* A. R. Rajwade, ''Squares'', London Mathematical Society Lecture Note Series '''171''' Cambridge University Press (1993) {{ISBN|0-521-42668-5}} {
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Note that the geometry of special relativity theory (cf. [[Space-time|Space-time
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Note that a lower bound for the first eigenvalue, without any curvature assumpti
...</td></tr><tr><td valign="top">[a2]</td> <td valign="top"> P. Buser, "A note on the isoperimetric constant" ''Ann. Sci. Ecole Norm. Sup.'' , '''15'''
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<TR><TD valign="top">[a1]</TD> <TD valign="top"> E. Barbier, "Note sur le problème de l'ainguille et le jeu du joint couvert" ''J. Math. Pur
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Note that this norm differs from the [[operator norm]] of $A$ (for instance beca
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...liations on surfaces) are equivalent (cf. also [[Lamination|Lamination]]). Note also that the construction shows that the (weighted) train track is in a se
...nd laminations in higher-dimensional manifolds (see [[#References|[a2]]]). Note that a notion close to the notion of train track is already contained in [[
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* A. R. Rajwade, ''Squares'', London Mathematical Society Lecture Note Series '''171''' Cambridge University Press (1993) {{ISBN|0-521-42668-5}} {
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...<TD valign="top">[a4]</TD> <TD valign="top"> E.A. Michael, "Yet another note on paracompact spaces" ''Proc. Amer. Math. Soc.'' , '''10''' (1959) pp.
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Note that $A_5$ is the non-Abelian simple group of smallest possible order.
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...to algebraic geometry and topology'', London Mathematical Society Lecture Note Series '''217''' Cambridge University Press (1995) {{ISBN|0-521-46755-1}} {
* A. R. Rajwade, ''Squares'', London Mathematical Society Lecture Note Series '''171''' Cambridge University Press (1993) {{ISBN|0-521-42668-5}} {
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Note that the best coordinates are neither the normal nor the harmonic ones, but
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...properties. This Ray resolvent is associated to a semi-group $(\hat P_t)$ (note that $\hat P_0$ need not be the identity: existence of branching points), q
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.... H. Greaves, G. Harman, M. N. Huxley; London Mathematical Society Lecture Note Series '''237''', Cambridge University Press (1997) {{ISBN|0-521-58957-6}}
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...</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> R.R. Hall, "A note on Farey series" ''J. London Math. Soc.'' , '''2''' (1970) pp. 139–148
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...On graphs with least eigenvalue $−2$'' London Mathematical Society Lecture Note Series '''314''' Cambridge University Press(2004) {{ISBN|0-521-83663-8}} {{
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...ce $ X $ onto a topological space $ B $ (i.e., a [[Fibration|fibration]]). Note that $ X $, $ B $ and $ \pi $ are also called the '''total space''', the ''
...f(b) \stackrel{\text{df}}{=} (\pi \circ F)[{\pi^{\leftarrow}}[\{ b \}]] $. Note that $ F $ is a [[Covering|covering]] of $ f $ and that $ \pi_{1} \circ F =
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...en formal system is decidable, then such a system is said to be complete. (Note that it is impossible to require that all, and not just the closed, formula
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* A. R. Rajwade, ''Squares'', London Mathematical Society Lecture Note Series '''171''' Cambridge University Press (1993) {{ISBN|0-521-42668-5}} {
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...$(A_1\mathbin{\&}\dotsb\mathbin{\&}A_n)\supseteq(B_1\lor\dotsb\lor B_m)$ (note that an empty conjunction denotes truth, and an empty disjunction denotes f
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...f an already defined population of objects under study. It is essential to note that the condition which defines the species is to be understood in the int
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