operator-valued solutions of d'Alembert's functional equation I, Coll. Math. 23(1971), 107–114.
J.Kisynski, On operator-valued solutions of d'Alembert's functional equation II, Studia Math. 24(a972),43–66.
J. Kisynski, On cosine operator functions and one-parameter groups of operators, Studia Math. 44(1972), 93–105.
H. Kraljević and S. Kurepa, Semigroups on Banach spaces, Glasnik Mat. 5(25) (1970), 109–117.
S. Kurepa, Semigroups on unbounded self-adjoint transformations in Hilbert space, Glasnik mat.fiz. astr. 10(1955), 233–238.
S. Kurepa, Convex functions, Glasnik mat.fiz. astr. 11(1956),89–94.
S. Kurepa, Semigroups of linear transformations in n-dimensional vector space, Glasnik mat.fiz. astr. 13(1958),3–32.
S. Kurepa, A cosine functional equation in n-dimensional vector space, Glasnik mat. fiz. astr. 13(1958), 168–189.
S. Kurepa, On the continuity of semigroups of normal transformations in Hilbert space, Glasnik mat. fiz. astr. 13 (1958), 81–87.
S. Kurepa, Semigroups of normal transformations in Hilbert space, Glasnik mat. fiz. astr. 13(1958), 257–266.
S. Kurepa, On the quadratic functional, Publ. de l'Inst. Math.13 (1959), 57–75.
S. Kurepa, A cosine functional equation in Hilbert space, Can.J. Math. 12(1960), 45–50.
S. Kurepa, On some functional equations in Banach spaces, Studia Math. 19(1960), 149–158.
S. Kurepa, A property of a set of positive measure and its applications, Journal Math. Soc. of Japan, 13(1961),13–19.
S. Kurepa, On roots of an element of a Banach algebra, Publ. de l'Inst. Math. 1(11) (1962), 5–10.
S. Kurepa, A cosine functional equation in Banach algebras, Acta Sci. Math. Szeged, 23(1962), 255–267.
S. Kurepa, Uniformly bounded cosine function in Banach space, Mathematica Balkanica 2 (1972), 109–115.
S. Kurepa, Weakly measurable selfadjoint cosine function, Glasnik Mat. 8 (28) (1973), 73–79.
S. Kurepa, Decomposition of weakly measurable semigroups and cosine operator functions, Glasnik Mat. 11(31) (1976), 91–95.
D. Lutz, Compactness properties of operator cosine functions, C.R.Math.Rep. Acad.Sci.Canada 2 (1980),277–280.
D. Lutz, Über operatorwertige Lösungen der Funktionalgleichung des Cosinus, Math.7. 171(1980), 233–245.
G. Maltese, Spectral representations for solutions of certain abstract functional equation, Compositio Math. 15 (1962), 1–22.
G. Maltese, Spectral representations for some unbounded normal operators, Trans.Amer.Math.Soc. 110(1964), 79–87.
B. Nagy, On cosine operator functions on Banach spaces, Acta Sci. Math.Szeged 36(1974), 281–190.
B. Nagy, Cosine operator functions and the abstract Cauchy problem, Period. Math. Hung. 7(1976), 213–217.
A.E. Nussbaum, Integral representation of semigroups of unbounded self-adjoint operators, Ann.of Math.(2) 69(1959), 133–141.
N. Sarapa, A note on the cosine equation for probability on compact semigroups, Glasnik Mat. 15(1980), 383–385.
M. Sova, Cosine operator functions, Rosprawy Mat. XLIX(1966), 3–46.
B.Sz.Nagy, Spektraldarstellung linearer Transformation des Hilbertschen Raumes,Berlin, 1942.
C.C. Travis and F.F. Webb, Compactness, regularity and uniform continuity properties of strongly continuous families, Houston J. Math. 3(1977), 555–567.
F. Vajzović, Einige Funktionalgeichungen im Fréchetschen Raum, Glasnik Mat. 3(1968), 19–38.
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Kurepa, S. (1982). Semigroups and cosine functions. In: Butković, D., Kraljević, H., Kurepa, S. (eds) Functional Analysis. Lecture Notes in Mathematics, vol 948. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0069841
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