Kerckhove, M.G., & Nall, V.C. *Calculus Laboratories with Mathematica* (vols. 1, 2 and 3). McGraw Hill: New York, 1993.

Dynamical properties of shift maps on inverse limits with a set valued function, with Judy Kennedy, to appear in *Ergotic Theory and Dynamical Systems* (2016).

Some results about inverse limits with set-valued bonding functions, with Iztok Bani and Matev Repnjak, *Topology and its Applications*, (2016), pp. 106-111.

More continua which are not the inverse limit with a closed subset of a unit square, *Houston J. Math.* 41 (2015), no. 3, 1039-1050.

The only finite graph that is an inverse limit with a set valued function on [0,1] is an arc, *Topology and its Applications*, 159 (2012), pp. 733-736

Connected inverse limits with a set-valued function, *Topology Proceedings*, 40 (2012) 167-177.

Inverse Limits with set-valued functions, *Houston Journal of Mathematics* 37, no. 4 (2011): 1323-1332.

Finite graphs that are inverse limits with a set valued function on [0,1], *Topology and its Applications* 158 (2011) pp. 1226-1233.

Centers and shore points in λ-dendroids, *Topology Proceedings* 31 No. 1 (2007) 227-242

"Centers and shore points of a dendroid*,"* *Topology and its Applications* 154 (2007) 2167–2172

Nall, V.C. (2006) Centers of a Dendroid. *Fundamenta Mathematica*, v. 189.

Nall, V.C., & Heath, J. (2004) Tree-like continua and 2-to-1 maps. *Proceedings of the American Mathematical Society*, v. 132.

Nall, V.C. (2003) No arc-connected treelike continuum is the 2-to-1 image of a continuum. *Fundamenta Mathematica*, v. 180.

Nall, V.C. (2002) Reduced 2-to-1 maps and decompositions of graphs with no 2-to-1 cut sets. *Topology and its Applications*, v.123.

Nall, V.C. (2001) Locally 1-to-1 maps and 2-to-1 retractions. *Houston Journal of Mathematics*, v. 27.

Education

Ph.D., University of Houston