Bishop, J. P., Hardison, H. L., & Przybyla-Kuchek, J. E.
Responsiveness to students’ mathematical thinking in middle-grades classrooms. Journal for Research in Mathematics Education, 53(1), 10–40.
Bishop, J. P., Koehne, C., & Hicks, M. D.
By whose authority? Negotiating authority for modes of activity in mathematics classrooms. For the Learning of Mathematics, 42(2), 35–41.
Bishop, J. P., Lamb, L. C., Philipp, R. A., Whitacre, I., & Schappelle, B.
Beyond the sign rules. Mathematics Teacher: Learning and Teaching PreK-12, 115(3), 202–210.
Cook, J. P., Melhuish, K. M., & Uscanda, R. (n.d.).
Examining the Concept of Inverse: Students Develop a Coordinated Way of Reasoning. The Journal of Mathematical Behavior.
Czocher, J. A., Hardison, H. L., & Kandasamy, S. S. S.
A bridging study analyzing mathematical model construction through a quantities-oriented lens. Educational Studies in Mathematics.
Dawkins, P. C., & Norton, A.
Identifying Mental Actions Necessary for Abstracting the Logic of Conditionals. The Journal of Mathematical Behavior, 66, 100954.
Dawkins, P. C., Zazkis, D., & Cook, J. P.
How do transition to proof textbooks relate logic, proof techniques, and sets? PRIMUS, 32(1), 14–30. https://doi.org/https://doi.org/10.1080/10511970.2020.1827322.
Hawthorne, C., Philipp, R. A., Lamb, L. L., Bishop, J. P., Whitacre, I., & Schappelle, B. P.
Reconceptualizing a mathematical domain on the basis of student reasoning: Considering teachers’ perspectives about integers. Journal of Mathematical Behavior, 65.
Melhuish, K. M., Dawkins, P. C., Lew, K. M., & Strickland, S. K.
Lessons learned about incorporating high-leverage teaching practices in the undergraduate proof classroom to promote authentic and equitable participation. International Journal of Research in Undergraduate Mathematics Education.
Melhuish, K. M., Fukawa-Connelly, T., Dawkins, P. C., Woods, C., & Weber, K.
Collegiate Mathematics Teaching in Proof-Based Courses: Updated Evidence About an Important Practice. The Journal of Mathematical Behavior, 67.
Melhuish, K. M., Thanheiser, E., White, A., Rosencrans, B., Foreman, L., Shaughnessy, J. M., … Riffel, A.
The Efficacy of a “Mathematics for All” Professional Development. Journal for Research in Mathematics Education, 53(4), 307–333.
Melhuish, K. M., Vroom, K., Lew, K. M., & Ellis, B.
Operationalizing Authentic Mathematical Proof Activity Using Disciplinary Tools. The Journal of Mathematical Behavior.
Mirin, A., & Dawkins, P. C.
Do mathematicians interpret equations symmetrically? The Journal of Mathematical Behavior, 66, 100959.
Namakshi, N., Warshauer, H. K., Strickland, S., & Hickman, L.
Investigating Preservice Teachers’ Assessment Skills: Noticing and Analyzing Student Thinking in Elementary and Middle-School Students’ Written Work. School Science and Mathematics. https://doi.org/DOI:10.1111/ssm.12522.
Obara, S.
Find the relationship between two triangles: Teachers solving a geometric problem using dynamic geometry software. Journal of Education and Social Development, 6(2), 21–27.
Paoletti, T., Hardison, H. L., & Lee, H. Y.
Students’ static and emergent graphical shape thinking in spatial and quantitative coordinate systems. For the Learning of Mathematics, 42(2), 48–50.
Vroom, K., Gehrtz, J., Apkarian, N., Alzaga Elizondo, T., Ellis, B., & Hagman, J.
Characteristics of interactive classrooms that first year students find helpful. International Journal of STEM Education, 7(2), 379–399.
Weber, K., & Melhuish, K. M.
Can We Engage Students in Authentic Mathematical Activity While Embracing Critical Pedagogy? A Commentary on the Tensions Between Disciplinary Activity and Critical Education. Canadian Journal of Science, Mathematics and Technology Education.
Zolt, H. M., Wrightsman, E. M., Ford, L. L., & Patterson, C. L.
Believing in infinity: Exploring students’ conceptions of improper integrals. PRIMUS: Problems, Resources, and Issues in Mathematics Undergraduate Studies.