Proof By Lemma 2.2, $\Sigma \varepsilon _{2m}$ has a right homotopy inverse $\delta _{2m}\colon {\Sigma \Omega J_{p-1}(S^{2m})}\stackrel {{}}{\longrightarrow } {\Sigma S^{2m-1}} $ . The composite

is therefore a left homotopy inverse for $\Sigma \varepsilon _{2m}\wedge \varepsilon _{2n}$ .

Proof Let $w\colon {{S^{4m-1}}\stackrel {{}}{\longrightarrow }{S^{2m}}}$ be the Whitehead product of the identity map on $S^{2m}$ with itself. At odd primes, the homotopy fiber of w is $S^{2m-1}$ , resulting in a homotopy fibration

$$ \begin{align*} {{\Omega S^{2m-1}}\stackrel{{\Omega w}}{\longrightarrow}{\Omega S^{2m}}\stackrel{{\partial}}{\longrightarrow}{S^{2m-1}}}. \end{align*} $$

Notice that $\partial \circ E$ is degree one in homology and so is homotopic to the identity map. Therefore, the composite

is a homotopy equivalence, where $\mu $ is the standard loop multiplication. Consider the diagram

where $\pi _{1}$ is the projection onto the first factor and $j_{1}$ is the inclusion of the first factor. The left square homotopy commutes since $\epsilon _{2m}\circ w$ is null homotopic (as $J_{2}(S^{2m})$ is the homotopy cofiber of w and p odd implies $p-1\geq 2$ ). The right square homotopy commutes since $\Omega \epsilon _{2m}$ is an H-map. The upper row is the homotopy equivalence e, and the bottom row is homotopic to $\varepsilon _{2m}$ . The homotopy commutativity of the diagram therefore implies that $\Omega \epsilon _{2m}\circ e\simeq \varepsilon _{2m}\circ \pi _{1}$ . Now, precompose this diagram with the map ${{\Omega S^{2m}}\stackrel {{e^{-1}}}{\longrightarrow }{S^{2m-1}\times \Omega S^{4m-1}}} $ to obtain $\Omega \epsilon _{2m}\simeq \varepsilon _{2m}\circ \pi _{1}\circ e^{-1}$ . Define $r\colon {{\Omega S^{2m}}\stackrel {{}}{\longrightarrow }{S^{2m-1}}}$ by $r=\pi _{1}\circ e^{-1}$ . Then $\Omega \epsilon \simeq \varepsilon _{2m}\circ r$ , giving the homotopy commutative square in the statement of the lemma. Also, observe that r is degree one in $H_{2m-1}(\ \ )$ , so $r\circ E$ is the identity map in homology and therefore is homotopic to the identity map.

Proof Observe that the middle row of (3.4) is homotopic to $\alpha \vee \beta $ . Thus, Z is the homotopy pullback of $\alpha \vee \beta $ and ${{\Sigma \Omega L(k)\wedge \Omega L(\ell )}\stackrel {{}}{\longrightarrow }{L(k)\vee L(\ell )}}$ . On the other hand, the naturality of Lemma 3.1 implies that there is a homotopy fibration diagram

The homotopy commutativity of the upper square therefore implies that there is a pullback map ${{\Sigma \Omega S^{k}\wedge \Omega S^{\ell }}\stackrel {{}}{\longrightarrow }{Z}}$ such that the composite ${\Sigma \Omega S^{k}\wedge \Omega S^{\ell }}\stackrel {{}}{\longrightarrow }{Z}\stackrel {{}}{\longrightarrow } {Y}\stackrel {}{\longrightarrow } {{\Sigma \Omega L(k)\wedge \Omega L(\ell )}}$ is homotopic to $\Sigma \Omega \alpha \wedge \Omega \beta $ .

Next, consider the diagram

The upper-left triangle homotopy commutes by the preceding paragraph. The lower-left square homotopy commutes by (3.4). By Lemma 3.1, the map ${\Sigma \Omega L(k)\wedge \Omega L(\ell )} \stackrel {{}}{\longrightarrow }{L(k)\vee L(\ell )} $ has a left homotopy inverse after looping. Using this left homotopy inverse, the lower-right triangle homotopy commutes. The outer perimeter of this diagram then gives the homotopy commutative diagram asserted by the lemma.

Proof If k and $\ell $ are both odd, then, by definition, $L(k)= S^{k}$ and $L(\ell )=S^{\ell }$ and both $\alpha $ and $\beta $ are homotopic to the identity maps. This proves part (a).

If k is odd and $\ell $ is even, then, by definition, $L(k)=S^{k}$ , $L(\ell )=J(S^{\ell })$ , $\alpha $ is homotopic to the identity map, and $\beta $ is homotopic to the inclusion $\epsilon _{\ell }$ of the bottom cell. Thus, the composite

is homotopic to

By Lemma 2.2, $\Sigma \varepsilon _{\ell }$ has a left homotopy inverse. Therefore, so does $\Sigma 1\wedge \varepsilon _{\ell }$ . This proves part (b).

The argument for part (c) is the same as for part (b) but with the roles of k and $\ell $ exchanged.

Proof Since one of k or $\ell $ is odd, each of the three cases in Lemma 3.3 implies that there is a countable wedge W of simply connected spheres with the property that the composite has a left homotopy inverse. Thus, the homotopy commutativity of the diagram in the statement of Lemma 3.3 implies that $\Omega W$ retracts off $\Omega X$ . Therefore, as W is hyperbolic and has no exponent at p, the same is true of X.

Proof By their definitions, $\overline {\alpha }$ is homotopic to $\epsilon _{k}$ and $\overline {\gamma }$ is homotopic to $(j_{1}\circ \epsilon _{\ell })\perp (j_{2}\circ \epsilon _{\ell '})$ . Thus, $\Omega \alpha \circ E\simeq \varepsilon _{k}$ and $\Omega \gamma \circ E\simeq (\Omega j_{1}\circ \varepsilon _{\ell })\perp (\Omega j_{1}\circ \varepsilon _{\ell '})$ . By Lemma 2.2, each of $\Sigma \varepsilon _{k}$ , $\Sigma \varepsilon _{\ell }$ , and $\Sigma \varepsilon _{\ell '}$ has a left homotopy inverse, denoted by $\delta _{k}$ , $\delta _{\ell }$ , and $\delta _{\ell '}$ respectively. A left homotopy inverse of $(\Sigma \Omega \alpha \wedge \Omega \beta )\circ (\Sigma E\wedge E)$ is then given by the composite

where t comes from the splitting of $\Sigma (A\times B)$ as $\Sigma A\vee \Sigma B\vee (\Sigma A\wedge B)$ .

Proof Argue as for Proposition 3.4, replacing Lemmas 3.2 and 3.3 with Lemmas 3.5 and 3.6. Note that the wedge W of spheres in this case has two summands.

Proof of Theorem 1.2

By hypothesis, M and N are simply connected and not rationally homotopy equivalent to $S^{n}$ . This implies that if the rational connectivities of M and N are $k-1$ and $\ell -1$ , respectively, then $2\leq k,\ell <n$ . Therefore, both $H_{k}(M;\mathbb {Q})$ and $H_{\ell }(N;\mathbb {Q})$ have a $\mathbb {Q}$ -summand in the image of the rational Hurewicz homomorphism. This implies that there are maps

$$ \begin{align*}i\colon{{S^{k}}\stackrel{{}}{\longrightarrow}{M}} \qquad j\colon{{S^{\ell}}\stackrel{{}}{\longrightarrow}{N}} \end{align*} $$

with Hurewicz images $m_{1}\cdot a\in H_{k}(M;\mathbb {Z})$ and $m_{2}\cdot b\in H_{\ell }(M;\mathbb {Z})$ where a and b generate $\mathbb {Z}$ -summands and $m_{1},m_{2}\in \mathbb {Z}$ . Let $\mathcal {P}_{1}$ be the set of all primes that divide either $m_{1}$ or $m_{2}$ , let $\mathcal {P}_{2}$ be the set of all primes $p\leq \max \{\frac {n-k+3}{2},\frac {n-\ell +3}{2}\}$ , and let $\mathcal {P}=\mathcal {P}_{1}\cup \mathcal {P}_{2}$ . Note that $\mathcal {P}$ is finite, and possibly empty.

Case 1: one of k or $\ell $ is odd. Localize at a prime $p\notin \mathcal {P}$ . As $p\notin \mathcal {P}_{1}$ , the Hurewicz images of both i and j generate ${\mathbb {Z}_{(p)}}$ -summands of $H_{k}(M;{\mathbb {Z}_{(p)}})$ and $H_{\ell }(N;{\mathbb {Z}_{(p)}})$ . If the dual classes in ${\mathbb {Z}_{(p)}}$ cohomology are represented by maps $r\colon {{M}\stackrel {{}}{\longrightarrow }{K({\mathbb {Z}_{(p)}},k)}}$ and $s\colon {{N}\stackrel {{}}{\longrightarrow }{K({\mathbb {Z}_{(p)}},\ell )}} $ , respectively, then as we are localized at $p\notin \mathcal {P}_{2}$ , Lemmas 2.6 and 2.5 imply the maps r and s lift to maps $\overline {r}\colon {{M}\stackrel {{}}{\longrightarrow }{L(k)}}$ and $\overline {s}\colon {{N}\stackrel {{}}{\longrightarrow }{L(\ell )}}$ . The composite

$$ \begin{align*}{{M\# N}\stackrel{{q}}{\longrightarrow}{M\vee N}\stackrel{{\overline{r}\vee\overline{s}}}{\longrightarrow}{L(k)\vee L(\ell)}} \end{align*} $$

is then a lift of $\overline {r}\times \overline {s}$ as in (3.2). Proposition 3.4 now implies that $M\# N$ is hyperbolic and has no exponent at p.

Case 2: both k and $\ell $ are even. By hypothesis, there is a second rational Hurewicz image in $H_{\ell '}(N;\mathbb {Q})$ that generates a $\mathbb {Q}$ -summand independent from the Hurewicz image of j. This implies that there is a map $j'\colon {{S^{\ell '}}\stackrel {{}}{\longrightarrow }{N}}$ with Hurewicz image $m_{2}'b'\in H_{\ell '}(N;\mathbb {Z})$ , where $b'$ generates a $\mathbb {Z}$ -summand and $m_{2}'\in \mathbb {Z}$ . Let $\mathcal {P}_{1}'$ be the set of all primes that divide any one of $m_{1},m_{2}$ , or $m_{2}'$ . Note that $\mathcal {P}_{1}\subseteq \mathcal {P}_{1}'$ . Also, as N is rationally $(\ell -1)$ -connected, we have $\ell '\geq \ell $ , implying that $\frac {n-\ell '+3}{2}\leq \frac {n-\ell +3}{2}$ , so no adjustment is needed to $\mathcal {P}_{2}$ . Let $\mathcal {P}'=\mathcal {P}^{\prime }_{1}\cup \mathcal {P}_{2}$ . Localize at $p\notin \mathcal {P}'$ . As $p\notin \mathcal {P}^{\prime }_{1}$ , the Hurewicz images of i, j, and $j'$ generate ${\mathbb {Z}_{(p)}}$ -summands in $H_{k}(M;{\mathbb {Z}_{(p)}})$ , $H_{\ell }(N;{\mathbb {Z}_{(p)}})$ , and $H_{\ell '}(N;{\mathbb {Z}_{(p)}})$ , respectively. If the dual classes in ${\mathbb {Z}_{(p)}}$ -cohomology are represented by maps $r\colon {{M}\stackrel {{}}{\longrightarrow }{K({\mathbb {Z}_{(p)}},k)}}$ , $s\colon {{N}\stackrel {{}}{\longrightarrow }{K({\mathbb {Z}_{(p)}},\ell )}}$ , and $s'\colon {{N}\stackrel {{}}{\longrightarrow }{K({\mathbb {Z}_{(p)}},\ell ')}}$ , respectively, then as we are localized at $p\notin \mathcal {P}_{2}$ and each of k, $\ell $ , and $\ell '$ is even, Lemma 2.5 implies that r, s, and $s'$ lift to maps $\overline {r}\colon {{M}\stackrel {{}}{\longrightarrow }{J_{p-1}(S^{k})}}$ , $\overline {s}\colon {{N}\stackrel {{}}{\longrightarrow }{J_{p-1}(S^{\ell })}}$ , and $\overline {s'}\colon {{N}\stackrel {{}}{\longrightarrow }{J_{p-1}(S^{\ell '})}} $ . The composite

is then a lift of $\overline {r}\times (\overline {s}\times \overline {s'})$ as in (3.5). Proposition 3.7 now implies that $M\# N$ is hyperbolic and has no exponent at p.

Proof of Theorem 1.3

Since M and N are simply connected, the hypotheses on $H_{2}(M;\mathbb {Z})$ and $H_{2}(N;\mathbb {Z})$ imply that there are maps

$$ \begin{align*}i\colon{{S^{2}}\stackrel{{}}{\longrightarrow}{M}} \qquad j,j'\colon{{S^{2}}\stackrel{{}}{\longrightarrow}{N}} \end{align*} $$

whose Hurewicz images generate a $\mathbb {Z}$ summand in $H_{2}(M;\mathbb {Z})$ and distinct $\mathbb {Z}$ -summands $H_{2}(N;\mathbb {Z})$ . The dual cohomology classes are represented by maps

$$ \begin{align*}r\colon{{M}\stackrel{{}}{\longrightarrow}{{\mathbb{C}P^{\infty}}}}\qquad s,s'\colon{{N}\stackrel{{}}{\longrightarrow}{{\mathbb{C}P^{\infty}}}}, \end{align*} $$

respectively. Observe that each of $r\circ i$ , $s\circ j$ , and $s'\circ j'$ is the inclusion of the bottom cell and the composite

is a lift of $r\times (s\times s')$ in the manner of (3.5).

Define $\alpha $ and $\gamma $ by the composites

$$ \begin{align*}\alpha\colon{{S^{2}}\stackrel{{i}}{\longrightarrow}{M}\stackrel{{r}}{\longrightarrow}{{\mathbb{C}P^{\infty}}}}\qquad \gamma\colon{{S^{2}\vee S^{2}}\stackrel{{j\perp j'}}{\longrightarrow}{N}\stackrel{{s\times s'}}{\longrightarrow}{{\mathbb{C}P^{\infty}}\times{\mathbb{C}P^{\infty}}}}. \end{align*} $$

Then the analogue of Lemma 3.5 is a factorization of

through $\Omega (M\# N)$ . As $\Omega {\mathbb {C}P^{\infty }}\simeq S^{1}$ , the composite

has a left homotopy inverse. Therefore, there is a wedge W of two simply connected spheres retracting off $\Omega (M\# N)$ , implying that it is hyperbolic and has no exponent at any prime p.

Proof By hypothesis, there is a map $i\colon {{S^{k}}\stackrel {{}}{\longrightarrow }{M}}$ which, rationally, generates a $\mathbb {Q}$ -summand in $H_{k}(M;\mathbb {Q})$ . By hypothesis, $t\cdot i$ lifts to a map $\widehat {i}\colon {{S^{k}}\stackrel {{}}{\longrightarrow }{E}} $ . Note that as M is not rationally homotopy equivalent to $S^{n}$ , its $(n-1)$ -skeleton $\overline {M}$ is not contractible. Therefore, we may assume $k<n$ , implying that i factors through $\overline {M}$ . Also, denoting the factorization by i, consider the diagram

where $p_{1}$ is the pinch map onto the first wedge summand and $\theta $ will be defined momentarily. The inner square homotopy commutes by the definition of $E_{N}$ as a pullback. Observe that the composite along the left column is homotopic to the composite ${{\overline {M}\vee \overline {N}}\stackrel {{p_{1}}}{\longrightarrow }{\overline {M}}\stackrel {{}}{\longrightarrow }{M}} $ , where again $p_{1}$ is the pinch map onto the first wedge summand. Thus, the composite along the outer perimeter in the clockwise direction is homotopic to ${{S^{k-1}\vee \overline {N}}\stackrel {{p_{1}}}{\longrightarrow }{S^{k-1}}\stackrel {{t\cdot i}}{\longrightarrow }{M}}$ . Since $\widehat {t}$ is a lift of $t\cdot i$ , the outer perimeter of the diagram homotopy commutes. This implies that there is a homotopy pullback map $\theta $ that makes both the left and upper quadrilaterals homotopy commute.

Now, argue as in the proof of Theorem 1.2 with the composite ${M\# N}\stackrel {{q}}{\longrightarrow }{M\vee N}\stackrel {{}}{\longrightarrow } {L(k)\vee L(\ell )} $ replaced by ${E_{N}}\stackrel {{}}{\longrightarrow }{M\# N}\stackrel {{q}}{\longrightarrow }{M\vee N}\stackrel {{}} {\longrightarrow }{L(k)\vee L(\ell )}$ (and similarly for the $L(k)\vee (L(\ell )\times L(\ell '))$ variant) to show that $E_{N}$ is hyperbolic and has no exponent at all but finitely many primes. (In fact, the primes inverted are those for the $M\# N$ case and any additional primes dividing t.)