Continuous Functions on Real and Complex Normed Linear Spaces

The notation and terminology used here are introduced in the following papers: [25], [28], [29], [4], [30], [6], [14], [5], [2], [24], [10], [26], [27], [19], [15], [12], [13], [11], [31], [20], [3], [1], [16], [21], [17], [23], [7], [8], [22], [18], and [9]. For simplicity, we use the following convention: n denotes a natural number, r, s denote real numbers, z denotes a complex number, C1, C2, C3 denote complex normed spaces, and R1 denotes a real normed space. Let C4 be a complex linear space and let s1 be a sequence of C4. The functor −s1 yields a sequence of C4 and is defined by: (Def. 1) For every n holds (−s1)(n) = −s1(n). The following propositions are true: (1) For all sequences s2, s3 of C1 holds s2 − s3 = s2 + −s3. (2) For every sequence s1 of C1 holds −s1 = (−1C) · s1. Let us consider C2, C3 and let f be a partial function from C2 to C3. The functor ‖f‖ yielding a partial function from the carrier of C2 to R is defined by: (Def. 2) dom‖f‖ = dom f and for every point c of C2 such that c ∈ dom‖f‖ holds ‖f‖(c) = ‖fc‖. Let us consider C1, R1 and let f be a partial function from C1 to R1. The functor ‖f‖ yielding a partial function from the carrier of C1 to R is defined as follows: (Def. 3) dom‖f‖ = dom f and for every point c of C1 such that c ∈ dom‖f‖ holds ‖f‖(c) = ‖fc‖.

[1]  Jaros law Kotowicz,et al.  Convergent Real Sequences . Upper and Lower Bound of Sets of Real Numbers , 1989 .

[2]  Czeslaw Bylinski Functions and Their Basic Properties , 2004 .

[3]  Jarosław Kotowicz Real Sequences and Basic Operations on Them , 2004 .

[4]  Konrad Raczkowski,et al.  Topological Properties of Subsets in Real Numbers , 1990 .

[5]  Yasunari Shidama,et al.  The Continuous Functions on Normed Linear Spaces , 2004 .

[6]  A. Trybulec Tarski Grothendieck Set Theory , 1990 .

[7]  Wojciech A. Trybulec Vectors in Real Linear Space , 1990 .

[8]  Yasunari Shidama Convergence and the Limit of Complex Sequences. Series , 1997 .

[9]  Edmund Woronowicz Relations Defined on Sets , 1990 .

[10]  T. Mitsuishi Property of Complex Sequence and Continuity of Complex Function , 1994 .

[11]  Jarosław Kotowicz,et al.  Convergent Sequences and the Limit of Sequences , 2004 .

[12]  Wojciech A. Trybulec Pigeon Hole Principle , 1990 .

[13]  Jan Popio,et al.  Real Normed Space , 1991 .

[14]  G. Bancerek,et al.  Ordinal Numbers , 2003 .

[15]  N. Endou Algebra of Complex Vector Valued Functions , 2004 .

[16]  Krzysztof Hryniewiecki,et al.  Basic Properties of Real Numbers , 2004 .

[17]  Jaroslaw Kotowicz,et al.  Partial Functions from a Domain to a Domain , 2004 .

[18]  Czeslaw Bylinski Functions from a Set to a Set , 2004 .

[19]  Yasunari Shidama,et al.  Algebra of Vector Functions , 1992 .

[20]  Adam Naumowicz,et al.  Conjugate Sequences , Bounded Complex Sequences and Convergent Complex Sequences , 1996 .

[21]  Konrad Raczkowski,et al.  Topological Properties of Subsets in Real Numbers 1 , 1990 .

[22]  W. Kellaway,et al.  Complex Numbers , 2019, AMS/MAA Textbooks.

[23]  Yasunari Shidama Convergence and the Limit of Complex Sequences , 1997 .

[24]  Edmund Woronowicz Relations and Their Basic Properties , 2004 .

[25]  A. Winnicka,et al.  Complex Sequences , 1993 .

[26]  Jaros law Kotowicz,et al.  Monotone Real Sequences. Subsequences , 1989 .