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A product space with the fixed point property
Fixed Point Theory and Applications volume 2012, Article number: 91 (2012)
Abstract
We show that the l1 sum of the van Dulst space with itself possesses the fixed point property, although it fails most of the known conditions that imply (FPP).
Mathematics Subject Classification: Primary, 46B20; 47H09.
1. Introduction
Let C be a subset of a Banach space (X, ||·||). A mapping T: C → X is called nonexpansive whenever ||Tx - Ty|| ≤ ||x - y|| for all x, y ∈ C. The space (X, ||·||) has the fixed point property (FPP) if every nonexpansive self-mapping of each nonempty bounded closed convex subset C of X has a fixed point. If the same property holds for every weakly compact convex subset of X we say that (X, ||·||) has the weak fixed point property (WFPP for short).
It has been known from the outset of the study of this property (around the early sixties of last century) that it depends strongly on ¨nice¨ geometrical properties of the space. A seminal work for this theory, due to Kirk [1] established that those Banach spaces with normal structure (NS), have the (WFPP). In particular uniformly convex Banach spaces have normal structure. A long time open major question in metric fixed point theory is: Does every reflexive Banach space have (FPP)? (See [2] for more about this problem). A special case of this question is: Does every superreflexive Banach space have (FPP)? Although superreflexive spaces have the fixed point property for isometries [3] the question for general nonexpansive mappings remains still unsolved.
Since 1965 considerable effort has been made in order to find sufficient conditions for (WFPP). Maybe the most relevant of those geometrical conditions are the following (see definitions below). We indicate along with the name of each property the year it was proved that it implies (WFPP).
-
(1)
Asymptotic normal structure (ANS) (1981).
-
(2)
Orthogonal convexity (OC) (1993).
-
(3)
Prus-Szczepanik condition (PS) (2005).
-
(4)
E-convexity (2008).
-
(5)
Property WORTH (2010).
Each one of these properties is implied by other more or less known geometrical conditions. For instance, uniformly nonsquare Banach spaces satisfy both, (PS) and E-convexity, and uniform convexity implies (1), (2), (3) and (4).
Another seemingly open question in this field is whether (WFPP) is preserved by direct sums. Many partial affirmative answers have been obtained during the last three decades.
The aim of these notes is to give a product Banach space with the following characteristics:
-
(1)
It enjoys (FPP).
-
(2)
It fails all of the above conditions (1)-(5).
-
(3)
It is the l 1 product of two Banach spaces with (FPP) but it falls out of the scope of all known results guaranteeing the (FPP) for such products.
2. Sufficient conditions for (WFPP)
From here on, we will use the standard notation in Banach space theory, in particular B [x, r] denotes the closed ball with center x ∈ X and radius r > 0. B X and S X denote the unit ball and the unit sphere in X. The weak convergence of the sequence (x n ) to x will be denoted by .
2.1. Asymptotic normal structure (ANS)
This property was introduced by Baillon and Schöneberg [4].
Definition 1. A Banach space (X, ||·||) has (ANS) if for every nonempty bounded, closed and convex subset K of X consisting of more than one point, and every sequence (x n ) ⊂ K with lim n (x n - xn+1) = 0, there exists x ∈ K such that lim inf n ||x n - x|| < diamK.
(ANS) is weaker than normal structure (NS). Among many others, the following geometrical conditions in turn imply (NS):
-
(a)
Uniform convexity (UC), (Belluce, Kirk, 1967).
-
(b)
ε 0 (X) < 1. (Goebel, 1970). Here ε 0 (X) denotes the characteristic of convexity of X.
-
(c)
Uniform smoothness (Turett, 1982).
-
(d)
Uniform convexity in every direction (Garkavi, 1962).
-
(e)
Opial condition (Gossez and Lami Dozo, 1972).
-
(f)
Near uniform convexity (van Dulst, 1981).
Theorem 1. [4]Every reflexive Banach space with asymptotic normal structure has the (FPP).
2.2. Orthogonal convexity (OC)
This property is independent of (ANS) and weaker than uniform convexity. It was introduced in 1988 (see [5, 6]). James space J, c0, c and Banach spaces with the Schur property like l1, are (OC). To define (OC) we need some further notation. For x, y ∈ X,
If A is a bounded subset of X, |A| = sup{||x||: x ∈ A}.
If (x n ) is a bounded sequence in X, D[(x n )] = lim sup m (lim sup n ||x m - x n ||).
Definition 2. A Banach space (X, ||.||) is orthogonally convex (OC) if for every weakly null sequence (x n ) with D[(x n )] > 0, there exists β > 0 such that
Theorem 2. Every Banach space satisfying (OC) has (WFPP).
2.3. Prus-Szczepanik condition (PS)
This condition was introduced by Prus and Szczepanik [7]. Given a Banach space X, x ∈ X, ε > 0 put
and
where and .
Definition 3. Let X be a non-Schur space. If there exists ε ∈ (0, 1) such that for every x ∈ S X it is the case that b1 (1, x) < 1 - ε or d (1, x) > ε we say that (X, ||.||) satisfies the (PS) condition.
Theorem 3. Every non-Schur reflexive Banach space satisfying (PS) condition has (FPP).
Properties stronger than (PS) condition are the following:
-
(a)
Uniform convexity.
-
(b)
Uniform noncreasyness, introduced by Prus (see [8]) and its generalizations (see [9–11]).
-
(c)
Property M (X) > 1 (see [12]). In particular this condition covers the uniformly nonsquare Banach spaces (see [13, 14]). Other reflexive Banach spaces with M (X) > 1 are those satisfying R(X) < 2 (see [15]).
2.4. Conditions depending on the dual space
Very recently the authors in [16] deduced that spaces with O-convex dual have the (FPP) from the result proved in [13] that implies that X* has the (FPP). The fact that E-convex spaces have the (FPP) was proved in a different manner in [17].
The geometrical properties of O and E-convexity were coined by Naidu and Sastry [18] who proved several consequences of these properties. For instance they showed that O-convex spaces are superreflexive and that they include uniformly nonsquare Banach spaces.
Definition 4. Let 0 < ε < 2, n ≥ 2. (X, ||·||) is O (n, ε) convex, if for every x1, x2, . . ., x n in B X (S X ) there exist i ≠ j ∈ {1, . . ., n} such that
X is O (n) convex, if it is O (n, ε) convex for some ε > 0 and O-convex if it is O (n) convex for some n ∈ N. A Banach space X is E-convex if and only if its dual space X* is O-convex.
Theorem 4. [17, 16]. If X* is O-convex, that is if X is E-convex, then the Banach space X has the fixed point property for nonexpansive mappings.
2.5. Property WORTH
A Banach space has the WORTH property (Rosenthal, 1983; Sims 1988) if lim n | ||x n - x|| - ||x n + x|| | = 0 for all x ∈ X and all weakly null sequences (x n ) in X.
In [19] a coefficient was defined which in some sense quantifies how far a Banach space is from possessing this property. This coefficient is given by .
Clearly μ(X) = 1 if and only if X has WORTH.
Sims raised the question whether reflexive spaces with WORTH property have (FPP). Recently Fetter and Gamboa [20] solved this problem. That is,
Theorem 5. (Fetter Gamboa 2010). If X is reflexive and μ(X) = 1, then X enjoys (FPP).
3. The van Dulst space
Let V be the space l2 equipped with the following equivalent norm:
This space was introduced in 1982 by van Dulst. It is (OC) [6] but it fails to have asymptotic normal structure [21]. Moreover, for every x ∈ l2,
We enumerate several geometrical properties of this space in the following result.
Proposition 1. For the van Dulst space V, one has
-
(1)
V fails (ANS).
-
(2)
V is (OC).
-
(3)
V fails (PS) condition.
-
(4)
V fails to have O-convex dual.
-
(5)
μ(V) ≥ 2 and hence V fails WORTH property.
Proof. See [21] for (1) and [6] to see (2).
To see (3), for every positive integer n put
Note that | ||x n || | = 1 and that, for m > n,
Then . Moreover, e1 ∈ S V and for every n > 1,
Therefore, for every ε ∈ (0, 1),
In the same way, if we consider the sequence (-x n ), it is clear that . For n > 1,
and
Thus for every ε ∈ (0, 1) e1 ∈ S V , b1 (1, e1) > 1 - ε and d (1, e1) < ε which implies that V fails condition (PS).
-
(4)
To see that V* is not O-convex, consider for any positive integer n the functional f n ∈ V* defined on V by f n (x) = x(1) + x(2n) + x(2n + 1).
For every x ∈ V
Moreover, | ||e2n|| | = 1 and f n (e2n) = 1. Thus .
Let m > n and take , .
Clearly | ||v m, n || | = | ||w m, n || | = 1. Since (f n - f m ) (v m, n ) = 2, .
Therefore, is a countable 2-separated subset of the unit sphere . Moreover, (f n + f m ) (w m, n ) = 2 which implies that . Thus is a countable 2-symmetrically separated subset of and hence V* is not O-convex.
Finally, to see (5) take x n as in (3.1). Then (x n ) is weakly null and by (3.2) and (3.3), for n > 1, | ||e1 + x n || | = 2 and | ||e1 - x n || | = 1. Since e1 ∈ S V , it follows that μ(V) ≥ 2. ■
4. The space V⊕1V
In this section we will be concerned with the space W = V ⊕1V, that is the product space l2× l2 endowed with the norm
Now consider the space Z to be l2 with the following norm:
Let (e n ) be the canonical basis of l2 and and . Then we may write
This implies that
Since and since we have
Clearly the function F: Z → W given by
is an isometry between the two spaces. We will work mostly with the space Z.
Proposition 2. Let W = V ⊕1V. Then
-
(1)
W fails (ANS).
-
(2)
W fails to be (OC).
-
(3)
W fails (PS) condition.
-
(4)
W fails to have O-convex dual.
-
(5)
μ(W) ≥ 2 and hence W fails WORTH property.
Proof. Since the van Dulst space V is isometric to a closed subspace of W, and asymptotic normal structure (ANS), Prus-Szczepanik condition (PS) and WORTH are inherited by closed subspaces, W fails (ANS), (PS) and WORTH.
For every n ∈ ℕ let F n ∈ Z* be given by F n (x) = x(1) + x(2n + 1) + x(2n + 3). Then, since F n (e1) = 1 and clearly , we have that . If , for n ≠ m, then ||v m, n || = ||w m, n || = 1 and (F n - F m ) (v m, n ) = (F m + F n ) (w m, n ) = 2; thus .
Hence {F n : n = 1, 2, . . .} is a symmetrically separated subset of , the space Z* cannot be O-convex and statement (4) is proven.
On the other hand consider the weakly null sequence (e k ) in Z. It is obvious that ||e k || = 1, that ||e n - e m || ≤ 2 for n ≠ m and that ||e n - e m || = 2 whenever m and n have different parity. Thus D(e n ) = lim sup m (lim sup n ||e n - e m ||) = 2. If β > 0, and m and n have different parity, since
we have that e m + e n ∈ M β (e n , e m ). Since ||e n + e m || = 2, then
and therefore for every β > 0,
which implies that W fails to be (OC), that is, statement (2) holds. This completes the proof. ■
Remark 1. It seems to be an open problem whether X1 ⊕1X2has the (WFPP) provided that X1, X2are two Banach spaces with the (WFPP). There are several affirmative partial answers in the literature. For instance in[22]it was shown that X1 ⊕1X2enjoys (WFPP) whenever X1is uniformly convex in every direction and X2is a Banach space such that ℝ × X2with the l1-norm has the (WFPP). In the same paper it was pointed out that this last condition holds whenever X2has either uniformly normal structure or many other well known sufficient conditions for (FPP).
In 2002, A. Wiśnicki proved that X1 ⊕1X2has the (WFPP) provided that X1and X2are uniformly noncreasy Banach spaces. The notion of uniformly noncreasy spaces was introduced by S. Prus to describe a large class of superreflexive Banach spaces with the (WFPP).
In[23]it was shown that X1 ⊕1X2has the (WFPP) provided that X1is a Banach space with both, the weak Banach- Saks property and the (WFPP) while X2has asymptotic (P). Asymptotic (P) is a geometric property which implies normal structure, which in turn implies (ANS) and (WFPP), introduced by B. Sims and M.A. Smyth in 1995. Very recently in[24], A. Wiśnicki proved that the assumption of the Banach- Saks property could be dropped in the above result.
The van Dulst space V which has the weak Banach- Saks property and (WFPP), does not have normal structure. Hence it fails uniform normal structure and asymptotic (P). (In fact it fails (ANS) which is even weaker than (NS)). Moreover, V is not uniformly noncreasy, because it fails (PS) condition which is more general than uniformly noncreasyness.
Thus we can see that for the space W = V ⊕1V, (WFPP) is preserved beyond the scope of the above theorems regarding the (WFPP) of l1direct sums.
So we will turn our attention to show that Z and thus W has the (FPP). The proof is rather technical and we first need the following lemma which was first proved by Maurey [25].
We recall that if T: K → X where K ⊂ X, a sequence (x n ) in K is called almost fixed point (afp) sequence (afps) for T provided that ||x n - Tx n || → 0.
Lemma 1. Let X be a Banach space and T: K → K, where K ⊂ X is a weakly compact convex set, be a nonexpansive mapping. If and are afp sequences for T, then there exists an afp sequence(z n ) ⊂ K such that for i = 1, 2 .
Theorem 6. The space Z enjoys the (FPP).
Proof. We shall argue by contradiction using as our main tool the well known Goebel-Karlovitz lemma [26, 27] whose statement is as follows: Let X be a Banach space and T: K → K be a nonexpansive mapping, where K is a minimal nonempty T -invariant convex subset of X. If K is weakly compact and (x n ) is an afps for T, then for any x ∈ K, lim n ||x n - x|| = diamK, where diamK is the diameter of K. From this it follows that there exists a subsequence of (x n ) such that .
So suppose that Z lacks the (FPP). Then there exists a nonexpansive mapping T: K → K where K ⊂ Z is a nonempty weakly compact convex set and T does not have a fixed point. Let us assume that K is minimal for T. Let (x n ) ⊂ K be an afps for T. By standard arguments, we may suppose that 0 ∈ K, , diamK = 1. By passing to an appropriate subsequence of (x n ), still called (x n ), we may suppose that there is a basic block sequence (u n ) such that u1 (1) = u1 (2) = 0, lim n ||x n - u n || = 0 and, if supp u n = {i: u n (i) ≠ 0}, then max supp u n + 4 < min supp un+1. By taking another appropriate subsequence we may suppose further
-
i)
lim n ||Px n ||, lim n ||Px n ||2, lim n ||Qx n ||2 exist.
By passing to another subsequence, we also assume, by the Goebel- Karlovitz lemma, that ||x n - xn+1|| → 1.
Let , . By Lemma 1, there exists an afps (z n ) such that .
If we take any subsequence , since and , we get that . Hence for i = 1, 2 we must have that . For convenience we call the afps and again (z k ) and . By passing to appropriate subsequences of (z n ) we finally get afp sequences , and (z n ) such that
-
(a)
, , .
-
(b)
.
-
(c)
lim n ||Pz n ||, lim n ||Pz n ||2, lim n ||Qz n ||2 exist.
-
(d)
for i = 1, 2.
-
(e)
, , exist.
-
(f)
, , and exist.
Consequently, again appealing to the Goebel- Karlovitz lemma,
Thus . Hence
Now let , .
By the assumption on the supports of and , for fixed n and for any j ∈ ℕ, there exists r (n, j) ∈ {1, 2} such that 1, 2j + 1, 2j + 3 do not belong to . But then
Thus,
and similarly for any k ∈ ℕ, there exists s (n, k) ∈ {1, 2} such that 1, 2k, 2k + 2 do not belong to and
Therefore,
Observe that, since the have disjoint supports, the inner product , and
The above also implies
By (4.2) and by d), for i = 1, 2 it holds that . From this and (4.8), we obtain for , that if lim n a n = a, where by (4.4) a > 0,
There are three possible cases: (I) There exists a subsequence of (z n ) with , (II) there exists a subsequence such that for some sequence (j k ) in ℕ (or for some sequence (j k ) in ℕ) or (III) there exist (j n ) and (k n ) so that
In any of those cases we will call the subsequence (z n ) again. Again, by the Goebel- Karlovitz lemma,
-
(I)
By (4.10) . So (z n ) cannot be an afps.
-
(II)
Now suppose that for some sequence (j n ) in ℕ. By passing to a subsequence if necessary we may suppose that 2j n + 1 and 2j n + 3 are not in the support of (or of ), Define
,
,
If A n + B n = 0; we have and this is only possible if Pz n = 0. Hence, if we had , k = 1, 2, . . ., by (4.7)
and again would not be an afps.
Thus we assume that there exists N0 so that for n > N0, A n +B n ≠ 0, then, since , by (4.9),
We obtain lim n ||z n || = 1 if and only if a) and b) lim n 2A n B n + c n = 0. Thus from a) . This means that where v n → 0. From b) lim n 2A n B n = - lim n c n and since all the quantities involved are nonnegative and lim n B n ≠ 0, then lim n A n = lim n c n = 0. This implies on one hand that where w n → 0 and on the other where τ n → 0. Putting all of this together we obtain: where ρ n → 0 and . But then and therefore and where σ n → 0. Hence
and this is a contradiction. The remaining cases are done similarly.
-
(III)
Last suppose that there exist (j n ) and (k n ) so that
Then, by (4.7) and also . So, in order for lim n ||z n || = 1, it is necessary that
Assume that for a subsequence called (z n ) again, 2j n + 1, 2j n + 3 are not in the support of and suppose first that 2k n and 2k n + 2 do not belong to the support of . Then and since , in this case .
Thus suppose that either 2k n or 2k n + 2 belongs to the support of and hence {2k n , 2k n + 2} is disjoint with the support of . We have by (4.12),
and
Thus and . Hence, since ||·||· and ||·||2 are equivalent, we get , and
By a) and also. Now let
Then and are two afp sequences in K.
By the above, . Also, . Applying Lemma 1 there exists an afps (w n ) ⊂ K such that for i = 1, 2 we have . But since , we get that for i = 1, 2
We may assume by passing to a subsequence, that lim n ||Pw n ||, lim n ||Pw n ||2, lim ||Qw n ||2 and for i = 1, 2, , , all exist. Then
From , , , we obtain . Similarly . Then
Also, since ,
By a) there exists c such that and since , we get that c > 0. Further,
Hence and
and therefore . Hence by (4.14)
As before, since the supports of and are disjoint, for j there exists i such that 2j + 1, 2j + 3 do not belong to the support of Suppose that ||w n || = ||Pw n || + |w n (1) +w(2j n + 1) + w n (2j n + 3)| and that for a subsequence of (w n ) we have 2j n + 1, 2j n + 3 do not belong to the support of and lim n |w n (1) + w(2j n + 1) + w n (2j n + 3)| exists. As usual call it (w n ) again. Then
Thus, if , by (4.13)
If , then by (4.13), and then by (4.16),
By (4.15), (4.17) and (4.18) the only remaining possible case is that
for some sequence (i n ) in ℕ.
Let and ε > 0 so that .
Let n be fixed and define . Suppose that r(n) is such that
There is M (r (n)) so that for m > M (r (n)), and
Then
By (4.14) for sufficiently large n. Therefore, for such n and m > M (r (n)) we obtain
Using (4.20), (4.21) and (4.19),
Hence, for every n, since is an afps, . Thus lim sup n ||w n || < 1.
Therefore, (w n ) cannot be an afps. The other case is done similarly and this finishes the proof. ■
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Acknowledgements
We thank the referees for their detailed reading of this paper and their helpful suggestions. The first author was partially funded by SEP CONACYT grant 102380 and by a sabbatical grant of CONACYT. She also wants to thank the Department of Mathematical Analysis of the University of Valencia for its warm hospitality.
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Fetter Nathansky, H., Llorens-Fuster, E. A product space with the fixed point property. Fixed Point Theory Appl 2012, 91 (2012). https://doi.org/10.1186/1687-1812-2012-91
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DOI: https://doi.org/10.1186/1687-1812-2012-91