We present $O(loglog n)$ round scalable Massively Parallel Computation algorithms for maximal independent set and maximal matching, in trees and more generally graphs of bounded arboricity, as well as for constant coloring trees. Following the standards, by a scalable MPC algorithm, we mean that these algorithms can work on machines that have capacity/memory as small as $n^{delta}$ for any positive constant $delta<1$. Our results improve over the $O(log^2log n)$ round algorithms of Behnezhad et al. [PODC19]. Moreover, our matching algorithm is presumably optimal as its bound matches an $Omega(loglog n)$ conditional lower bound of Ghaffari, Kuhn, and Uitto [FOCS19].
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